isabelle: src/HOL/Analysis/Gamma_Function.thy@223172b97d0b (annotated)

63992 3aa9837d05c7 updated headers; wenzelm parents: 63952 diff changeset	1	(* Title: HOL/Analysis/Gamma_Function.thy
62055 755fda743c49 Multivariate-Analysis: fixed headers and a LaTex error (c.f. Isabelle b0f941e207cf) hoelzl parents: 62049 diff changeset	2	Author: Manuel Eberl, TU München
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3	*)
62055 755fda743c49 Multivariate-Analysis: fixed headers and a LaTex error (c.f. Isabelle b0f941e207cf) hoelzl parents: 62049 diff changeset	4
755fda743c49 Multivariate-Analysis: fixed headers and a LaTex error (c.f. Isabelle b0f941e207cf) hoelzl parents: 62049 diff changeset	5	section \<open>The Gamma Function\<close>
755fda743c49 Multivariate-Analysis: fixed headers and a LaTex error (c.f. Isabelle b0f941e207cf) hoelzl parents: 62049 diff changeset	6
63594 bd218a9320b5 HOL-Multivariate_Analysis: rename theories for more descriptive names hoelzl parents: 63539 diff changeset	7	theory Gamma_Function
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	8	imports
66286 1c977b13414f poles and residues of the Gamma function eberlm <eberlm@in.tum.de> parents: 65587 diff changeset	9	Conformal_Mappings
63594 bd218a9320b5 HOL-Multivariate_Analysis: rename theories for more descriptive names hoelzl parents: 63539 diff changeset	10	Summation_Tests
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	11	Harmonic_Numbers
66453 cc19f7ca2ed6 session-qualified theory imports: isabelle imports -U -i -d '~~/src/Benchmarks' -a; wenzelm parents: 66447 diff changeset	12	"HOL-Library.Nonpos_Ints"
cc19f7ca2ed6 session-qualified theory imports: isabelle imports -U -i -d '~~/src/Benchmarks' -a; wenzelm parents: 66447 diff changeset	13	"HOL-Library.Periodic_Fun"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	14	begin
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	15
62055 755fda743c49 Multivariate-Analysis: fixed headers and a LaTex error (c.f. Isabelle b0f941e207cf) hoelzl parents: 62049 diff changeset	16	text \<open>
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	17	Several equivalent definitions of the Gamma function and its
62055 755fda743c49 Multivariate-Analysis: fixed headers and a LaTex error (c.f. Isabelle b0f941e207cf) hoelzl parents: 62049 diff changeset	18	most important properties. Also contains the definition and some properties
755fda743c49 Multivariate-Analysis: fixed headers and a LaTex error (c.f. Isabelle b0f941e207cf) hoelzl parents: 62049 diff changeset	19	of the log-Gamma function and the Digamma function and the other Polygamma functions.
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	20
62055 755fda743c49 Multivariate-Analysis: fixed headers and a LaTex error (c.f. Isabelle b0f941e207cf) hoelzl parents: 62049 diff changeset	21	Based on the Gamma function, we also prove the Weierstraß product form of the
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	22	sin function and, based on this, the solution of the Basel problem (the
62055 755fda743c49 Multivariate-Analysis: fixed headers and a LaTex error (c.f. Isabelle b0f941e207cf) hoelzl parents: 62049 diff changeset	23	sum over all @{term "1 / (n::nat)^2"}.
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	24	\<close>
62055 755fda743c49 Multivariate-Analysis: fixed headers and a LaTex error (c.f. Isabelle b0f941e207cf) hoelzl parents: 62049 diff changeset	25
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	26	lemma pochhammer_eq_0_imp_nonpos_Int:
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	27	"pochhammer (x::'a::field_char_0) n = 0 \<Longrightarrow> x \<in> \<int>\<^sub>\<le>\<^sub>0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	28	by (auto simp: pochhammer_eq_0_iff)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	29
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	30	lemma closed_nonpos_Ints [simp]: "closed (\<int>\<^sub>\<le>\<^sub>0 :: 'a :: real_normed_algebra_1 set)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	31	proof -
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	32	have "\<int>\<^sub>\<le>\<^sub>0 = (of_int ` {n. n \<le> 0} :: 'a set)"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	33	by (auto elim!: nonpos_Ints_cases intro!: nonpos_Ints_of_int)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	34	also have "closed \<dots>" by (rule closed_of_int_image)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	35	finally show ?thesis .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	36	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	37
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	38	lemma plus_one_in_nonpos_Ints_imp: "z + 1 \<in> \<int>\<^sub>\<le>\<^sub>0 \<Longrightarrow> z \<in> \<int>\<^sub>\<le>\<^sub>0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	39	using nonpos_Ints_diff_Nats[of "z+1" "1"] by simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	40
63295 52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	41	lemma of_int_in_nonpos_Ints_iff:
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	42	"(of_int n :: 'a :: ring_char_0) \<in> \<int>\<^sub>\<le>\<^sub>0 \<longleftrightarrow> n \<le> 0"
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	43	by (auto simp: nonpos_Ints_def)
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	44
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	45	lemma one_plus_of_int_in_nonpos_Ints_iff:
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	46	"(1 + of_int n :: 'a :: ring_char_0) \<in> \<int>\<^sub>\<le>\<^sub>0 \<longleftrightarrow> n \<le> -1"
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	47	proof -
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	48	have "1 + of_int n = (of_int (n + 1) :: 'a)" by simp
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	49	also have "\<dots> \<in> \<int>\<^sub>\<le>\<^sub>0 \<longleftrightarrow> n + 1 \<le> 0" by (subst of_int_in_nonpos_Ints_iff) simp_all
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	50	also have "\<dots> \<longleftrightarrow> n \<le> -1" by presburger
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	51	finally show ?thesis .
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	52	qed
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	53
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	54	lemma one_minus_of_nat_in_nonpos_Ints_iff:
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	55	"(1 - of_nat n :: 'a :: ring_char_0) \<in> \<int>\<^sub>\<le>\<^sub>0 \<longleftrightarrow> n > 0"
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	56	proof -
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	57	have "(1 - of_nat n :: 'a) = of_int (1 - int n)" by simp
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	58	also have "\<dots> \<in> \<int>\<^sub>\<le>\<^sub>0 \<longleftrightarrow> n > 0" by (subst of_int_in_nonpos_Ints_iff) presburger
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	59	finally show ?thesis .
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	60	qed
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	61
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	62	lemma fraction_not_in_ints:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	63	assumes "\<not>(n dvd m)" "n \<noteq> 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	64	shows "of_int m / of_int n \<notin> (\<int> :: 'a :: {division_ring,ring_char_0} set)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	65	proof
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	66	assume "of_int m / (of_int n :: 'a) \<in> \<int>"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	67	then obtain k where "of_int m / of_int n = (of_int k :: 'a)" by (elim Ints_cases)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	68	with assms have "of_int m = (of_int (k * n) :: 'a)" by (auto simp add: divide_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	69	hence "m = k * n" by (subst (asm) of_int_eq_iff)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	70	hence "n dvd m" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	71	with assms(1) show False by contradiction
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	72	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	73
63317 ca187a9f66da Various additions to polynomials, FPSs, Gamma function eberlm parents: 63296 diff changeset	74	lemma fraction_not_in_nats:
ca187a9f66da Various additions to polynomials, FPSs, Gamma function eberlm parents: 63296 diff changeset	75	assumes "\<not>n dvd m" "n \<noteq> 0"
ca187a9f66da Various additions to polynomials, FPSs, Gamma function eberlm parents: 63296 diff changeset	76	shows "of_int m / of_int n \<notin> (\<nat> :: 'a :: {division_ring,ring_char_0} set)"
ca187a9f66da Various additions to polynomials, FPSs, Gamma function eberlm parents: 63296 diff changeset	77	proof
ca187a9f66da Various additions to polynomials, FPSs, Gamma function eberlm parents: 63296 diff changeset	78	assume "of_int m / of_int n \<in> (\<nat> :: 'a set)"
ca187a9f66da Various additions to polynomials, FPSs, Gamma function eberlm parents: 63296 diff changeset	79	also note Nats_subset_Ints
ca187a9f66da Various additions to polynomials, FPSs, Gamma function eberlm parents: 63296 diff changeset	80	finally have "of_int m / of_int n \<in> (\<int> :: 'a set)" .
ca187a9f66da Various additions to polynomials, FPSs, Gamma function eberlm parents: 63296 diff changeset	81	moreover have "of_int m / of_int n \<notin> (\<int> :: 'a set)"
ca187a9f66da Various additions to polynomials, FPSs, Gamma function eberlm parents: 63296 diff changeset	82	using assms by (intro fraction_not_in_ints)
ca187a9f66da Various additions to polynomials, FPSs, Gamma function eberlm parents: 63296 diff changeset	83	ultimately show False by contradiction
ca187a9f66da Various additions to polynomials, FPSs, Gamma function eberlm parents: 63296 diff changeset	84	qed
ca187a9f66da Various additions to polynomials, FPSs, Gamma function eberlm parents: 63296 diff changeset	85
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	86	lemma not_in_Ints_imp_not_in_nonpos_Ints: "z \<notin> \<int> \<Longrightarrow> z \<notin> \<int>\<^sub>\<le>\<^sub>0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	87	by (auto simp: Ints_def nonpos_Ints_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	88
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	89	lemma double_in_nonpos_Ints_imp:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	90	assumes "2 * (z :: 'a :: field_char_0) \<in> \<int>\<^sub>\<le>\<^sub>0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	91	shows "z \<in> \<int>\<^sub>\<le>\<^sub>0 \<or> z + 1/2 \<in> \<int>\<^sub>\<le>\<^sub>0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	92	proof-
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	93	from assms obtain k where k: "2 * z = - of_nat k" by (elim nonpos_Ints_cases')
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	94	thus ?thesis by (cases "even k") (auto elim!: evenE oddE simp: field_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	95	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	96
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	97
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	98	lemma sin_series: "(\<lambda>n. ((-1)^n / fact (2n+1)) \<^sub>R z^(2*n+1)) sums sin z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	99	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	100	from sin_converges[of z] have "(\<lambda>n. sin_coeff n *\<^sub>R z^n) sums sin z" .
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	101	also have "(\<lambda>n. sin_coeff n *\<^sub>R z^n) sums sin z \<longleftrightarrow>
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	102	(\<lambda>n. ((-1)^n / fact (2n+1)) \<^sub>R z^(2*n+1)) sums sin z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	103	by (subst sums_mono_reindex[of "\<lambda>n. 2*n+1", symmetric])
66447 a1f5c5c26fa6 Replaced subseq with strict_mono eberlm <eberlm@in.tum.de> parents: 66286 diff changeset	104	(auto simp: sin_coeff_def strict_mono_def ac_simps elim!: oddE)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	105	finally show ?thesis .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	106	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	107
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	108	lemma cos_series: "(\<lambda>n. ((-1)^n / fact (2n)) \<^sub>R z^(2*n)) sums cos z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	109	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	110	from cos_converges[of z] have "(\<lambda>n. cos_coeff n *\<^sub>R z^n) sums cos z" .
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	111	also have "(\<lambda>n. cos_coeff n *\<^sub>R z^n) sums cos z \<longleftrightarrow>
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	112	(\<lambda>n. ((-1)^n / fact (2n)) \<^sub>R z^(2*n)) sums cos z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	113	by (subst sums_mono_reindex[of "\<lambda>n. 2*n", symmetric])
66447 a1f5c5c26fa6 Replaced subseq with strict_mono eberlm <eberlm@in.tum.de> parents: 66286 diff changeset	114	(auto simp: cos_coeff_def strict_mono_def ac_simps elim!: evenE)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	115	finally show ?thesis .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	116	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	117
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	118	lemma sin_z_over_z_series:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	119	fixes z :: "'a :: {real_normed_field,banach}"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	120	assumes "z \<noteq> 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	121	shows "(\<lambda>n. (-1)^n / fact (2n+1) z^(2*n)) sums (sin z / z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	122	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	123	from sin_series[of z] have "(\<lambda>n. z * ((-1)^n / fact (2n+1)) z^(2*n)) sums sin z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	124	by (simp add: field_simps scaleR_conv_of_real)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	125	from sums_mult[OF this, of "inverse z"] and assms show ?thesis
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	126	by (simp add: field_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	127	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	128
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	129	lemma sin_z_over_z_series':
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	130	fixes z :: "'a :: {real_normed_field,banach}"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	131	assumes "z \<noteq> 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	132	shows "(\<lambda>n. sin_coeff (n+1) *\<^sub>R z^n) sums (sin z / z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	133	proof -
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	134	from sums_split_initial_segment[OF sin_converges[of z], of 1]
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	135	have "(\<lambda>n. z * (sin_coeff (n+1) *\<^sub>R z ^ n)) sums sin z" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	136	from sums_mult[OF this, of "inverse z"] assms show ?thesis by (simp add: field_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	137	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	138
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	139	lemma has_field_derivative_sin_z_over_z:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	140	fixes A :: "'a :: {real_normed_field,banach} set"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	141	shows "((\<lambda>z. if z = 0 then 1 else sin z / z) has_field_derivative 0) (at 0 within A)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	142	(is "(?f has_field_derivative ?f') _")
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	143	proof (rule has_field_derivative_at_within)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	144	have "((\<lambda>z::'a. \<Sum>n. of_real (sin_coeff (n+1)) * z^n)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	145	has_field_derivative (\<Sum>n. diffs (\<lambda>n. of_real (sin_coeff (n+1))) n * 0^n)) (at 0)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	146	proof (rule termdiffs_strong)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	147	from summable_ignore_initial_segment[OF sums_summable[OF sin_converges[of "1::'a"]], of 1]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	148	show "summable (\<lambda>n. of_real (sin_coeff (n+1)) * (1::'a)^n)" by (simp add: of_real_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	149	qed simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	150	also have "(\<lambda>z::'a. \<Sum>n. of_real (sin_coeff (n+1)) * z^n) = ?f"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	151	proof
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	152	fix z
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	153	show "(\<Sum>n. of_real (sin_coeff (n+1)) * z^n) = ?f z"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	154	by (cases "z = 0") (insert sin_z_over_z_series'[of z],
66936 cf8d8fc23891 tuned some proofs and added some lemmas haftmann parents: 66526 diff changeset	155	simp_all add: scaleR_conv_of_real sums_iff sin_coeff_def)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	156	qed
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	157	also have "(\<Sum>n. diffs (\<lambda>n. of_real (sin_coeff (n + 1))) n * (0::'a) ^ n) =
66936 cf8d8fc23891 tuned some proofs and added some lemmas haftmann parents: 66526 diff changeset	158	diffs (\<lambda>n. of_real (sin_coeff (Suc n))) 0" by simp
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	159	also have "\<dots> = 0" by (simp add: sin_coeff_def diffs_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	160	finally show "((\<lambda>z::'a. if z = 0 then 1 else sin z / z) has_field_derivative 0) (at 0)" .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	161	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	162
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	163	lemma round_Re_minimises_norm:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	164	"norm ((z::complex) - of_int m) \<ge> norm (z - of_int (round (Re z)))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	165	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	166	let ?n = "round (Re z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	167	have "norm (z - of_int ?n) = sqrt ((Re z - of_int ?n)\<^sup>2 + (Im z)\<^sup>2)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	168	by (simp add: cmod_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	169	also have "\<bar>Re z - of_int ?n\<bar> \<le> \<bar>Re z - of_int m\<bar>" by (rule round_diff_minimal)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	170	hence "sqrt ((Re z - of_int ?n)\<^sup>2 + (Im z)\<^sup>2) \<le> sqrt ((Re z - of_int m)\<^sup>2 + (Im z)\<^sup>2)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	171	by (intro real_sqrt_le_mono add_mono) (simp_all add: abs_le_square_iff)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	172	also have "\<dots> = norm (z - of_int m)" by (simp add: cmod_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	173	finally show ?thesis .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	174	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	175
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	176	lemma Re_pos_in_ball:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	177	assumes "Re z > 0" "t \<in> ball z (Re z/2)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	178	shows "Re t > 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	179	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	180	have "Re (z - t) \<le> norm (z - t)" by (rule complex_Re_le_cmod)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	181	also from assms have "\<dots> < Re z / 2" by (simp add: dist_complex_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	182	finally show "Re t > 0" using assms by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	183	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	184
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	185	lemma no_nonpos_Int_in_ball_complex:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	186	assumes "Re z > 0" "t \<in> ball z (Re z/2)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	187	shows "t \<notin> \<int>\<^sub>\<le>\<^sub>0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	188	using Re_pos_in_ball[OF assms] by (force elim!: nonpos_Ints_cases)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	189
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	190	lemma no_nonpos_Int_in_ball:
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	191	assumes "t \<in> ball z (dist z (round (Re z)))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	192	shows "t \<notin> \<int>\<^sub>\<le>\<^sub>0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	193	proof
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	194	assume "t \<in> \<int>\<^sub>\<le>\<^sub>0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	195	then obtain n where "t = of_int n" by (auto elim!: nonpos_Ints_cases)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	196	have "dist z (of_int n) \<le> dist z t + dist t (of_int n)" by (rule dist_triangle)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	197	also from assms have "dist z t < dist z (round (Re z))" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	198	also have "\<dots> \<le> dist z (of_int n)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	199	using round_Re_minimises_norm[of z] by (simp add: dist_complex_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	200	finally have "dist t (of_int n) > 0" by simp
62072 bf3d9f113474 isabelle update_cartouches -c -t; wenzelm parents: 62055 diff changeset	201	with \<open>t = of_int n\<close> show False by simp
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	202	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	203
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	204	lemma no_nonpos_Int_in_ball':
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	205	assumes "(z :: 'a :: {euclidean_space,real_normed_algebra_1}) \<notin> \<int>\<^sub>\<le>\<^sub>0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	206	obtains d where "d > 0" "\<And>t. t \<in> ball z d \<Longrightarrow> t \<notin> \<int>\<^sub>\<le>\<^sub>0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	207	proof (rule that)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	208	from assms show "setdist {z} \<int>\<^sub>\<le>\<^sub>0 > 0" by (subst setdist_gt_0_compact_closed) auto
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	209	next
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	210	fix t assume "t \<in> ball z (setdist {z} \<int>\<^sub>\<le>\<^sub>0)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	211	thus "t \<notin> \<int>\<^sub>\<le>\<^sub>0" using setdist_le_dist[of z "{z}" t "\<int>\<^sub>\<le>\<^sub>0"] by force
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	212	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	213
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	214	lemma no_nonpos_Real_in_ball:
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	215	assumes z: "z \<notin> \<real>\<^sub>\<le>\<^sub>0" and t: "t \<in> ball z (if Im z = 0 then Re z / 2 else abs (Im z) / 2)"
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	216	shows "t \<notin> \<real>\<^sub>\<le>\<^sub>0"
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	217	using z
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	218	proof (cases "Im z = 0")
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	219	assume A: "Im z = 0"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	220	with z have "Re z > 0" by (force simp add: complex_nonpos_Reals_iff)
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	221	with t A Re_pos_in_ball[of z t] show ?thesis by (force simp add: complex_nonpos_Reals_iff)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	222	next
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	223	assume A: "Im z \<noteq> 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	224	have "abs (Im z) - abs (Im t) \<le> abs (Im z - Im t)" by linarith
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	225	also have "\<dots> = abs (Im (z - t))" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	226	also have "\<dots> \<le> norm (z - t)" by (rule abs_Im_le_cmod)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	227	also from A t have "\<dots> \<le> abs (Im z) / 2" by (simp add: dist_complex_def)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	228	finally have "abs (Im t) > 0" using A by simp
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	229	thus ?thesis by (force simp add: complex_nonpos_Reals_iff)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	230	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	231
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	232
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	233	subsection \<open>Definitions\<close>
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	234
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	235	text \<open>
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	236	We define the Gamma function by first defining its multiplicative inverse @{term "Gamma_inv"}.
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	237	This is more convenient because @{term "Gamma_inv"} is entire, which makes proofs of its
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	238	properties more convenient because one does not have to watch out for discontinuities.
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	239	(e.g. @{term "Gamma_inv"} fulfils @{term "rGamma z = z * rGamma (z + 1)"} everywhere,
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	240	whereas @{term "Gamma"} does not fulfil the analogous equation on the non-positive integers)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	241
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	242	We define the Gamma function (resp. its inverse) in the Euler form. This form has the advantage
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	243	that it is a relatively simple limit that converges everywhere. The limit at the poles is 0
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	244	(due to division by 0). The functional equation @{term "Gamma (z + 1) = z * Gamma z"} follows
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	245	immediately from the definition.
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	246	\<close>
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	247
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	248	definition Gamma_series :: "('a :: {banach,real_normed_field}) \<Rightarrow> nat \<Rightarrow> 'a" where
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	249	"Gamma_series z n = fact n * exp (z * of_real (ln (of_nat n))) / pochhammer z (n+1)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	250
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	251	definition Gamma_series' :: "('a :: {banach,real_normed_field}) \<Rightarrow> nat \<Rightarrow> 'a" where
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	252	"Gamma_series' z n = fact (n - 1) * exp (z * of_real (ln (of_nat n))) / pochhammer z n"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	253
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	254	definition rGamma_series :: "('a :: {banach,real_normed_field}) \<Rightarrow> nat \<Rightarrow> 'a" where
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	255	"rGamma_series z n = pochhammer z (n+1) / (fact n * exp (z * of_real (ln (of_nat n))))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	256
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	257	lemma Gamma_series_altdef: "Gamma_series z n = inverse (rGamma_series z n)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	258	and rGamma_series_altdef: "rGamma_series z n = inverse (Gamma_series z n)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	259	unfolding Gamma_series_def rGamma_series_def by simp_all
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	260
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	261	lemma rGamma_series_minus_of_nat:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	262	"eventually (\<lambda>n. rGamma_series (- of_nat k) n = 0) sequentially"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	263	using eventually_ge_at_top[of k]
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	264	by eventually_elim (auto simp: rGamma_series_def pochhammer_of_nat_eq_0_iff)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	265
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	266	lemma Gamma_series_minus_of_nat:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	267	"eventually (\<lambda>n. Gamma_series (- of_nat k) n = 0) sequentially"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	268	using eventually_ge_at_top[of k]
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	269	by eventually_elim (auto simp: Gamma_series_def pochhammer_of_nat_eq_0_iff)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	270
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	271	lemma Gamma_series'_minus_of_nat:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	272	"eventually (\<lambda>n. Gamma_series' (- of_nat k) n = 0) sequentially"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	273	using eventually_gt_at_top[of k]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	274	by eventually_elim (auto simp: Gamma_series'_def pochhammer_of_nat_eq_0_iff)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	275
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	276	lemma rGamma_series_nonpos_Ints_LIMSEQ: "z \<in> \<int>\<^sub>\<le>\<^sub>0 \<Longrightarrow> rGamma_series z \<longlonglongrightarrow> 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	277	by (elim nonpos_Ints_cases', hypsubst, subst tendsto_cong, rule rGamma_series_minus_of_nat, simp)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	278
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	279	lemma Gamma_series_nonpos_Ints_LIMSEQ: "z \<in> \<int>\<^sub>\<le>\<^sub>0 \<Longrightarrow> Gamma_series z \<longlonglongrightarrow> 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	280	by (elim nonpos_Ints_cases', hypsubst, subst tendsto_cong, rule Gamma_series_minus_of_nat, simp)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	281
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	282	lemma Gamma_series'_nonpos_Ints_LIMSEQ: "z \<in> \<int>\<^sub>\<le>\<^sub>0 \<Longrightarrow> Gamma_series' z \<longlonglongrightarrow> 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	283	by (elim nonpos_Ints_cases', hypsubst, subst tendsto_cong, rule Gamma_series'_minus_of_nat, simp)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	284
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	285	lemma Gamma_series_Gamma_series':
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	286	assumes z: "z \<notin> \<int>\<^sub>\<le>\<^sub>0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	287	shows "(\<lambda>n. Gamma_series' z n / Gamma_series z n) \<longlonglongrightarrow> 1"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	288	proof (rule Lim_transform_eventually)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	289	from eventually_gt_at_top[of "0::nat"]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	290	show "eventually (\<lambda>n. z / of_nat n + 1 = Gamma_series' z n / Gamma_series z n) sequentially"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	291	proof eventually_elim
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	292	fix n :: nat assume n: "n > 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	293	from n z have "Gamma_series' z n / Gamma_series z n = (z + of_nat n) / of_nat n"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	294	by (cases n, simp)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	295	(auto simp add: Gamma_series_def Gamma_series'_def pochhammer_rec'
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	296	dest: pochhammer_eq_0_imp_nonpos_Int plus_of_nat_eq_0_imp)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	297	also from n have "\<dots> = z / of_nat n + 1" by (simp add: divide_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	298	finally show "z / of_nat n + 1 = Gamma_series' z n / Gamma_series z n" ..
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	299	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	300	have "(\<lambda>x. z / of_nat x) \<longlonglongrightarrow> 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	301	by (rule tendsto_norm_zero_cancel)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	302	(insert tendsto_mult[OF tendsto_const[of "norm z"] lim_inverse_n],
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	303	simp add: norm_divide inverse_eq_divide)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	304	from tendsto_add[OF this tendsto_const[of 1]] show "(\<lambda>n. z / of_nat n + 1) \<longlonglongrightarrow> 1" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	305	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	306
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	307
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	308	subsection \<open>Convergence of the Euler series form\<close>
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	309
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	310	text \<open>
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	311	We now show that the series that defines the Gamma function in the Euler form converges
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	312	and that the function defined by it is continuous on the complex halfspace with positive
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	313	real part.
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	314
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	315	We do this by showing that the logarithm of the Euler series is continuous and converges
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	316	locally uniformly, which means that the log-Gamma function defined by its limit is also
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	317	continuous.
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	318
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	319	This will later allow us to lift holomorphicity and continuity from the log-Gamma
62085 5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	320	function to the inverse of the Gamma function, and from that to the Gamma function itself.
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	321	\<close>
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	322
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	323	definition ln_Gamma_series :: "('a :: {banach,real_normed_field,ln}) \<Rightarrow> nat \<Rightarrow> 'a" where
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	324	"ln_Gamma_series z n = z * ln (of_nat n) - ln z - (\<Sum>k=1..n. ln (z / of_nat k + 1))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	325
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	326	definition ln_Gamma_series' :: "('a :: {banach,real_normed_field,ln}) \<Rightarrow> nat \<Rightarrow> 'a" where
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	327	"ln_Gamma_series' z n =
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	328	- euler_mascheroni*z - ln z + (\<Sum>k=1..n. z / of_nat n - ln (z / of_nat k + 1))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	329
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	330	definition ln_Gamma :: "('a :: {banach,real_normed_field,ln}) \<Rightarrow> 'a" where
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	331	"ln_Gamma z = lim (ln_Gamma_series z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	332
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	333
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	334	text \<open>
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	335	We now show that the log-Gamma series converges locally uniformly for all complex numbers except
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	336	the non-positive integers. We do this by proving that the series is locally Cauchy, adapting this
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	337	proof:
68224 1f7308050349 prefer HTTPS; wenzelm parents: 68046 diff changeset	338	https://math.stackexchange.com/questions/887158/convergence-of-gammaz-lim-n-to-infty-fracnzn-prod-m-0nzm
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	339	\<close>
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	340
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	341	context
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	342	begin
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	343
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	344	private lemma ln_Gamma_series_complex_converges_aux:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	345	fixes z :: complex and k :: nat
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	346	assumes z: "z \<noteq> 0" and k: "of_nat k \<ge> 2*norm z" "k \<ge> 2"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	347	shows "norm (z * ln (1 - 1/of_nat k) + ln (z/of_nat k + 1)) \<le> 2*(norm z + norm z^2) / of_nat k^2"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	348	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	349	let ?k = "of_nat k :: complex" and ?z = "norm z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	350	have "z ln (1 - 1/?k) + ln (z/?k+1) = z(ln (1 - 1/?k :: complex) + 1/?k) + (ln (1+z/?k) - z/?k)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	351	by (simp add: algebra_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	352	also have "norm ... \<le> ?z * norm (ln (1-1/?k) + 1/?k :: complex) + norm (ln (1+z/?k) - z/?k)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	353	by (subst norm_mult [symmetric], rule norm_triangle_ineq)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	354	also have "norm (Ln (1 + -1/?k) - (-1/?k)) \<le> (norm (-1/?k))\<^sup>2 / (1 - norm(-1/?k))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	355	using k by (intro Ln_approx_linear) (simp add: norm_divide)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	356	hence "?z * norm (ln (1-1/?k) + 1/?k) \<le> ?z * ((norm (1/?k))^2 / (1 - norm (1/?k)))"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	357	by (intro mult_left_mono) simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	358	also have "... \<le> (?z * (of_nat k / (of_nat k - 1))) / of_nat k^2" using k
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	359	by (simp add: field_simps power2_eq_square norm_divide)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	360	also have "... \<le> (?z * 2) / of_nat k^2" using k
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	361	by (intro divide_right_mono mult_left_mono) (simp_all add: field_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	362	also have "norm (ln (1+z/?k) - z/?k) \<le> norm (z/?k)^2 / (1 - norm (z/?k))" using k
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	363	by (intro Ln_approx_linear) (simp add: norm_divide)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	364	hence "norm (ln (1+z/?k) - z/?k) \<le> ?z^2 / of_nat k^2 / (1 - ?z / of_nat k)"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	365	by (simp add: field_simps norm_divide)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	366	also have "... \<le> (?z^2 * (of_nat k / (of_nat k - ?z))) / of_nat k^2" using k
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	367	by (simp add: field_simps power2_eq_square)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	368	also have "... \<le> (?z^2 * 2) / of_nat k^2" using k
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	369	by (intro divide_right_mono mult_left_mono) (simp_all add: field_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	370	also note add_divide_distrib [symmetric]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	371	finally show ?thesis by (simp only: distrib_left mult.commute)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	372	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	373
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	374	lemma ln_Gamma_series_complex_converges:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	375	assumes z: "z \<notin> \<int>\<^sub>\<le>\<^sub>0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	376	assumes d: "d > 0" "\<And>n. n \<in> \<int>\<^sub>\<le>\<^sub>0 \<Longrightarrow> norm (z - of_int n) > d"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	377	shows "uniformly_convergent_on (ball z d) (\<lambda>n z. ln_Gamma_series z n :: complex)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	378	proof (intro Cauchy_uniformly_convergent uniformly_Cauchy_onI')
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	379	fix e :: real assume e: "e > 0"
63040 eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62534 diff changeset	380	define e'' where "e'' = (SUP t:ball z d. norm t + norm t^2)"
eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62534 diff changeset	381	define e' where "e' = e / (2*e'')"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	382	have "bounded ((\<lambda>t. norm t + norm t^2) ` cball z d)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	383	by (intro compact_imp_bounded compact_continuous_image) (auto intro!: continuous_intros)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	384	hence "bounded ((\<lambda>t. norm t + norm t^2) ` ball z d)" by (rule bounded_subset) auto
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	385	hence bdd: "bdd_above ((\<lambda>t. norm t + norm t^2) ` ball z d)" by (rule bounded_imp_bdd_above)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	386
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	387	with z d(1) d(2)[of "-1"] have e''_pos: "e'' > 0" unfolding e''_def
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	388	by (subst less_cSUP_iff) (auto intro!: add_pos_nonneg bexI[of _ z])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	389	have e'': "norm t + norm t^2 \<le> e''" if "t \<in> ball z d" for t unfolding e''_def using that
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	390	by (rule cSUP_upper[OF _ bdd])
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	391	from e z e''_pos have e': "e' > 0" unfolding e'_def
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	392	by (intro divide_pos_pos mult_pos_pos add_pos_pos) (simp_all add: field_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	393
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	394	have "summable (\<lambda>k. inverse ((real_of_nat k)^2))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	395	by (rule inverse_power_summable) simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	396	from summable_partial_sum_bound[OF this e'] guess M . note M = this
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	397
63040 eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62534 diff changeset	398	define N where "N = max 2 (max (nat \<lceil>2 * (norm z + d)\<rceil>) M)"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	399	{
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	400	from d have "\<lceil>2 * (cmod z + d)\<rceil> \<ge> \<lceil>0::real\<rceil>"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	401	by (intro ceiling_mono mult_nonneg_nonneg add_nonneg_nonneg) simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	402	hence "2 * (norm z + d) \<le> of_nat (nat \<lceil>2 * (norm z + d)\<rceil>)" unfolding N_def
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	403	by (simp_all add: le_of_int_ceiling)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	404	also have "... \<le> of_nat N" unfolding N_def
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	405	by (subst of_nat_le_iff) (rule max.coboundedI2, rule max.cobounded1)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	406	finally have "of_nat N \<ge> 2 * (norm z + d)" .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	407	moreover have "N \<ge> 2" "N \<ge> M" unfolding N_def by simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	408	moreover have "(\<Sum>k=m..n. 1/(of_nat k)\<^sup>2) < e'" if "m \<ge> N" for m n
62072 bf3d9f113474 isabelle update_cartouches -c -t; wenzelm parents: 62055 diff changeset	409	using M[OF order.trans[OF \<open>N \<ge> M\<close> that]] unfolding real_norm_def
64267 b9a1486e79be setsum -> sum nipkow parents: 63992 diff changeset	410	by (subst (asm) abs_of_nonneg) (auto intro: sum_nonneg simp: divide_simps)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	411	moreover note calculation
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	412	} note N = this
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	413
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	414	show "\<exists>M. \<forall>t\<in>ball z d. \<forall>m\<ge>M. \<forall>n>m. dist (ln_Gamma_series t m) (ln_Gamma_series t n) < e"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	415	unfolding dist_complex_def
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	416	proof (intro exI[of _ N] ballI allI impI)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	417	fix t m n assume t: "t \<in> ball z d" and mn: "m \<ge> N" "n > m"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	418	from d(2)[of 0] t have "0 < dist z 0 - dist z t" by (simp add: field_simps dist_complex_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	419	also have "dist z 0 - dist z t \<le> dist 0 t" using dist_triangle[of 0 z t]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	420	by (simp add: dist_commute)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	421	finally have t_nz: "t \<noteq> 0" by auto
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	422
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	423	have "norm t \<le> norm z + norm (t - z)" by (rule norm_triangle_sub)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	424	also from t have "norm (t - z) < d" by (simp add: dist_complex_def norm_minus_commute)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	425	also have "2 * (norm z + d) \<le> of_nat N" by (rule N)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	426	also have "N \<le> m" by (rule mn)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	427	finally have norm_t: "2 * norm t < of_nat m" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	428
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	429	have "ln_Gamma_series t m - ln_Gamma_series t n =
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	430	(-(t * Ln (of_nat n)) - (-(t * Ln (of_nat m)))) +
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	431	((\<Sum>k=1..n. Ln (t / of_nat k + 1)) - (\<Sum>k=1..m. Ln (t / of_nat k + 1)))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	432	by (simp add: ln_Gamma_series_def algebra_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	433	also have "(\<Sum>k=1..n. Ln (t / of_nat k + 1)) - (\<Sum>k=1..m. Ln (t / of_nat k + 1)) =
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	434	(\<Sum>k\<in>{1..n}-{1..m}. Ln (t / of_nat k + 1))" using mn
64267 b9a1486e79be setsum -> sum nipkow parents: 63992 diff changeset	435	by (simp add: sum_diff)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	436	also from mn have "{1..n}-{1..m} = {Suc m..n}" by fastforce
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	437	also have "-(t * Ln (of_nat n)) - (-(t * Ln (of_nat m))) =
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	438	(\<Sum>k = Suc m..n. t * Ln (of_nat (k - 1)) - t * Ln (of_nat k))" using mn
64267 b9a1486e79be setsum -> sum nipkow parents: 63992 diff changeset	439	by (subst sum_telescope'' [symmetric]) simp_all
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	440	also have "... = (\<Sum>k = Suc m..n. t * Ln (of_nat (k - 1) / of_nat k))" using mn N
64267 b9a1486e79be setsum -> sum nipkow parents: 63992 diff changeset	441	by (intro sum_cong_Suc)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	442	(simp_all del: of_nat_Suc add: field_simps Ln_of_nat Ln_of_nat_over_of_nat)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	443	also have "of_nat (k - 1) / of_nat k = 1 - 1 / (of_nat k :: complex)" if "k \<in> {Suc m..n}" for k
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	444	using that of_nat_eq_0_iff[of "Suc i" for i] by (cases k) (simp_all add: divide_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	445	hence "(\<Sum>k = Suc m..n. t * Ln (of_nat (k - 1) / of_nat k)) =
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	446	(\<Sum>k = Suc m..n. t * Ln (1 - 1 / of_nat k))" using mn N
64267 b9a1486e79be setsum -> sum nipkow parents: 63992 diff changeset	447	by (intro sum.cong) simp_all
b9a1486e79be setsum -> sum nipkow parents: 63992 diff changeset	448	also note sum.distrib [symmetric]
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	449	also have "norm (\<Sum>k=Suc m..n. t * Ln (1 - 1/of_nat k) + Ln (t/of_nat k + 1)) \<le>
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	450	(\<Sum>k=Suc m..n. 2 * (norm t + (norm t)\<^sup>2) / (real_of_nat k)\<^sup>2)" using t_nz N(2) mn norm_t
64267 b9a1486e79be setsum -> sum nipkow parents: 63992 diff changeset	451	by (intro order.trans[OF norm_sum sum_mono[OF ln_Gamma_series_complex_converges_aux]]) simp_all
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	452	also have "... \<le> 2 * (norm t + norm t^2) * (\<Sum>k=Suc m..n. 1 / (of_nat k)\<^sup>2)"
64267 b9a1486e79be setsum -> sum nipkow parents: 63992 diff changeset	453	by (simp add: sum_distrib_left)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	454	also have "... < 2 * (norm t + norm t^2) * e'" using mn z t_nz
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	455	by (intro mult_strict_left_mono N mult_pos_pos add_pos_pos) simp_all
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	456	also from e''_pos have "... = e * ((cmod t + (cmod t)\<^sup>2) / e'')"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	457	by (simp add: e'_def field_simps power2_eq_square)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	458	also from e''[OF t] e''_pos e
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	459	have "\<dots> \<le> e * 1" by (intro mult_left_mono) (simp_all add: field_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	460	finally show "norm (ln_Gamma_series t m - ln_Gamma_series t n) < e" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	461	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	462	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	463
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	464	end
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	465
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	466	lemma ln_Gamma_series_complex_converges':
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	467	assumes z: "(z :: complex) \<notin> \<int>\<^sub>\<le>\<^sub>0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	468	shows "\<exists>d>0. uniformly_convergent_on (ball z d) (\<lambda>n z. ln_Gamma_series z n)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	469	proof -
63040 eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62534 diff changeset	470	define d' where "d' = Re z"
eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62534 diff changeset	471	define d where "d = (if d' > 0 then d' / 2 else norm (z - of_int (round d')) / 2)"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	472	have "of_int (round d') \<in> \<int>\<^sub>\<le>\<^sub>0" if "d' \<le> 0" using that
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	473	by (intro nonpos_Ints_of_int) (simp_all add: round_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	474	with assms have d_pos: "d > 0" unfolding d_def by (force simp: not_less)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	475
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	476	have "d < cmod (z - of_int n)" if "n \<in> \<int>\<^sub>\<le>\<^sub>0" for n
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	477	proof (cases "Re z > 0")
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	478	case True
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	479	from nonpos_Ints_nonpos[OF that] have n: "n \<le> 0" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	480	from True have "d = Re z/2" by (simp add: d_def d'_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	481	also from n True have "\<dots> < Re (z - of_int n)" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	482	also have "\<dots> \<le> norm (z - of_int n)" by (rule complex_Re_le_cmod)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	483	finally show ?thesis .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	484	next
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	485	case False
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	486	with assms nonpos_Ints_of_int[of "round (Re z)"]
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	487	have "z \<noteq> of_int (round d')" by (auto simp: not_less)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	488	with False have "d < norm (z - of_int (round d'))" by (simp add: d_def d'_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	489	also have "\<dots> \<le> norm (z - of_int n)" unfolding d'_def by (rule round_Re_minimises_norm)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	490	finally show ?thesis .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	491	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	492	hence conv: "uniformly_convergent_on (ball z d) (\<lambda>n z. ln_Gamma_series z n)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	493	by (intro ln_Gamma_series_complex_converges d_pos z) simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	494	from d_pos conv show ?thesis by blast
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	495	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	496
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	497	lemma ln_Gamma_series_complex_converges'': "(z :: complex) \<notin> \<int>\<^sub>\<le>\<^sub>0 \<Longrightarrow> convergent (ln_Gamma_series z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	498	by (drule ln_Gamma_series_complex_converges') (auto intro: uniformly_convergent_imp_convergent)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	499
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	500	lemma ln_Gamma_complex_LIMSEQ: "(z :: complex) \<notin> \<int>\<^sub>\<le>\<^sub>0 \<Longrightarrow> ln_Gamma_series z \<longlonglongrightarrow> ln_Gamma z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	501	using ln_Gamma_series_complex_converges'' by (simp add: convergent_LIMSEQ_iff ln_Gamma_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	502
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	503	lemma exp_ln_Gamma_series_complex:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	504	assumes "n > 0" "z \<notin> \<int>\<^sub>\<le>\<^sub>0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	505	shows "exp (ln_Gamma_series z n :: complex) = Gamma_series z n"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	506	proof -
63417 c184ec919c70 more lemmas to emphasize {0::nat..(<)n} as canonical representation of intervals on nat haftmann parents: 63367 diff changeset	507	from assms obtain m where m: "n = Suc m" by (cases n) blast
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	508	from assms have "z \<noteq> 0" by (intro notI) auto
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	509	with assms have "exp (ln_Gamma_series z n) =
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	510	(of_nat n) powr z / (z * (\<Prod>k=1..n. exp (Ln (z / of_nat k + 1))))"
64267 b9a1486e79be setsum -> sum nipkow parents: 63992 diff changeset	511	unfolding ln_Gamma_series_def powr_def by (simp add: exp_diff exp_sum)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	512	also from assms have "(\<Prod>k=1..n. exp (Ln (z / of_nat k + 1))) = (\<Prod>k=1..n. z / of_nat k + 1)"
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	513	by (intro prod.cong[OF refl], subst exp_Ln) (auto simp: field_simps plus_of_nat_eq_0_imp)
63417 c184ec919c70 more lemmas to emphasize {0::nat..(<)n} as canonical representation of intervals on nat haftmann parents: 63367 diff changeset	514	also have "... = (\<Prod>k=1..n. z + k) / fact n"
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	515	by (simp add: fact_prod)
f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	516	(subst prod_dividef [symmetric], simp_all add: field_simps)
63417 c184ec919c70 more lemmas to emphasize {0::nat..(<)n} as canonical representation of intervals on nat haftmann parents: 63367 diff changeset	517	also from m have "z * ... = (\<Prod>k=0..n. z + k) / fact n"
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	518	by (simp add: prod.atLeast0_atMost_Suc_shift prod.atLeast_Suc_atMost_Suc_shift)
63417 c184ec919c70 more lemmas to emphasize {0::nat..(<)n} as canonical representation of intervals on nat haftmann parents: 63367 diff changeset	519	also have "(\<Prod>k=0..n. z + k) = pochhammer z (Suc n)"
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	520	unfolding pochhammer_prod
f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	521	by (simp add: prod.atLeast0_atMost_Suc atLeastLessThanSuc_atLeastAtMost)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	522	also have "of_nat n powr z / (pochhammer z (Suc n) / fact n) = Gamma_series z n"
66936 cf8d8fc23891 tuned some proofs and added some lemmas haftmann parents: 66526 diff changeset	523	unfolding Gamma_series_def using assms by (simp add: divide_simps powr_def)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	524	finally show ?thesis .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	525	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	526
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	527
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	528	lemma ln_Gamma_series'_aux:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	529	assumes "(z::complex) \<notin> \<int>\<^sub>\<le>\<^sub>0"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	530	shows "(\<lambda>k. z / of_nat (Suc k) - ln (1 + z / of_nat (Suc k))) sums
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	531	(ln_Gamma z + euler_mascheroni * z + ln z)" (is "?f sums ?s")
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	532	unfolding sums_def
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	533	proof (rule Lim_transform)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	534	show "(\<lambda>n. ln_Gamma_series z n + of_real (harm n - ln (of_nat n)) * z + ln z) \<longlonglongrightarrow> ?s"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	535	(is "?g \<longlonglongrightarrow> _")
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	536	by (intro tendsto_intros ln_Gamma_complex_LIMSEQ euler_mascheroni_LIMSEQ_of_real assms)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	537
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	538	have A: "eventually (\<lambda>n. (\<Sum>k<n. ?f k) - ?g n = 0) sequentially"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	539	using eventually_gt_at_top[of "0::nat"]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	540	proof eventually_elim
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	541	fix n :: nat assume n: "n > 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	542	have "(\<Sum>k<n. ?f k) = (\<Sum>k=1..n. z / of_nat k - ln (1 + z / of_nat k))"
64267 b9a1486e79be setsum -> sum nipkow parents: 63992 diff changeset	543	by (subst atLeast0LessThan [symmetric], subst sum_shift_bounds_Suc_ivl [symmetric],
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	544	subst atLeastLessThanSuc_atLeastAtMost) simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	545	also have "\<dots> = z * of_real (harm n) - (\<Sum>k=1..n. ln (1 + z / of_nat k))"
64267 b9a1486e79be setsum -> sum nipkow parents: 63992 diff changeset	546	by (simp add: harm_def sum_subtractf sum_distrib_left divide_inverse)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	547	also from n have "\<dots> - ?g n = 0"
64267 b9a1486e79be setsum -> sum nipkow parents: 63992 diff changeset	548	by (simp add: ln_Gamma_series_def sum_subtractf algebra_simps Ln_of_nat)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	549	finally show "(\<Sum>k<n. ?f k) - ?g n = 0" .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	550	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	551	show "(\<lambda>n. (\<Sum>k<n. ?f k) - ?g n) \<longlonglongrightarrow> 0" by (subst tendsto_cong[OF A]) simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	552	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	553
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	554
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	555	lemma uniformly_summable_deriv_ln_Gamma:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	556	assumes z: "(z :: 'a :: {real_normed_field,banach}) \<noteq> 0" and d: "d > 0" "d \<le> norm z/2"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	557	shows "uniformly_convergent_on (ball z d)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	558	(\<lambda>k z. \<Sum>i<k. inverse (of_nat (Suc i)) - inverse (z + of_nat (Suc i)))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	559	(is "uniformly_convergent_on _ (\<lambda>k z. \<Sum>i<k. ?f i z)")
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	560	proof (rule weierstrass_m_test'_ev)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	561	{
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	562	fix t assume t: "t \<in> ball z d"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	563	have "norm z = norm (t + (z - t))" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	564	have "norm (t + (z - t)) \<le> norm t + norm (z - t)" by (rule norm_triangle_ineq)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	565	also from t d have "norm (z - t) < norm z / 2" by (simp add: dist_norm)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	566	finally have A: "norm t > norm z / 2" using z by (simp add: field_simps)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	567
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	568	have "norm t = norm (z + (t - z))" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	569	also have "\<dots> \<le> norm z + norm (t - z)" by (rule norm_triangle_ineq)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	570	also from t d have "norm (t - z) \<le> norm z / 2" by (simp add: dist_norm norm_minus_commute)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	571	also from z have "\<dots> < norm z" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	572	finally have B: "norm t < 2 * norm z" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	573	note A B
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	574	} note ball = this
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	575
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	576	show "eventually (\<lambda>n. \<forall>t\<in>ball z d. norm (?f n t) \<le> 4 * norm z * inverse (of_nat (Suc n)^2)) sequentially"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	577	using eventually_gt_at_top apply eventually_elim
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	578	proof safe
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	579	fix t :: 'a assume t: "t \<in> ball z d"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	580	from z ball[OF t] have t_nz: "t \<noteq> 0" by auto
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	581	fix n :: nat assume n: "n > nat \<lceil>4 * norm z\<rceil>"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	582	from ball[OF t] t_nz have "4 * norm z > 2 * norm t" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	583	also from n have "\<dots> < of_nat n" by linarith
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	584	finally have n: "of_nat n > 2 * norm t" .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	585	hence "of_nat n > norm t" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	586	hence t': "t \<noteq> -of_nat (Suc n)" by (intro notI) (simp del: of_nat_Suc)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	587
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	588	with t_nz have "?f n t = 1 / (of_nat (Suc n) * (1 + of_nat (Suc n)/t))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	589	by (simp add: divide_simps eq_neg_iff_add_eq_0 del: of_nat_Suc)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	590	also have "norm \<dots> = inverse (of_nat (Suc n)) * inverse (norm (of_nat (Suc n)/t + 1))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	591	by (simp add: norm_divide norm_mult divide_simps add_ac del: of_nat_Suc)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	592	also {
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	593	from z t_nz ball[OF t] have "of_nat (Suc n) / (4 * norm z) \<le> of_nat (Suc n) / (2 * norm t)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	594	by (intro divide_left_mono mult_pos_pos) simp_all
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	595	also have "\<dots> < norm (of_nat (Suc n) / t) - norm (1 :: 'a)"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	596	using t_nz n by (simp add: field_simps norm_divide del: of_nat_Suc)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	597	also have "\<dots> \<le> norm (of_nat (Suc n)/t + 1)" by (rule norm_diff_ineq)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	598	finally have "inverse (norm (of_nat (Suc n)/t + 1)) \<le> 4 * norm z / of_nat (Suc n)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	599	using z by (simp add: divide_simps norm_divide mult_ac del: of_nat_Suc)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	600	}
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	601	also have "inverse (real_of_nat (Suc n)) * (4 * norm z / real_of_nat (Suc n)) =
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	602	4 * norm z * inverse (of_nat (Suc n)^2)"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	603	by (simp add: divide_simps power2_eq_square del: of_nat_Suc)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	604	finally show "norm (?f n t) \<le> 4 * norm z * inverse (of_nat (Suc n)^2)"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	605	by (simp del: of_nat_Suc)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	606	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	607	next
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	608	show "summable (\<lambda>n. 4 * norm z * inverse ((of_nat (Suc n))^2))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	609	by (subst summable_Suc_iff) (simp add: summable_mult inverse_power_summable)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	610	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	611
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	612	lemma summable_deriv_ln_Gamma:
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	613	"z \<noteq> (0 :: 'a :: {real_normed_field,banach}) \<Longrightarrow>
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	614	summable (\<lambda>n. inverse (of_nat (Suc n)) - inverse (z + of_nat (Suc n)))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	615	unfolding summable_iff_convergent
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	616	by (rule uniformly_convergent_imp_convergent,
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	617	rule uniformly_summable_deriv_ln_Gamma[of z "norm z/2"]) simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	618
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	619
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	620	definition Polygamma :: "nat \<Rightarrow> ('a :: {real_normed_field,banach}) \<Rightarrow> 'a" where
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	621	"Polygamma n z = (if n = 0 then
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	622	(\<Sum>k. inverse (of_nat (Suc k)) - inverse (z + of_nat k)) - euler_mascheroni else
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	623	(-1)^Suc n * fact n * (\<Sum>k. inverse ((z + of_nat k)^Suc n)))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	624
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	625	abbreviation Digamma :: "('a :: {real_normed_field,banach}) \<Rightarrow> 'a" where
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	626	"Digamma \<equiv> Polygamma 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	627
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	628	lemma Digamma_def:
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	629	"Digamma z = (\<Sum>k. inverse (of_nat (Suc k)) - inverse (z + of_nat k)) - euler_mascheroni"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	630	by (simp add: Polygamma_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	631
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	632
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	633	lemma summable_Digamma:
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	634	assumes "(z :: 'a :: {real_normed_field,banach}) \<noteq> 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	635	shows "summable (\<lambda>n. inverse (of_nat (Suc n)) - inverse (z + of_nat n))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	636	proof -
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	637	have sums: "(\<lambda>n. inverse (z + of_nat (Suc n)) - inverse (z + of_nat n)) sums
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	638	(0 - inverse (z + of_nat 0))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	639	by (intro telescope_sums filterlim_compose[OF tendsto_inverse_0]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	640	tendsto_add_filterlim_at_infinity[OF tendsto_const] tendsto_of_nat)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	641	from summable_add[OF summable_deriv_ln_Gamma[OF assms] sums_summable[OF sums]]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	642	show "summable (\<lambda>n. inverse (of_nat (Suc n)) - inverse (z + of_nat n))" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	643	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	644
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	645	lemma summable_offset:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	646	assumes "summable (\<lambda>n. f (n + k) :: 'a :: real_normed_vector)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	647	shows "summable f"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	648	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	649	from assms have "convergent (\<lambda>m. \<Sum>n<m. f (n + k))" by (simp add: summable_iff_convergent)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	650	hence "convergent (\<lambda>m. (\<Sum>n<k. f n) + (\<Sum>n<m. f (n + k)))"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	651	by (intro convergent_add convergent_const)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	652	also have "(\<lambda>m. (\<Sum>n<k. f n) + (\<Sum>n<m. f (n + k))) = (\<lambda>m. \<Sum>n<m+k. f n)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	653	proof
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	654	fix m :: nat
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	655	have "{..<m+k} = {..<k} \<union> {k..<m+k}" by auto
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	656	also have "(\<Sum>n\<in>\<dots>. f n) = (\<Sum>n<k. f n) + (\<Sum>n=k..<m+k. f n)"
64267 b9a1486e79be setsum -> sum nipkow parents: 63992 diff changeset	657	by (rule sum.union_disjoint) auto
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	658	also have "(\<Sum>n=k..<m+k. f n) = (\<Sum>n=0..<m+k-k. f (n + k))"
66936 cf8d8fc23891 tuned some proofs and added some lemmas haftmann parents: 66526 diff changeset	659	using sum_shift_bounds_nat_ivl [of f 0 k m] by simp
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	660	finally show "(\<Sum>n<k. f n) + (\<Sum>n<m. f (n + k)) = (\<Sum>n<m+k. f n)" by (simp add: atLeast0LessThan)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	661	qed
64267 b9a1486e79be setsum -> sum nipkow parents: 63992 diff changeset	662	finally have "(\<lambda>a. sum f {..<a}) \<longlonglongrightarrow> lim (\<lambda>m. sum f {..<m + k})"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	663	by (auto simp: convergent_LIMSEQ_iff dest: LIMSEQ_offset)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	664	thus ?thesis by (auto simp: summable_iff_convergent convergent_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	665	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	666
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	667	lemma Polygamma_converges:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	668	fixes z :: "'a :: {real_normed_field,banach}"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	669	assumes z: "z \<noteq> 0" and n: "n \<ge> 2"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	670	shows "uniformly_convergent_on (ball z d) (\<lambda>k z. \<Sum>i<k. inverse ((z + of_nat i)^n))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	671	proof (rule weierstrass_m_test'_ev)
63040 eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62534 diff changeset	672	define e where "e = (1 + d / norm z)"
eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62534 diff changeset	673	define m where "m = nat \<lceil>norm z * e\<rceil>"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	674	{
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	675	fix t assume t: "t \<in> ball z d"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	676	have "norm t = norm (z + (t - z))" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	677	also have "\<dots> \<le> norm z + norm (t - z)" by (rule norm_triangle_ineq)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	678	also from t have "norm (t - z) < d" by (simp add: dist_norm norm_minus_commute)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	679	finally have "norm t < norm z * e" using z by (simp add: divide_simps e_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	680	} note ball = this
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	681
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	682	show "eventually (\<lambda>k. \<forall>t\<in>ball z d. norm (inverse ((t + of_nat k)^n)) \<le>
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	683	inverse (of_nat (k - m)^n)) sequentially"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	684	using eventually_gt_at_top[of m] apply eventually_elim
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	685	proof (intro ballI)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	686	fix k :: nat and t :: 'a assume k: "k > m" and t: "t \<in> ball z d"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	687	from k have "real_of_nat (k - m) = of_nat k - of_nat m" by (simp add: of_nat_diff)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	688	also have "\<dots> \<le> norm (of_nat k :: 'a) - norm z * e"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	689	unfolding m_def by (subst norm_of_nat) linarith
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	690	also from ball[OF t] have "\<dots> \<le> norm (of_nat k :: 'a) - norm t" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	691	also have "\<dots> \<le> norm (of_nat k + t)" by (rule norm_diff_ineq)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	692	finally have "inverse ((norm (t + of_nat k))^n) \<le> inverse (real_of_nat (k - m)^n)" using k n
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	693	by (intro le_imp_inverse_le power_mono) (simp_all add: add_ac del: of_nat_Suc)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	694	thus "norm (inverse ((t + of_nat k)^n)) \<le> inverse (of_nat (k - m)^n)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	695	by (simp add: norm_inverse norm_power power_inverse)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	696	qed
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	697
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	698	have "summable (\<lambda>k. inverse ((real_of_nat k)^n))"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	699	using inverse_power_summable[of n] n by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	700	hence "summable (\<lambda>k. inverse ((real_of_nat (k + m - m))^n))" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	701	thus "summable (\<lambda>k. inverse ((real_of_nat (k - m))^n))" by (rule summable_offset)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	702	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	703
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	704	lemma Polygamma_converges':
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	705	fixes z :: "'a :: {real_normed_field,banach}"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	706	assumes z: "z \<noteq> 0" and n: "n \<ge> 2"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	707	shows "summable (\<lambda>k. inverse ((z + of_nat k)^n))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	708	using uniformly_convergent_imp_convergent[OF Polygamma_converges[OF assms, of 1], of z]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	709	by (simp add: summable_iff_convergent)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	710
63721 492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	711	lemma Digamma_LIMSEQ:
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	712	fixes z :: "'a :: {banach,real_normed_field}"
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	713	assumes z: "z \<noteq> 0"
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	714	shows "(\<lambda>m. of_real (ln (real m)) - (\<Sum>n<m. inverse (z + of_nat n))) \<longlonglongrightarrow> Digamma z"
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	715	proof -
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	716	have "(\<lambda>n. of_real (ln (real n / (real (Suc n))))) \<longlonglongrightarrow> (of_real (ln 1) :: 'a)"
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	717	by (intro tendsto_intros LIMSEQ_n_over_Suc_n) simp_all
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	718	hence "(\<lambda>n. of_real (ln (real n / (real n + 1)))) \<longlonglongrightarrow> (0 :: 'a)" by (simp add: add_ac)
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	719	hence lim: "(\<lambda>n. of_real (ln (real n)) - of_real (ln (real n + 1))) \<longlonglongrightarrow> (0::'a)"
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	720	proof (rule Lim_transform_eventually [rotated])
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	721	show "eventually (\<lambda>n. of_real (ln (real n / (real n + 1))) =
63721 492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	722	of_real (ln (real n)) - (of_real (ln (real n + 1)) :: 'a)) at_top"
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	723	using eventually_gt_at_top[of "0::nat"] by eventually_elim (simp add: ln_div)
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	724	qed
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	725
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	726	from summable_Digamma[OF z]
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	727	have "(\<lambda>n. inverse (of_nat (n+1)) - inverse (z + of_nat n))
63721 492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	728	sums (Digamma z + euler_mascheroni)"
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	729	by (simp add: Digamma_def summable_sums)
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	730	from sums_diff[OF this euler_mascheroni_sum]
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	731	have "(\<lambda>n. of_real (ln (real (Suc n) + 1)) - of_real (ln (real n + 1)) - inverse (z + of_nat n))
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	732	sums Digamma z" by (simp add: add_ac)
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	733	hence "(\<lambda>m. (\<Sum>n<m. of_real (ln (real (Suc n) + 1)) - of_real (ln (real n + 1))) -
63721 492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	734	(\<Sum>n<m. inverse (z + of_nat n))) \<longlonglongrightarrow> Digamma z"
64267 b9a1486e79be setsum -> sum nipkow parents: 63992 diff changeset	735	by (simp add: sums_def sum_subtractf)
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	736	also have "(\<lambda>m. (\<Sum>n<m. of_real (ln (real (Suc n) + 1)) - of_real (ln (real n + 1)))) =
63721 492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	737	(\<lambda>m. of_real (ln (m + 1)) :: 'a)"
64267 b9a1486e79be setsum -> sum nipkow parents: 63992 diff changeset	738	by (subst sum_lessThan_telescope) simp_all
63721 492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	739	finally show ?thesis by (rule Lim_transform) (insert lim, simp)
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	740	qed
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	741
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	742	lemma has_field_derivative_ln_Gamma_complex [derivative_intros]:
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	743	fixes z :: complex
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	744	assumes z: "z \<notin> \<real>\<^sub>\<le>\<^sub>0"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	745	shows "(ln_Gamma has_field_derivative Digamma z) (at z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	746	proof -
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	747	have not_nonpos_Int [simp]: "t \<notin> \<int>\<^sub>\<le>\<^sub>0" if "Re t > 0" for t
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	748	using that by (auto elim!: nonpos_Ints_cases')
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	749	from z have z': "z \<notin> \<int>\<^sub>\<le>\<^sub>0" and z'': "z \<noteq> 0" using nonpos_Ints_subset_nonpos_Reals nonpos_Reals_zero_I
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	750	by blast+
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	751	let ?f' = "\<lambda>z k. inverse (of_nat (Suc k)) - inverse (z + of_nat (Suc k))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	752	let ?f = "\<lambda>z k. z / of_nat (Suc k) - ln (1 + z / of_nat (Suc k))" and ?F' = "\<lambda>z. \<Sum>n. ?f' z n"
63040 eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62534 diff changeset	753	define d where "d = min (norm z/2) (if Im z = 0 then Re z / 2 else abs (Im z) / 2)"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	754	from z have d: "d > 0" "norm z/2 \<ge> d" by (auto simp add: complex_nonpos_Reals_iff d_def)
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	755	have ball: "Im t = 0 \<longrightarrow> Re t > 0" if "dist z t < d" for t
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	756	using no_nonpos_Real_in_ball[OF z, of t] that unfolding d_def by (force simp add: complex_nonpos_Reals_iff)
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	757	have sums: "(\<lambda>n. inverse (z + of_nat (Suc n)) - inverse (z + of_nat n)) sums
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	758	(0 - inverse (z + of_nat 0))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	759	by (intro telescope_sums filterlim_compose[OF tendsto_inverse_0]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	760	tendsto_add_filterlim_at_infinity[OF tendsto_const] tendsto_of_nat)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	761
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	762	have "((\<lambda>z. \<Sum>n. ?f z n) has_field_derivative ?F' z) (at z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	763	using d z ln_Gamma_series'_aux[OF z']
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	764	apply (intro has_field_derivative_series'(2)[of "ball z d" _ _ z] uniformly_summable_deriv_ln_Gamma)
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	765	apply (auto intro!: derivative_eq_intros add_pos_pos mult_pos_pos dest!: ball
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	766	simp: field_simps sums_iff nonpos_Reals_divide_of_nat_iff
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	767	simp del: of_nat_Suc)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	768	apply (auto simp add: complex_nonpos_Reals_iff)
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	769	done
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	770	with z have "((\<lambda>z. (\<Sum>k. ?f z k) - euler_mascheroni * z - Ln z) has_field_derivative
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	771	?F' z - euler_mascheroni - inverse z) (at z)"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	772	by (force intro!: derivative_eq_intros simp: Digamma_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	773	also have "?F' z - euler_mascheroni - inverse z = (?F' z + -inverse z) - euler_mascheroni" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	774	also from sums have "-inverse z = (\<Sum>n. inverse (z + of_nat (Suc n)) - inverse (z + of_nat n))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	775	by (simp add: sums_iff)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	776	also from sums summable_deriv_ln_Gamma[OF z'']
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	777	have "?F' z + \<dots> = (\<Sum>n. inverse (of_nat (Suc n)) - inverse (z + of_nat n))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	778	by (subst suminf_add) (simp_all add: add_ac sums_iff)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	779	also have "\<dots> - euler_mascheroni = Digamma z" by (simp add: Digamma_def)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	780	finally have "((\<lambda>z. (\<Sum>k. ?f z k) - euler_mascheroni * z - Ln z)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	781	has_field_derivative Digamma z) (at z)" .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	782	moreover from eventually_nhds_ball[OF d(1), of z]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	783	have "eventually (\<lambda>z. ln_Gamma z = (\<Sum>k. ?f z k) - euler_mascheroni * z - Ln z) (nhds z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	784	proof eventually_elim
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	785	fix t assume "t \<in> ball z d"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	786	hence "t \<notin> \<int>\<^sub>\<le>\<^sub>0" by (auto dest!: ball elim!: nonpos_Ints_cases)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	787	from ln_Gamma_series'_aux[OF this]
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	788	show "ln_Gamma t = (\<Sum>k. ?f t k) - euler_mascheroni * t - Ln t" by (simp add: sums_iff)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	789	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	790	ultimately show ?thesis by (subst DERIV_cong_ev[OF refl _ refl])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	791	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	792
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	793	declare has_field_derivative_ln_Gamma_complex[THEN DERIV_chain2, derivative_intros]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	794
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	795
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	796	lemma Digamma_1 [simp]: "Digamma (1 :: 'a :: {real_normed_field,banach}) = - euler_mascheroni"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	797	by (simp add: Digamma_def)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	798
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	799	lemma Digamma_plus1:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	800	assumes "z \<noteq> 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	801	shows "Digamma (z+1) = Digamma z + 1/z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	802	proof -
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	803	have sums: "(\<lambda>k. inverse (z + of_nat k) - inverse (z + of_nat (Suc k)))
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	804	sums (inverse (z + of_nat 0) - 0)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	805	by (intro telescope_sums'[OF filterlim_compose[OF tendsto_inverse_0]]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	806	tendsto_add_filterlim_at_infinity[OF tendsto_const] tendsto_of_nat)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	807	have "Digamma (z+1) = (\<Sum>k. inverse (of_nat (Suc k)) - inverse (z + of_nat (Suc k))) -
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	808	euler_mascheroni" (is "_ = suminf ?f - _") by (simp add: Digamma_def add_ac)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	809	also have "suminf ?f = (\<Sum>k. inverse (of_nat (Suc k)) - inverse (z + of_nat k)) +
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	810	(\<Sum>k. inverse (z + of_nat k) - inverse (z + of_nat (Suc k)))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	811	using summable_Digamma[OF assms] sums by (subst suminf_add) (simp_all add: add_ac sums_iff)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	812	also have "(\<Sum>k. inverse (z + of_nat k) - inverse (z + of_nat (Suc k))) = 1/z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	813	using sums by (simp add: sums_iff inverse_eq_divide)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	814	finally show ?thesis by (simp add: Digamma_def[of z])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	815	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	816
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	817	lemma Polygamma_plus1:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	818	assumes "z \<noteq> 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	819	shows "Polygamma n (z + 1) = Polygamma n z + (-1)^n * fact n / (z ^ Suc n)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	820	proof (cases "n = 0")
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	821	assume n: "n \<noteq> 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	822	let ?f = "\<lambda>k. inverse ((z + of_nat k) ^ Suc n)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	823	have "Polygamma n (z + 1) = (-1) ^ Suc n * fact n * (\<Sum>k. ?f (k+1))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	824	using n by (simp add: Polygamma_def add_ac)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	825	also have "(\<Sum>k. ?f (k+1)) + (\<Sum>k<1. ?f k) = (\<Sum>k. ?f k)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	826	using Polygamma_converges'[OF assms, of "Suc n"] n
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	827	by (subst suminf_split_initial_segment [symmetric]) simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	828	hence "(\<Sum>k. ?f (k+1)) = (\<Sum>k. ?f k) - inverse (z ^ Suc n)" by (simp add: algebra_simps)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	829	also have "(-1) ^ Suc n * fact n * ((\<Sum>k. ?f k) - inverse (z ^ Suc n)) =
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	830	Polygamma n z + (-1)^n * fact n / (z ^ Suc n)" using n
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	831	by (simp add: inverse_eq_divide algebra_simps Polygamma_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	832	finally show ?thesis .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	833	qed (insert assms, simp add: Digamma_plus1 inverse_eq_divide)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	834
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	835	lemma Digamma_of_nat:
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	836	"Digamma (of_nat (Suc n) :: 'a :: {real_normed_field,banach}) = harm n - euler_mascheroni"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	837	proof (induction n)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	838	case (Suc n)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	839	have "Digamma (of_nat (Suc (Suc n)) :: 'a) = Digamma (of_nat (Suc n) + 1)" by simp
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	840	also have "\<dots> = Digamma (of_nat (Suc n)) + inverse (of_nat (Suc n))"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	841	by (subst Digamma_plus1) (simp_all add: inverse_eq_divide del: of_nat_Suc)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	842	also have "Digamma (of_nat (Suc n) :: 'a) = harm n - euler_mascheroni " by (rule Suc)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	843	also have "\<dots> + inverse (of_nat (Suc n)) = harm (Suc n) - euler_mascheroni"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	844	by (simp add: harm_Suc)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	845	finally show ?case .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	846	qed (simp add: harm_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	847
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	848	lemma Digamma_numeral: "Digamma (numeral n) = harm (pred_numeral n) - euler_mascheroni"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	849	by (subst of_nat_numeral[symmetric], subst numeral_eq_Suc, subst Digamma_of_nat) (rule refl)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	850
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	851	lemma Polygamma_of_real: "x \<noteq> 0 \<Longrightarrow> Polygamma n (of_real x) = of_real (Polygamma n x)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	852	unfolding Polygamma_def using summable_Digamma[of x] Polygamma_converges'[of x "Suc n"]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	853	by (simp_all add: suminf_of_real)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	854
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	855	lemma Polygamma_Real: "z \<in> \<real> \<Longrightarrow> z \<noteq> 0 \<Longrightarrow> Polygamma n z \<in> \<real>"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	856	by (elim Reals_cases, hypsubst, subst Polygamma_of_real) simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	857
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	858	lemma Digamma_half_integer:
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	859	"Digamma (of_nat n + 1/2 :: 'a :: {real_normed_field,banach}) =
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	860	(\<Sum>k<n. 2 / (of_nat (2k+1))) - euler_mascheroni - of_real (2 ln 2)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	861	proof (induction n)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	862	case 0
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	863	have "Digamma (1/2 :: 'a) = of_real (Digamma (1/2))" by (simp add: Polygamma_of_real [symmetric])
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	864	also have "Digamma (1/2::real) =
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	865	(\<Sum>k. inverse (of_nat (Suc k)) - inverse (of_nat k + 1/2)) - euler_mascheroni"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	866	by (simp add: Digamma_def add_ac)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	867	also have "(\<Sum>k. inverse (of_nat (Suc k) :: real) - inverse (of_nat k + 1/2)) =
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	868	(\<Sum>k. inverse (1/2) * (inverse (2 * of_nat (Suc k)) - inverse (2 * of_nat k + 1)))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	869	by (simp_all add: add_ac inverse_mult_distrib[symmetric] ring_distribs del: inverse_divide)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	870	also have "\<dots> = - 2 * ln 2" using sums_minus[OF alternating_harmonic_series_sums']
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	871	by (subst suminf_mult) (simp_all add: algebra_simps sums_iff)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	872	finally show ?case by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	873	next
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	874	case (Suc n)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	875	have nz: "2 * of_nat n + (1:: 'a) \<noteq> 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	876	using of_nat_neq_0[of "2*n"] by (simp only: of_nat_Suc) (simp add: add_ac)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	877	hence nz': "of_nat n + (1/2::'a) \<noteq> 0" by (simp add: field_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	878	have "Digamma (of_nat (Suc n) + 1/2 :: 'a) = Digamma (of_nat n + 1/2 + 1)" by simp
67976 75b94eb58c3d Analysis builds using set_borel_measurable_def, etc. paulson <lp15@cam.ac.uk> parents: 67399 diff changeset	879	also from nz' have "\<dots> = Digamma (of_nat n + 1/2) + 1 / (of_nat n + 1/2)"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	880	by (rule Digamma_plus1)
67976 75b94eb58c3d Analysis builds using set_borel_measurable_def, etc. paulson <lp15@cam.ac.uk> parents: 67399 diff changeset	881	also from nz nz' have "1 / (of_nat n + 1/2 :: 'a) = 2 / (2 * of_nat n + 1)"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	882	by (subst divide_eq_eq) simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	883	also note Suc
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	884	finally show ?case by (simp add: add_ac)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	885	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	886
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	887	lemma Digamma_one_half: "Digamma (1/2) = - euler_mascheroni - of_real (2 * ln 2)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	888	using Digamma_half_integer[of 0] by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	889
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	890	lemma Digamma_real_three_halves_pos: "Digamma (3/2 :: real) > 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	891	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	892	have "-Digamma (3/2 :: real) = -Digamma (of_nat 1 + 1/2)" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	893	also have "\<dots> = 2 * ln 2 + euler_mascheroni - 2" by (subst Digamma_half_integer) simp
62085 5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	894	also note euler_mascheroni_less_13_over_22
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	895	also note ln2_le_25_over_36
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	896	finally show ?thesis by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	897	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	898
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	899
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	900	lemma has_field_derivative_Polygamma [derivative_intros]:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	901	fixes z :: "'a :: {real_normed_field,euclidean_space}"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	902	assumes z: "z \<notin> \<int>\<^sub>\<le>\<^sub>0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	903	shows "(Polygamma n has_field_derivative Polygamma (Suc n) z) (at z within A)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	904	proof (rule has_field_derivative_at_within, cases "n = 0")
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	905	assume n: "n = 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	906	let ?f = "\<lambda>k z. inverse (of_nat (Suc k)) - inverse (z + of_nat k)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	907	let ?F = "\<lambda>z. \<Sum>k. ?f k z" and ?f' = "\<lambda>k z. inverse ((z + of_nat k)\<^sup>2)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	908	from no_nonpos_Int_in_ball'[OF z] guess d . note d = this
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	909	from z have summable: "summable (\<lambda>k. inverse (of_nat (Suc k)) - inverse (z + of_nat k))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	910	by (intro summable_Digamma) force
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	911	from z have conv: "uniformly_convergent_on (ball z d) (\<lambda>k z. \<Sum>i<k. inverse ((z + of_nat i)\<^sup>2))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	912	by (intro Polygamma_converges) auto
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	913	with d have "summable (\<lambda>k. inverse ((z + of_nat k)\<^sup>2))" unfolding summable_iff_convergent
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	914	by (auto dest!: uniformly_convergent_imp_convergent simp: summable_iff_convergent )
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	915
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	916	have "(?F has_field_derivative (\<Sum>k. ?f' k z)) (at z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	917	proof (rule has_field_derivative_series'[of "ball z d" _ _ z])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	918	fix k :: nat and t :: 'a assume t: "t \<in> ball z d"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	919	from t d(2)[of t] show "((\<lambda>z. ?f k z) has_field_derivative ?f' k t) (at t within ball z d)"
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	920	by (auto intro!: derivative_eq_intros simp: power2_eq_square simp del: of_nat_Suc
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	921	dest!: plus_of_nat_eq_0_imp elim!: nonpos_Ints_cases)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	922	qed (insert d(1) summable conv, (assumption\|simp)+)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	923	with z show "(Polygamma n has_field_derivative Polygamma (Suc n) z) (at z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	924	unfolding Digamma_def [abs_def] Polygamma_def [abs_def] using n
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	925	by (force simp: power2_eq_square intro!: derivative_eq_intros)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	926	next
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	927	assume n: "n \<noteq> 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	928	from z have z': "z \<noteq> 0" by auto
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	929	from no_nonpos_Int_in_ball'[OF z] guess d . note d = this
63040 eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62534 diff changeset	930	define n' where "n' = Suc n"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	931	from n have n': "n' \<ge> 2" by (simp add: n'_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	932	have "((\<lambda>z. \<Sum>k. inverse ((z + of_nat k) ^ n')) has_field_derivative
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	933	(\<Sum>k. - of_nat n' * inverse ((z + of_nat k) ^ (n'+1)))) (at z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	934	proof (rule has_field_derivative_series'[of "ball z d" _ _ z])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	935	fix k :: nat and t :: 'a assume t: "t \<in> ball z d"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	936	with d have t': "t \<notin> \<int>\<^sub>\<le>\<^sub>0" "t \<noteq> 0" by auto
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	937	show "((\<lambda>a. inverse ((a + of_nat k) ^ n')) has_field_derivative
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	938	- of_nat n' * inverse ((t + of_nat k) ^ (n'+1))) (at t within ball z d)" using t'
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	939	by (fastforce intro!: derivative_eq_intros simp: divide_simps power_diff dest: plus_of_nat_eq_0_imp)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	940	next
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	941	have "uniformly_convergent_on (ball z d)
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	942	(\<lambda>k z. (- of_nat n' :: 'a) * (\<Sum>i<k. inverse ((z + of_nat i) ^ (n'+1))))"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	943	using z' n by (intro uniformly_convergent_mult Polygamma_converges) (simp_all add: n'_def)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	944	thus "uniformly_convergent_on (ball z d)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	945	(\<lambda>k z. \<Sum>i<k. - of_nat n' * inverse ((z + of_nat i :: 'a) ^ (n'+1)))"
64267 b9a1486e79be setsum -> sum nipkow parents: 63992 diff changeset	946	by (subst (asm) sum_distrib_left) simp
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	947	qed (insert Polygamma_converges'[OF z' n'] d, simp_all)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	948	also have "(\<Sum>k. - of_nat n' * inverse ((z + of_nat k) ^ (n' + 1))) =
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	949	(- of_nat n') * (\<Sum>k. inverse ((z + of_nat k) ^ (n' + 1)))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	950	using Polygamma_converges'[OF z', of "n'+1"] n' by (subst suminf_mult) simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	951	finally have "((\<lambda>z. \<Sum>k. inverse ((z + of_nat k) ^ n')) has_field_derivative
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	952	- of_nat n' * (\<Sum>k. inverse ((z + of_nat k) ^ (n' + 1)))) (at z)" .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	953	from DERIV_cmult[OF this, of "(-1)^Suc n * fact n :: 'a"]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	954	show "(Polygamma n has_field_derivative Polygamma (Suc n) z) (at z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	955	unfolding n'_def Polygamma_def[abs_def] using n by (simp add: algebra_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	956	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	957
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	958	declare has_field_derivative_Polygamma[THEN DERIV_chain2, derivative_intros]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	959
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	960	lemma isCont_Polygamma [continuous_intros]:
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	961	fixes f :: "_ \<Rightarrow> 'a :: {real_normed_field,euclidean_space}"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	962	shows "isCont f z \<Longrightarrow> f z \<notin> \<int>\<^sub>\<le>\<^sub>0 \<Longrightarrow> isCont (\<lambda>x. Polygamma n (f x)) z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	963	by (rule isCont_o2[OF _ DERIV_isCont[OF has_field_derivative_Polygamma]])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	964
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	965	lemma continuous_on_Polygamma:
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	966	"A \<inter> \<int>\<^sub>\<le>\<^sub>0 = {} \<Longrightarrow> continuous_on A (Polygamma n :: _ \<Rightarrow> 'a :: {real_normed_field,euclidean_space})"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	967	by (intro continuous_at_imp_continuous_on isCont_Polygamma[OF continuous_ident] ballI) blast
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	968
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	969	lemma isCont_ln_Gamma_complex [continuous_intros]:
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	970	fixes f :: "'a::t2_space \<Rightarrow> complex"
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	971	shows "isCont f z \<Longrightarrow> f z \<notin> \<real>\<^sub>\<le>\<^sub>0 \<Longrightarrow> isCont (\<lambda>z. ln_Gamma (f z)) z"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	972	by (rule isCont_o2[OF _ DERIV_isCont[OF has_field_derivative_ln_Gamma_complex]])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	973
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	974	lemma continuous_on_ln_Gamma_complex [continuous_intros]:
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	975	fixes A :: "complex set"
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	976	shows "A \<inter> \<real>\<^sub>\<le>\<^sub>0 = {} \<Longrightarrow> continuous_on A ln_Gamma"
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	977	by (intro continuous_at_imp_continuous_on ballI isCont_ln_Gamma_complex[OF continuous_ident])
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	978	fastforce
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	979
64969 a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	980	lemma deriv_Polygamma:
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	981	assumes "z \<notin> \<int>\<^sub>\<le>\<^sub>0"
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	982	shows "deriv (Polygamma m) z =
64969 a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	983	Polygamma (Suc m) (z :: 'a :: {real_normed_field,euclidean_space})"
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	984	by (intro DERIV_imp_deriv has_field_derivative_Polygamma assms)
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	985	thm has_field_derivative_Polygamma
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	986
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	987	lemma higher_deriv_Polygamma:
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	988	assumes "z \<notin> \<int>\<^sub>\<le>\<^sub>0"
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	989	shows "(deriv ^^ n) (Polygamma m) z =
64969 a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	990	Polygamma (m + n) (z :: 'a :: {real_normed_field,euclidean_space})"
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	991	proof -
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	992	have "eventually (\<lambda>u. (deriv ^^ n) (Polygamma m) u = Polygamma (m + n) u) (nhds z)"
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	993	proof (induction n)
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	994	case (Suc n)
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	995	from Suc.IH have "eventually (\<lambda>z. eventually (\<lambda>u. (deriv ^^ n) (Polygamma m) u = Polygamma (m + n) u) (nhds z)) (nhds z)"
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	996	by (simp add: eventually_eventually)
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	997	hence "eventually (\<lambda>z. deriv ((deriv ^^ n) (Polygamma m)) z =
64969 a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	998	deriv (Polygamma (m + n)) z) (nhds z)"
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	999	by eventually_elim (intro deriv_cong_ev refl)
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1000	moreover have "eventually (\<lambda>z. z \<in> UNIV - \<int>\<^sub>\<le>\<^sub>0) (nhds z)" using assms
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1001	by (intro eventually_nhds_in_open open_Diff open_UNIV) auto
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1002	ultimately show ?case by eventually_elim (simp_all add: deriv_Polygamma)
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1003	qed simp_all
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1004	thus ?thesis by (rule eventually_nhds_x_imp_x)
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1005	qed
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1006
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1007	lemma deriv_ln_Gamma_complex:
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1008	assumes "z \<notin> \<real>\<^sub>\<le>\<^sub>0"
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1009	shows "deriv ln_Gamma z = Digamma (z :: complex)"
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1010	by (intro DERIV_imp_deriv has_field_derivative_ln_Gamma_complex assms)
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1011
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1012
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1013
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1014	text \<open>
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1015	We define a type class that captures all the fundamental properties of the inverse of the Gamma function
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1016	and defines the Gamma function upon that. This allows us to instantiate the type class both for
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1017	the reals and for the complex numbers with a minimal amount of proof duplication.
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1018	\<close>
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1019
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1020	class Gamma = real_normed_field + complete_space +
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1021	fixes rGamma :: "'a \<Rightarrow> 'a"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1022	assumes rGamma_eq_zero_iff_aux: "rGamma z = 0 \<longleftrightarrow> (\<exists>n. z = - of_nat n)"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1023	assumes differentiable_rGamma_aux1:
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1024	"(\<And>n. z \<noteq> - of_nat n) \<Longrightarrow>
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1025	let d = (THE d. (\<lambda>n. \<Sum>k<n. inverse (of_nat (Suc k)) - inverse (z + of_nat k))
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1026	\<longlonglongrightarrow> d) - scaleR euler_mascheroni 1
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1027	in filterlim (\<lambda>y. (rGamma y - rGamma z + rGamma z * d * (y - z)) /\<^sub>R
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1028	norm (y - z)) (nhds 0) (at z)"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1029	assumes differentiable_rGamma_aux2:
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1030	"let z = - of_nat n
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	1031	in filterlim (\<lambda>y. (rGamma y - rGamma z - (-1)^n * (prod of_nat {1..n}) * (y - z)) /\<^sub>R
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1032	norm (y - z)) (nhds 0) (at z)"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1033	assumes rGamma_series_aux: "(\<And>n. z \<noteq> - of_nat n) \<Longrightarrow>
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	1034	let fact' = (\<lambda>n. prod of_nat {1..n});
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1035	exp = (\<lambda>x. THE e. (\<lambda>n. \<Sum>k<n. x^k /\<^sub>R fact k) \<longlonglongrightarrow> e);
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1036	pochhammer' = (\<lambda>a n. (\<Prod>n = 0..n. a + of_nat n))
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1037	in filterlim (\<lambda>n. pochhammer' z n / (fact' n * exp (z * (ln (of_nat n) *\<^sub>R 1))))
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1038	(nhds (rGamma z)) sequentially"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1039	begin
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1040	subclass banach ..
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1041	end
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1042
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1043	definition "Gamma z = inverse (rGamma z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1044
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1045
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1046	subsection \<open>Basic properties\<close>
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1047
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1048	lemma Gamma_nonpos_Int: "z \<in> \<int>\<^sub>\<le>\<^sub>0 \<Longrightarrow> Gamma z = 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1049	and rGamma_nonpos_Int: "z \<in> \<int>\<^sub>\<le>\<^sub>0 \<Longrightarrow> rGamma z = 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1050	using rGamma_eq_zero_iff_aux[of z] unfolding Gamma_def by (auto elim!: nonpos_Ints_cases')
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1051
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1052	lemma Gamma_nonzero: "z \<notin> \<int>\<^sub>\<le>\<^sub>0 \<Longrightarrow> Gamma z \<noteq> 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1053	and rGamma_nonzero: "z \<notin> \<int>\<^sub>\<le>\<^sub>0 \<Longrightarrow> rGamma z \<noteq> 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1054	using rGamma_eq_zero_iff_aux[of z] unfolding Gamma_def by (auto elim!: nonpos_Ints_cases')
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1055
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1056	lemma Gamma_eq_zero_iff: "Gamma z = 0 \<longleftrightarrow> z \<in> \<int>\<^sub>\<le>\<^sub>0"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1057	and rGamma_eq_zero_iff: "rGamma z = 0 \<longleftrightarrow> z \<in> \<int>\<^sub>\<le>\<^sub>0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1058	using rGamma_eq_zero_iff_aux[of z] unfolding Gamma_def by (auto elim!: nonpos_Ints_cases')
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1059
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1060	lemma rGamma_inverse_Gamma: "rGamma z = inverse (Gamma z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1061	unfolding Gamma_def by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1062
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1063	lemma rGamma_series_LIMSEQ [tendsto_intros]:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1064	"rGamma_series z \<longlonglongrightarrow> rGamma z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1065	proof (cases "z \<in> \<int>\<^sub>\<le>\<^sub>0")
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1066	case False
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1067	hence "z \<noteq> - of_nat n" for n by auto
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1068	from rGamma_series_aux[OF this] show ?thesis
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	1069	by (simp add: rGamma_series_def[abs_def] fact_prod pochhammer_Suc_prod
63367 6c731c8b7f03 simplified definitions of combinatorial functions haftmann parents: 63317 diff changeset	1070	exp_def of_real_def[symmetric] suminf_def sums_def[abs_def] atLeast0AtMost)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1071	qed (insert rGamma_eq_zero_iff[of z], simp_all add: rGamma_series_nonpos_Ints_LIMSEQ)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1072
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1073	lemma Gamma_series_LIMSEQ [tendsto_intros]:
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1074	"Gamma_series z \<longlonglongrightarrow> Gamma z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1075	proof (cases "z \<in> \<int>\<^sub>\<le>\<^sub>0")
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1076	case False
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1077	hence "(\<lambda>n. inverse (rGamma_series z n)) \<longlonglongrightarrow> inverse (rGamma z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1078	by (intro tendsto_intros) (simp_all add: rGamma_eq_zero_iff)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1079	also have "(\<lambda>n. inverse (rGamma_series z n)) = Gamma_series z"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1080	by (simp add: rGamma_series_def Gamma_series_def[abs_def])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1081	finally show ?thesis by (simp add: Gamma_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1082	qed (insert Gamma_eq_zero_iff[of z], simp_all add: Gamma_series_nonpos_Ints_LIMSEQ)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1083
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1084	lemma Gamma_altdef: "Gamma z = lim (Gamma_series z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1085	using Gamma_series_LIMSEQ[of z] by (simp add: limI)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1086
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1087	lemma rGamma_1 [simp]: "rGamma 1 = 1"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1088	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1089	have A: "eventually (\<lambda>n. rGamma_series 1 n = of_nat (Suc n) / of_nat n) sequentially"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1090	using eventually_gt_at_top[of "0::nat"]
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1091	by (force elim!: eventually_mono simp: rGamma_series_def exp_of_real pochhammer_fact
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1092	divide_simps pochhammer_rec' dest!: pochhammer_eq_0_imp_nonpos_Int)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1093	have "rGamma_series 1 \<longlonglongrightarrow> 1" by (subst tendsto_cong[OF A]) (rule LIMSEQ_Suc_n_over_n)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1094	moreover have "rGamma_series 1 \<longlonglongrightarrow> rGamma 1" by (rule tendsto_intros)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1095	ultimately show ?thesis by (intro LIMSEQ_unique)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1096	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1097
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1098	lemma rGamma_plus1: "z * rGamma (z + 1) = rGamma z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1099	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1100	let ?f = "\<lambda>n. (z + 1) * inverse (of_nat n) + 1"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1101	have "eventually (\<lambda>n. ?f n * rGamma_series z n = z * rGamma_series (z + 1) n) sequentially"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1102	using eventually_gt_at_top[of "0::nat"]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1103	proof eventually_elim
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1104	fix n :: nat assume n: "n > 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1105	hence "z * rGamma_series (z + 1) n = inverse (of_nat n) *
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1106	pochhammer z (Suc (Suc n)) / (fact n * exp (z * of_real (ln (of_nat n))))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1107	by (subst pochhammer_rec) (simp add: rGamma_series_def field_simps exp_add exp_of_real)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1108	also from n have "\<dots> = ?f n * rGamma_series z n"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1109	by (subst pochhammer_rec') (simp_all add: divide_simps rGamma_series_def add_ac)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1110	finally show "?f n * rGamma_series z n = z * rGamma_series (z + 1) n" ..
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1111	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1112	moreover have "(\<lambda>n. ?f n * rGamma_series z n) \<longlonglongrightarrow> ((z+1) * 0 + 1) * rGamma z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1113	by (intro tendsto_intros lim_inverse_n)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1114	hence "(\<lambda>n. ?f n * rGamma_series z n) \<longlonglongrightarrow> rGamma z" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1115	ultimately have "(\<lambda>n. z * rGamma_series (z + 1) n) \<longlonglongrightarrow> rGamma z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1116	by (rule Lim_transform_eventually)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1117	moreover have "(\<lambda>n. z * rGamma_series (z + 1) n) \<longlonglongrightarrow> z * rGamma (z + 1)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1118	by (intro tendsto_intros)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1119	ultimately show "z * rGamma (z + 1) = rGamma z" using LIMSEQ_unique by blast
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1120	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1121
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1122
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1123	lemma pochhammer_rGamma: "rGamma z = pochhammer z n * rGamma (z + of_nat n)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1124	proof (induction n arbitrary: z)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1125	case (Suc n z)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1126	have "rGamma z = pochhammer z n * rGamma (z + of_nat n)" by (rule Suc.IH)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1127	also note rGamma_plus1 [symmetric]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1128	finally show ?case by (simp add: add_ac pochhammer_rec')
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1129	qed simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1130
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1131	lemma Gamma_plus1: "z \<notin> \<int>\<^sub>\<le>\<^sub>0 \<Longrightarrow> Gamma (z + 1) = z * Gamma z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1132	using rGamma_plus1[of z] by (simp add: rGamma_inverse_Gamma field_simps Gamma_eq_zero_iff)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1133
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1134	lemma pochhammer_Gamma: "z \<notin> \<int>\<^sub>\<le>\<^sub>0 \<Longrightarrow> pochhammer z n = Gamma (z + of_nat n) / Gamma z"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1135	using pochhammer_rGamma[of z]
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1136	by (simp add: rGamma_inverse_Gamma Gamma_eq_zero_iff field_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1137
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1138	lemma Gamma_0 [simp]: "Gamma 0 = 0"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1139	and rGamma_0 [simp]: "rGamma 0 = 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1140	and Gamma_neg_1 [simp]: "Gamma (- 1) = 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1141	and rGamma_neg_1 [simp]: "rGamma (- 1) = 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1142	and Gamma_neg_numeral [simp]: "Gamma (- numeral n) = 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1143	and rGamma_neg_numeral [simp]: "rGamma (- numeral n) = 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1144	and Gamma_neg_of_nat [simp]: "Gamma (- of_nat m) = 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1145	and rGamma_neg_of_nat [simp]: "rGamma (- of_nat m) = 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1146	by (simp_all add: rGamma_eq_zero_iff Gamma_eq_zero_iff)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1147
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1148	lemma Gamma_1 [simp]: "Gamma 1 = 1" unfolding Gamma_def by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1149
63295 52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	1150	lemma Gamma_fact: "Gamma (1 + of_nat n) = fact n"
68403 223172b97d0b reorient -> split; documented split nipkow parents: 68224 diff changeset	1151	by (simp add: pochhammer_fact pochhammer_Gamma of_nat_in_nonpos_Ints_iff flip: of_nat_Suc)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1152
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1153	lemma Gamma_numeral: "Gamma (numeral n) = fact (pred_numeral n)"
63594 bd218a9320b5 HOL-Multivariate_Analysis: rename theories for more descriptive names hoelzl parents: 63539 diff changeset	1154	by (subst of_nat_numeral[symmetric], subst numeral_eq_Suc,
63295 52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	1155	subst of_nat_Suc, subst Gamma_fact) (rule refl)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1156
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1157	lemma Gamma_of_int: "Gamma (of_int n) = (if n > 0 then fact (nat (n - 1)) else 0)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1158	proof (cases "n > 0")
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1159	case True
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1160	hence "Gamma (of_int n) = Gamma (of_nat (Suc (nat (n - 1))))" by (subst of_nat_Suc) simp_all
63295 52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	1161	with True show ?thesis by (subst (asm) of_nat_Suc, subst (asm) Gamma_fact) simp
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1162	qed (simp_all add: Gamma_eq_zero_iff nonpos_Ints_of_int)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1163
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1164	lemma rGamma_of_int: "rGamma (of_int n) = (if n > 0 then inverse (fact (nat (n - 1))) else 0)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1165	by (simp add: Gamma_of_int rGamma_inverse_Gamma)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1166
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1167	lemma Gamma_seriesI:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1168	assumes "(\<lambda>n. g n / Gamma_series z n) \<longlonglongrightarrow> 1"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1169	shows "g \<longlonglongrightarrow> Gamma z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1170	proof (rule Lim_transform_eventually)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1171	have "1/2 > (0::real)" by simp
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1172	from tendstoD[OF assms, OF this]
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1173	show "eventually (\<lambda>n. g n / Gamma_series z n * Gamma_series z n = g n) sequentially"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1174	by (force elim!: eventually_mono simp: dist_real_def dist_0_norm)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1175	from assms have "(\<lambda>n. g n / Gamma_series z n * Gamma_series z n) \<longlonglongrightarrow> 1 * Gamma z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1176	by (intro tendsto_intros)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1177	thus "(\<lambda>n. g n / Gamma_series z n * Gamma_series z n) \<longlonglongrightarrow> Gamma z" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1178	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1179
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1180	lemma Gamma_seriesI':
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1181	assumes "f \<longlonglongrightarrow> rGamma z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1182	assumes "(\<lambda>n. g n * f n) \<longlonglongrightarrow> 1"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1183	assumes "z \<notin> \<int>\<^sub>\<le>\<^sub>0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1184	shows "g \<longlonglongrightarrow> Gamma z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1185	proof (rule Lim_transform_eventually)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1186	have "1/2 > (0::real)" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1187	from tendstoD[OF assms(2), OF this] show "eventually (\<lambda>n. g n * f n / f n = g n) sequentially"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1188	by (force elim!: eventually_mono simp: dist_real_def dist_0_norm)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1189	from assms have "(\<lambda>n. g n * f n / f n) \<longlonglongrightarrow> 1 / rGamma z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1190	by (intro tendsto_divide assms) (simp_all add: rGamma_eq_zero_iff)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1191	thus "(\<lambda>n. g n * f n / f n) \<longlonglongrightarrow> Gamma z" by (simp add: Gamma_def divide_inverse)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1192	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1193
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1194	lemma Gamma_series'_LIMSEQ: "Gamma_series' z \<longlonglongrightarrow> Gamma z"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1195	by (cases "z \<in> \<int>\<^sub>\<le>\<^sub>0") (simp_all add: Gamma_nonpos_Int Gamma_seriesI[OF Gamma_series_Gamma_series']
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1196	Gamma_series'_nonpos_Ints_LIMSEQ[of z])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1197
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1198
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1199	subsection \<open>Differentiability\<close>
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1200
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1201	lemma has_field_derivative_rGamma_no_nonpos_int:
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1202	assumes "z \<notin> \<int>\<^sub>\<le>\<^sub>0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1203	shows "(rGamma has_field_derivative -rGamma z * Digamma z) (at z within A)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1204	proof (rule has_field_derivative_at_within)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1205	from assms have "z \<noteq> - of_nat n" for n by auto
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1206	from differentiable_rGamma_aux1[OF this]
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1207	show "(rGamma has_field_derivative -rGamma z * Digamma z) (at z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1208	unfolding Digamma_def suminf_def sums_def[abs_def]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1209	has_field_derivative_def has_derivative_def netlimit_at
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1210	by (simp add: Let_def bounded_linear_mult_right mult_ac of_real_def [symmetric])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1211	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1212
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1213	lemma has_field_derivative_rGamma_nonpos_int:
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1214	"(rGamma has_field_derivative (-1)^n * fact n) (at (- of_nat n) within A)"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1215	apply (rule has_field_derivative_at_within)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1216	using differentiable_rGamma_aux2[of n]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1217	unfolding Let_def has_field_derivative_def has_derivative_def netlimit_at
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	1218	by (simp only: bounded_linear_mult_right mult_ac of_real_def [symmetric] fact_prod) simp
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1219
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1220	lemma has_field_derivative_rGamma [derivative_intros]:
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1221	"(rGamma has_field_derivative (if z \<in> \<int>\<^sub>\<le>\<^sub>0 then (-1)^(nat \<lfloor>norm z\<rfloor>) * fact (nat \<lfloor>norm z\<rfloor>)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1222	else -rGamma z * Digamma z)) (at z within A)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1223	using has_field_derivative_rGamma_no_nonpos_int[of z A]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1224	has_field_derivative_rGamma_nonpos_int[of "nat \<lfloor>norm z\<rfloor>" A]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1225	by (auto elim!: nonpos_Ints_cases')
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1226
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1227	declare has_field_derivative_rGamma_no_nonpos_int [THEN DERIV_chain2, derivative_intros]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1228	declare has_field_derivative_rGamma [THEN DERIV_chain2, derivative_intros]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1229	declare has_field_derivative_rGamma_nonpos_int [derivative_intros]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1230	declare has_field_derivative_rGamma_no_nonpos_int [derivative_intros]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1231	declare has_field_derivative_rGamma [derivative_intros]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1232
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1233
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1234	lemma has_field_derivative_Gamma [derivative_intros]:
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1235	"z \<notin> \<int>\<^sub>\<le>\<^sub>0 \<Longrightarrow> (Gamma has_field_derivative Gamma z * Digamma z) (at z within A)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1236	unfolding Gamma_def [abs_def]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1237	by (fastforce intro!: derivative_eq_intros simp: rGamma_eq_zero_iff)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1238
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1239	declare has_field_derivative_Gamma[THEN DERIV_chain2, derivative_intros]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1240
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1241	(* TODO: Hide ugly facts properly *)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1242	hide_fact rGamma_eq_zero_iff_aux differentiable_rGamma_aux1 differentiable_rGamma_aux2
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1243	differentiable_rGamma_aux2 rGamma_series_aux Gamma_class.rGamma_eq_zero_iff_aux
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1244
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1245
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1246
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1247	(* TODO: differentiable etc. *)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1248
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1249
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1250	subsection \<open>Continuity\<close>
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1251
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1252	lemma continuous_on_rGamma [continuous_intros]: "continuous_on A rGamma"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1253	by (rule DERIV_continuous_on has_field_derivative_rGamma)+
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1254
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1255	lemma continuous_on_Gamma [continuous_intros]: "A \<inter> \<int>\<^sub>\<le>\<^sub>0 = {} \<Longrightarrow> continuous_on A Gamma"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1256	by (rule DERIV_continuous_on has_field_derivative_Gamma)+ blast
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1257
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1258	lemma isCont_rGamma [continuous_intros]:
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1259	"isCont f z \<Longrightarrow> isCont (\<lambda>x. rGamma (f x)) z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1260	by (rule isCont_o2[OF _ DERIV_isCont[OF has_field_derivative_rGamma]])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1261
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1262	lemma isCont_Gamma [continuous_intros]:
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1263	"isCont f z \<Longrightarrow> f z \<notin> \<int>\<^sub>\<le>\<^sub>0 \<Longrightarrow> isCont (\<lambda>x. Gamma (f x)) z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1264	by (rule isCont_o2[OF _ DERIV_isCont[OF has_field_derivative_Gamma]])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1265
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1266
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1267
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1268	text \<open>The complex Gamma function\<close>
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1269
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1270	instantiation complex :: Gamma
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1271	begin
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1272
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1273	definition rGamma_complex :: "complex \<Rightarrow> complex" where
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1274	"rGamma_complex z = lim (rGamma_series z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1275
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1276	lemma rGamma_series_complex_converges:
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1277	"convergent (rGamma_series (z :: complex))" (is "?thesis1")
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1278	and rGamma_complex_altdef:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1279	"rGamma z = (if z \<in> \<int>\<^sub>\<le>\<^sub>0 then 0 else exp (-ln_Gamma z))" (is "?thesis2")
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1280	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1281	have "?thesis1 \<and> ?thesis2"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1282	proof (cases "z \<in> \<int>\<^sub>\<le>\<^sub>0")
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1283	case False
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1284	have "rGamma_series z \<longlonglongrightarrow> exp (- ln_Gamma z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1285	proof (rule Lim_transform_eventually)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1286	from ln_Gamma_series_complex_converges'[OF False] guess d by (elim exE conjE)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1287	from this(1) uniformly_convergent_imp_convergent[OF this(2), of z]
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1288	have "ln_Gamma_series z \<longlonglongrightarrow> lim (ln_Gamma_series z)" by (simp add: convergent_LIMSEQ_iff)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1289	thus "(\<lambda>n. exp (-ln_Gamma_series z n)) \<longlonglongrightarrow> exp (- ln_Gamma z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1290	unfolding convergent_def ln_Gamma_def by (intro tendsto_exp tendsto_minus)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1291	from eventually_gt_at_top[of "0::nat"] exp_ln_Gamma_series_complex False
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1292	show "eventually (\<lambda>n. exp (-ln_Gamma_series z n) = rGamma_series z n) sequentially"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1293	by (force elim!: eventually_mono simp: exp_minus Gamma_series_def rGamma_series_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1294	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1295	with False show ?thesis
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1296	by (auto simp: convergent_def rGamma_complex_def intro!: limI)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1297	next
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1298	case True
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1299	then obtain k where "z = - of_nat k" by (erule nonpos_Ints_cases')
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1300	also have "rGamma_series \<dots> \<longlonglongrightarrow> 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1301	by (subst tendsto_cong[OF rGamma_series_minus_of_nat]) (simp_all add: convergent_const)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1302	finally show ?thesis using True
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1303	by (auto simp: rGamma_complex_def convergent_def intro!: limI)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1304	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1305	thus "?thesis1" "?thesis2" by blast+
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1306	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1307
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1308	context
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1309	begin
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1310
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1311	(* TODO: duplication *)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1312	private lemma rGamma_complex_plus1: "z * rGamma (z + 1) = rGamma (z :: complex)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1313	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1314	let ?f = "\<lambda>n. (z + 1) * inverse (of_nat n) + 1"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1315	have "eventually (\<lambda>n. ?f n * rGamma_series z n = z * rGamma_series (z + 1) n) sequentially"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1316	using eventually_gt_at_top[of "0::nat"]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1317	proof eventually_elim
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1318	fix n :: nat assume n: "n > 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1319	hence "z * rGamma_series (z + 1) n = inverse (of_nat n) *
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1320	pochhammer z (Suc (Suc n)) / (fact n * exp (z * of_real (ln (of_nat n))))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1321	by (subst pochhammer_rec) (simp add: rGamma_series_def field_simps exp_add exp_of_real)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1322	also from n have "\<dots> = ?f n * rGamma_series z n"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1323	by (subst pochhammer_rec') (simp_all add: divide_simps rGamma_series_def add_ac)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1324	finally show "?f n * rGamma_series z n = z * rGamma_series (z + 1) n" ..
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1325	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1326	moreover have "(\<lambda>n. ?f n * rGamma_series z n) \<longlonglongrightarrow> ((z+1) * 0 + 1) * rGamma z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1327	using rGamma_series_complex_converges
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1328	by (intro tendsto_intros lim_inverse_n)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1329	(simp_all add: convergent_LIMSEQ_iff rGamma_complex_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1330	hence "(\<lambda>n. ?f n * rGamma_series z n) \<longlonglongrightarrow> rGamma z" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1331	ultimately have "(\<lambda>n. z * rGamma_series (z + 1) n) \<longlonglongrightarrow> rGamma z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1332	by (rule Lim_transform_eventually)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1333	moreover have "(\<lambda>n. z * rGamma_series (z + 1) n) \<longlonglongrightarrow> z * rGamma (z + 1)"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1334	using rGamma_series_complex_converges
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1335	by (auto intro!: tendsto_mult simp: rGamma_complex_def convergent_LIMSEQ_iff)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1336	ultimately show "z * rGamma (z + 1) = rGamma z" using LIMSEQ_unique by blast
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1337	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1338
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1339	private lemma has_field_derivative_rGamma_complex_no_nonpos_Int:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1340	assumes "(z :: complex) \<notin> \<int>\<^sub>\<le>\<^sub>0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1341	shows "(rGamma has_field_derivative - rGamma z * Digamma z) (at z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1342	proof -
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1343	have diff: "(rGamma has_field_derivative - rGamma z * Digamma z) (at z)" if "Re z > 0" for z
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1344	proof (subst DERIV_cong_ev[OF refl _ refl])
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1345	from that have "eventually (\<lambda>t. t \<in> ball z (Re z/2)) (nhds z)"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1346	by (intro eventually_nhds_in_nhd) simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1347	thus "eventually (\<lambda>t. rGamma t = exp (- ln_Gamma t)) (nhds z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1348	using no_nonpos_Int_in_ball_complex[OF that]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1349	by (auto elim!: eventually_mono simp: rGamma_complex_altdef)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1350	next
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1351	have "z \<notin> \<real>\<^sub>\<le>\<^sub>0" using that by (simp add: complex_nonpos_Reals_iff)
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1352	with that show "((\<lambda>t. exp (- ln_Gamma t)) has_field_derivative (-rGamma z * Digamma z)) (at z)"
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1353	by (force elim!: nonpos_Ints_cases intro!: derivative_eq_intros simp: rGamma_complex_altdef)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1354	qed
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1355
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1356	from assms show "(rGamma has_field_derivative - rGamma z * Digamma z) (at z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1357	proof (induction "nat \<lfloor>1 - Re z\<rfloor>" arbitrary: z)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1358	case (Suc n z)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1359	from Suc.prems have z: "z \<noteq> 0" by auto
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1360	from Suc.hyps have "n = nat \<lfloor>- Re z\<rfloor>" by linarith
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1361	hence A: "n = nat \<lfloor>1 - Re (z + 1)\<rfloor>" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1362	from Suc.prems have B: "z + 1 \<notin> \<int>\<^sub>\<le>\<^sub>0" by (force dest: plus_one_in_nonpos_Ints_imp)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1363
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1364	have "((\<lambda>z. z * (rGamma \<circ> (\<lambda>z. z + 1)) z) has_field_derivative
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1365	-rGamma (z + 1) * (Digamma (z + 1) * z - 1)) (at z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1366	by (rule derivative_eq_intros DERIV_chain Suc refl A B)+ (simp add: algebra_simps)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1367	also have "(\<lambda>z. z * (rGamma \<circ> (\<lambda>z. z + 1 :: complex)) z) = rGamma"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1368	by (simp add: rGamma_complex_plus1)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1369	also from z have "Digamma (z + 1) * z - 1 = z * Digamma z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1370	by (subst Digamma_plus1) (simp_all add: field_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1371	also have "-rGamma (z + 1) * (z * Digamma z) = -rGamma z * Digamma z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1372	by (simp add: rGamma_complex_plus1[of z, symmetric])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1373	finally show ?case .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1374	qed (intro diff, simp)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1375	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1376
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1377	private lemma rGamma_complex_1: "rGamma (1 :: complex) = 1"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1378	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1379	have A: "eventually (\<lambda>n. rGamma_series 1 n = of_nat (Suc n) / of_nat n) sequentially"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1380	using eventually_gt_at_top[of "0::nat"]
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1381	by (force elim!: eventually_mono simp: rGamma_series_def exp_of_real pochhammer_fact
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1382	divide_simps pochhammer_rec' dest!: pochhammer_eq_0_imp_nonpos_Int)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1383	have "rGamma_series 1 \<longlonglongrightarrow> 1" by (subst tendsto_cong[OF A]) (rule LIMSEQ_Suc_n_over_n)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1384	thus "rGamma 1 = (1 :: complex)" unfolding rGamma_complex_def by (rule limI)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1385	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1386
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1387	private lemma has_field_derivative_rGamma_complex_nonpos_Int:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1388	"(rGamma has_field_derivative (-1)^n * fact n) (at (- of_nat n :: complex))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1389	proof (induction n)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1390	case 0
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1391	have A: "(0::complex) + 1 \<notin> \<int>\<^sub>\<le>\<^sub>0" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1392	have "((\<lambda>z. z * (rGamma \<circ> (\<lambda>z. z + 1 :: complex)) z) has_field_derivative 1) (at 0)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1393	by (rule derivative_eq_intros DERIV_chain refl
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1394	has_field_derivative_rGamma_complex_no_nonpos_Int A)+ (simp add: rGamma_complex_1)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1395	thus ?case by (simp add: rGamma_complex_plus1)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1396	next
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1397	case (Suc n)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1398	hence A: "(rGamma has_field_derivative (-1)^n * fact n)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1399	(at (- of_nat (Suc n) + 1 :: complex))" by simp
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1400	have "((\<lambda>z. z * (rGamma \<circ> (\<lambda>z. z + 1 :: complex)) z) has_field_derivative
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1401	(- 1) ^ Suc n * fact (Suc n)) (at (- of_nat (Suc n)))"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1402	by (rule derivative_eq_intros refl A DERIV_chain)+
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1403	(simp add: algebra_simps rGamma_complex_altdef)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1404	thus ?case by (simp add: rGamma_complex_plus1)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1405	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1406
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1407	instance proof
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1408	fix z :: complex show "(rGamma z = 0) \<longleftrightarrow> (\<exists>n. z = - of_nat n)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1409	by (auto simp: rGamma_complex_altdef elim!: nonpos_Ints_cases')
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1410	next
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1411	fix z :: complex assume "\<And>n. z \<noteq> - of_nat n"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1412	hence "z \<notin> \<int>\<^sub>\<le>\<^sub>0" by (auto elim!: nonpos_Ints_cases')
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1413	from has_field_derivative_rGamma_complex_no_nonpos_Int[OF this]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1414	show "let d = (THE d. (\<lambda>n. \<Sum>k<n. inverse (of_nat (Suc k)) - inverse (z + of_nat k))
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1415	\<longlonglongrightarrow> d) - euler_mascheroni *\<^sub>R 1 in (\<lambda>y. (rGamma y - rGamma z +
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1416	rGamma z * d * (y - z)) /\<^sub>R cmod (y - z)) \<midarrow>z\<rightarrow> 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1417	by (simp add: has_field_derivative_def has_derivative_def Digamma_def sums_def [abs_def]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1418	netlimit_at of_real_def[symmetric] suminf_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1419	next
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1420	fix n :: nat
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1421	from has_field_derivative_rGamma_complex_nonpos_Int[of n]
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	1422	show "let z = - of_nat n in (\<lambda>y. (rGamma y - rGamma z - (- 1) ^ n * prod of_nat {1..n} *
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1423	(y - z)) /\<^sub>R cmod (y - z)) \<midarrow>z\<rightarrow> 0"
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	1424	by (simp add: has_field_derivative_def has_derivative_def fact_prod netlimit_at Let_def)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1425	next
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1426	fix z :: complex
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1427	from rGamma_series_complex_converges[of z] have "rGamma_series z \<longlonglongrightarrow> rGamma z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1428	by (simp add: convergent_LIMSEQ_iff rGamma_complex_def)
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	1429	thus "let fact' = \<lambda>n. prod of_nat {1..n};
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1430	exp = \<lambda>x. THE e. (\<lambda>n. \<Sum>k<n. x ^ k /\<^sub>R fact k) \<longlonglongrightarrow> e;
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1431	pochhammer' = \<lambda>a n. \<Prod>n = 0..n. a + of_nat n
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1432	in (\<lambda>n. pochhammer' z n / (fact' n * exp (z * ln (real_of_nat n) *\<^sub>R 1))) \<longlonglongrightarrow> rGamma z"
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	1433	by (simp add: fact_prod pochhammer_Suc_prod rGamma_series_def [abs_def] exp_def
63367 6c731c8b7f03 simplified definitions of combinatorial functions haftmann parents: 63317 diff changeset	1434	of_real_def [symmetric] suminf_def sums_def [abs_def] atLeast0AtMost)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1435	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1436
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1437	end
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1438	end
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1439
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1440
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1441	lemma Gamma_complex_altdef:
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1442	"Gamma z = (if z \<in> \<int>\<^sub>\<le>\<^sub>0 then 0 else exp (ln_Gamma (z :: complex)))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1443	unfolding Gamma_def rGamma_complex_altdef by (simp add: exp_minus)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1444
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1445	lemma cnj_rGamma: "cnj (rGamma z) = rGamma (cnj z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1446	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1447	have "rGamma_series (cnj z) = (\<lambda>n. cnj (rGamma_series z n))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1448	by (intro ext) (simp_all add: rGamma_series_def exp_cnj)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1449	also have "... \<longlonglongrightarrow> cnj (rGamma z)" by (intro tendsto_cnj tendsto_intros)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1450	finally show ?thesis unfolding rGamma_complex_def by (intro sym[OF limI])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1451	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1452
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1453	lemma cnj_Gamma: "cnj (Gamma z) = Gamma (cnj z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1454	unfolding Gamma_def by (simp add: cnj_rGamma)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1455
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1456	lemma Gamma_complex_real:
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1457	"z \<in> \<real> \<Longrightarrow> Gamma z \<in> (\<real> :: complex set)" and rGamma_complex_real: "z \<in> \<real> \<Longrightarrow> rGamma z \<in> \<real>"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1458	by (simp_all add: Reals_cnj_iff cnj_Gamma cnj_rGamma)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1459
62534 6855b348e828 complex_differentiable -> field_differentiable, etc. (making these theorems also available for type real) paulson <lp15@cam.ac.uk> parents: 62533 diff changeset	1460	lemma field_differentiable_rGamma: "rGamma field_differentiable (at z within A)"
6855b348e828 complex_differentiable -> field_differentiable, etc. (making these theorems also available for type real) paulson <lp15@cam.ac.uk> parents: 62533 diff changeset	1461	using has_field_derivative_rGamma[of z] unfolding field_differentiable_def by blast
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1462
64969 a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1463	lemma holomorphic_rGamma [holomorphic_intros]: "rGamma holomorphic_on A"
62534 6855b348e828 complex_differentiable -> field_differentiable, etc. (making these theorems also available for type real) paulson <lp15@cam.ac.uk> parents: 62533 diff changeset	1464	unfolding holomorphic_on_def by (auto intro!: field_differentiable_rGamma)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1465
64969 a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1466	lemma analytic_rGamma: "rGamma analytic_on A"
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1467	unfolding analytic_on_def by (auto intro!: exI[of _ 1] holomorphic_rGamma)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1468
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1469
62534 6855b348e828 complex_differentiable -> field_differentiable, etc. (making these theorems also available for type real) paulson <lp15@cam.ac.uk> parents: 62533 diff changeset	1470	lemma field_differentiable_Gamma: "z \<notin> \<int>\<^sub>\<le>\<^sub>0 \<Longrightarrow> Gamma field_differentiable (at z within A)"
6855b348e828 complex_differentiable -> field_differentiable, etc. (making these theorems also available for type real) paulson <lp15@cam.ac.uk> parents: 62533 diff changeset	1471	using has_field_derivative_Gamma[of z] unfolding field_differentiable_def by auto
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1472
64969 a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1473	lemma holomorphic_Gamma [holomorphic_intros]: "A \<inter> \<int>\<^sub>\<le>\<^sub>0 = {} \<Longrightarrow> Gamma holomorphic_on A"
62534 6855b348e828 complex_differentiable -> field_differentiable, etc. (making these theorems also available for type real) paulson <lp15@cam.ac.uk> parents: 62533 diff changeset	1474	unfolding holomorphic_on_def by (auto intro!: field_differentiable_Gamma)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1475
64969 a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1476	lemma analytic_Gamma: "A \<inter> \<int>\<^sub>\<le>\<^sub>0 = {} \<Longrightarrow> Gamma analytic_on A"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1477	by (rule analytic_on_subset[of _ "UNIV - \<int>\<^sub>\<le>\<^sub>0"], subst analytic_on_open)
64969 a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1478	(auto intro!: holomorphic_Gamma)
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	1479
89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	1480
89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	1481	lemma field_differentiable_ln_Gamma_complex:
64969 a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1482	"z \<notin> \<real>\<^sub>\<le>\<^sub>0 \<Longrightarrow> ln_Gamma field_differentiable (at (z::complex) within A)"
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1483	by (rule field_differentiable_within_subset[of _ _ UNIV])
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1484	(force simp: field_differentiable_def intro!: derivative_intros)+
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1485
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1486	lemma holomorphic_ln_Gamma [holomorphic_intros]: "A \<inter> \<real>\<^sub>\<le>\<^sub>0 = {} \<Longrightarrow> ln_Gamma holomorphic_on A"
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1487	unfolding holomorphic_on_def by (auto intro!: field_differentiable_ln_Gamma_complex)
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1488
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1489	lemma analytic_ln_Gamma: "A \<inter> \<real>\<^sub>\<le>\<^sub>0 = {} \<Longrightarrow> ln_Gamma analytic_on A"
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1490	by (rule analytic_on_subset[of _ "UNIV - \<real>\<^sub>\<le>\<^sub>0"], subst analytic_on_open)
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1491	(auto intro!: holomorphic_ln_Gamma)
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1492
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1493
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1494	lemma has_field_derivative_rGamma_complex' [derivative_intros]:
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1495	"(rGamma has_field_derivative (if z \<in> \<int>\<^sub>\<le>\<^sub>0 then (-1)^(nat \<lfloor>-Re z\<rfloor>) * fact (nat \<lfloor>-Re z\<rfloor>) else
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1496	-rGamma z * Digamma z)) (at z within A)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1497	using has_field_derivative_rGamma[of z] by (auto elim!: nonpos_Ints_cases')
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1498
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1499	declare has_field_derivative_rGamma_complex'[THEN DERIV_chain2, derivative_intros]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1500
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1501
62534 6855b348e828 complex_differentiable -> field_differentiable, etc. (making these theorems also available for type real) paulson <lp15@cam.ac.uk> parents: 62533 diff changeset	1502	lemma field_differentiable_Polygamma:
64969 a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1503	fixes z :: complex
62533 bc25f3916a99 new material to Blochj's theorem, as well as supporting lemmas paulson <lp15@cam.ac.uk> parents: 62398 diff changeset	1504	shows
62534 6855b348e828 complex_differentiable -> field_differentiable, etc. (making these theorems also available for type real) paulson <lp15@cam.ac.uk> parents: 62533 diff changeset	1505	"z \<notin> \<int>\<^sub>\<le>\<^sub>0 \<Longrightarrow> Polygamma n field_differentiable (at z within A)"
6855b348e828 complex_differentiable -> field_differentiable, etc. (making these theorems also available for type real) paulson <lp15@cam.ac.uk> parents: 62533 diff changeset	1506	using has_field_derivative_Polygamma[of z n] unfolding field_differentiable_def by auto
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1507
64969 a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1508	lemma holomorphic_on_Polygamma [holomorphic_intros]: "A \<inter> \<int>\<^sub>\<le>\<^sub>0 = {} \<Longrightarrow> Polygamma n holomorphic_on A"
62534 6855b348e828 complex_differentiable -> field_differentiable, etc. (making these theorems also available for type real) paulson <lp15@cam.ac.uk> parents: 62533 diff changeset	1509	unfolding holomorphic_on_def by (auto intro!: field_differentiable_Polygamma)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1510
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1511	lemma analytic_on_Polygamma: "A \<inter> \<int>\<^sub>\<le>\<^sub>0 = {} \<Longrightarrow> Polygamma n analytic_on A"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1512	by (rule analytic_on_subset[of _ "UNIV - \<int>\<^sub>\<le>\<^sub>0"], subst analytic_on_open)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1513	(auto intro!: holomorphic_on_Polygamma)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1514
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1515
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1516
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1517	text \<open>The real Gamma function\<close>
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1518
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1519	lemma rGamma_series_real:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1520	"eventually (\<lambda>n. rGamma_series x n = Re (rGamma_series (of_real x) n)) sequentially"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1521	using eventually_gt_at_top[of "0 :: nat"]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1522	proof eventually_elim
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1523	fix n :: nat assume n: "n > 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1524	have "Re (rGamma_series (of_real x) n) =
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1525	Re (of_real (pochhammer x (Suc n)) / (fact n * exp (of_real (x * ln (real_of_nat n)))))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1526	using n by (simp add: rGamma_series_def powr_def Ln_of_nat pochhammer_of_real)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1527	also from n have "\<dots> = Re (of_real ((pochhammer x (Suc n)) /
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1528	(fact n * (exp (x * ln (real_of_nat n))))))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1529	by (subst exp_of_real) simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1530	also from n have "\<dots> = rGamma_series x n"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1531	by (subst Re_complex_of_real) (simp add: rGamma_series_def powr_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1532	finally show "rGamma_series x n = Re (rGamma_series (of_real x) n)" ..
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1533	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1534
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1535	instantiation real :: Gamma
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1536	begin
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1537
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1538	definition "rGamma_real x = Re (rGamma (of_real x :: complex))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1539
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1540	instance proof
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1541	fix x :: real
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1542	have "rGamma x = Re (rGamma (of_real x))" by (simp add: rGamma_real_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1543	also have "of_real \<dots> = rGamma (of_real x :: complex)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1544	by (intro of_real_Re rGamma_complex_real) simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1545	also have "\<dots> = 0 \<longleftrightarrow> x \<in> \<int>\<^sub>\<le>\<^sub>0" by (simp add: rGamma_eq_zero_iff of_real_in_nonpos_Ints_iff)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1546	also have "\<dots> \<longleftrightarrow> (\<exists>n. x = - of_nat n)" by (auto elim!: nonpos_Ints_cases')
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1547	finally show "(rGamma x) = 0 \<longleftrightarrow> (\<exists>n. x = - real_of_nat n)" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1548	next
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1549	fix x :: real assume "\<And>n. x \<noteq> - of_nat n"
63539 70d4d9e5707b tuned proofs -- avoid improper use of "this"; wenzelm parents: 63417 diff changeset	1550	hence x: "complex_of_real x \<notin> \<int>\<^sub>\<le>\<^sub>0"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1551	by (subst of_real_in_nonpos_Ints_iff) (auto elim!: nonpos_Ints_cases')
63539 70d4d9e5707b tuned proofs -- avoid improper use of "this"; wenzelm parents: 63417 diff changeset	1552	then have "x \<noteq> 0" by auto
70d4d9e5707b tuned proofs -- avoid improper use of "this"; wenzelm parents: 63417 diff changeset	1553	with x have "(rGamma has_field_derivative - rGamma x * Digamma x) (at x)"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1554	by (fastforce intro!: derivative_eq_intros has_vector_derivative_real_complex
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1555	simp: Polygamma_of_real rGamma_real_def [abs_def])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1556	thus "let d = (THE d. (\<lambda>n. \<Sum>k<n. inverse (of_nat (Suc k)) - inverse (x + of_nat k))
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1557	\<longlonglongrightarrow> d) - euler_mascheroni *\<^sub>R 1 in (\<lambda>y. (rGamma y - rGamma x +
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1558	rGamma x * d * (y - x)) /\<^sub>R norm (y - x)) \<midarrow>x\<rightarrow> 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1559	by (simp add: has_field_derivative_def has_derivative_def Digamma_def sums_def [abs_def]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1560	netlimit_at of_real_def[symmetric] suminf_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1561	next
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1562	fix n :: nat
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1563	have "(rGamma has_field_derivative (-1)^n * fact n) (at (- of_nat n :: real))"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1564	by (fastforce intro!: derivative_eq_intros has_vector_derivative_real_complex
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1565	simp: Polygamma_of_real rGamma_real_def [abs_def])
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	1566	thus "let x = - of_nat n in (\<lambda>y. (rGamma y - rGamma x - (- 1) ^ n * prod of_nat {1..n} *
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1567	(y - x)) /\<^sub>R norm (y - x)) \<midarrow>x::real\<rightarrow> 0"
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	1568	by (simp add: has_field_derivative_def has_derivative_def fact_prod netlimit_at Let_def)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1569	next
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1570	fix x :: real
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1571	have "rGamma_series x \<longlonglongrightarrow> rGamma x"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1572	proof (rule Lim_transform_eventually)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1573	show "(\<lambda>n. Re (rGamma_series (of_real x) n)) \<longlonglongrightarrow> rGamma x" unfolding rGamma_real_def
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1574	by (intro tendsto_intros)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1575	qed (insert rGamma_series_real, simp add: eq_commute)
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	1576	thus "let fact' = \<lambda>n. prod of_nat {1..n};
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1577	exp = \<lambda>x. THE e. (\<lambda>n. \<Sum>k<n. x ^ k /\<^sub>R fact k) \<longlonglongrightarrow> e;
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1578	pochhammer' = \<lambda>a n. \<Prod>n = 0..n. a + of_nat n
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1579	in (\<lambda>n. pochhammer' x n / (fact' n * exp (x * ln (real_of_nat n) *\<^sub>R 1))) \<longlonglongrightarrow> rGamma x"
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	1580	by (simp add: fact_prod pochhammer_Suc_prod rGamma_series_def [abs_def] exp_def
63367 6c731c8b7f03 simplified definitions of combinatorial functions haftmann parents: 63317 diff changeset	1581	of_real_def [symmetric] suminf_def sums_def [abs_def] atLeast0AtMost)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1582	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1583
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1584	end
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1585
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1586
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1587	lemma rGamma_complex_of_real: "rGamma (complex_of_real x) = complex_of_real (rGamma x)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1588	unfolding rGamma_real_def using rGamma_complex_real by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1589
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1590	lemma Gamma_complex_of_real: "Gamma (complex_of_real x) = complex_of_real (Gamma x)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1591	unfolding Gamma_def by (simp add: rGamma_complex_of_real)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1592
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1593	lemma rGamma_real_altdef: "rGamma x = lim (rGamma_series (x :: real))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1594	by (rule sym, rule limI, rule tendsto_intros)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1595
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1596	lemma Gamma_real_altdef1: "Gamma x = lim (Gamma_series (x :: real))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1597	by (rule sym, rule limI, rule tendsto_intros)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1598
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1599	lemma Gamma_real_altdef2: "Gamma x = Re (Gamma (of_real x))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1600	using rGamma_complex_real[OF Reals_of_real[of x]]
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1601	by (elim Reals_cases)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1602	(simp only: Gamma_def rGamma_real_def of_real_inverse[symmetric] Re_complex_of_real)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1603
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1604	lemma ln_Gamma_series_complex_of_real:
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1605	"x > 0 \<Longrightarrow> n > 0 \<Longrightarrow> ln_Gamma_series (complex_of_real x) n = of_real (ln_Gamma_series x n)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1606	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1607	assume xn: "x > 0" "n > 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1608	have "Ln (complex_of_real x / of_nat k + 1) = of_real (ln (x / of_nat k + 1))" if "k \<ge> 1" for k
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1609	using that xn by (subst Ln_of_real [symmetric]) (auto intro!: add_nonneg_pos simp: field_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1610	with xn show ?thesis by (simp add: ln_Gamma_series_def Ln_of_nat Ln_of_real)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1611	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1612
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1613	lemma ln_Gamma_real_converges:
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1614	assumes "(x::real) > 0"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1615	shows "convergent (ln_Gamma_series x)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1616	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1617	have "(\<lambda>n. ln_Gamma_series (complex_of_real x) n) \<longlonglongrightarrow> ln_Gamma (of_real x)" using assms
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1618	by (intro ln_Gamma_complex_LIMSEQ) (auto simp: of_real_in_nonpos_Ints_iff)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1619	moreover from eventually_gt_at_top[of "0::nat"]
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1620	have "eventually (\<lambda>n. complex_of_real (ln_Gamma_series x n) =
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1621	ln_Gamma_series (complex_of_real x) n) sequentially"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1622	by eventually_elim (simp add: ln_Gamma_series_complex_of_real assms)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1623	ultimately have "(\<lambda>n. complex_of_real (ln_Gamma_series x n)) \<longlonglongrightarrow> ln_Gamma (of_real x)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1624	by (subst tendsto_cong) assumption+
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1625	from tendsto_Re[OF this] show ?thesis by (auto simp: convergent_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1626	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1627
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1628	lemma ln_Gamma_real_LIMSEQ: "(x::real) > 0 \<Longrightarrow> ln_Gamma_series x \<longlonglongrightarrow> ln_Gamma x"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1629	using ln_Gamma_real_converges[of x] unfolding ln_Gamma_def by (simp add: convergent_LIMSEQ_iff)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1630
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1631	lemma ln_Gamma_complex_of_real: "x > 0 \<Longrightarrow> ln_Gamma (complex_of_real x) = of_real (ln_Gamma x)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1632	proof (unfold ln_Gamma_def, rule limI, rule Lim_transform_eventually)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1633	assume x: "x > 0"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1634	show "eventually (\<lambda>n. of_real (ln_Gamma_series x n) =
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1635	ln_Gamma_series (complex_of_real x) n) sequentially"
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1636	using eventually_gt_at_top[of "0::nat"]
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1637	by eventually_elim (simp add: ln_Gamma_series_complex_of_real x)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1638	qed (intro tendsto_of_real, insert ln_Gamma_real_LIMSEQ[of x], simp add: ln_Gamma_def)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1639
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1640	lemma Gamma_real_pos_exp: "x > (0 :: real) \<Longrightarrow> Gamma x = exp (ln_Gamma x)"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1641	by (auto simp: Gamma_real_altdef2 Gamma_complex_altdef of_real_in_nonpos_Ints_iff
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1642	ln_Gamma_complex_of_real exp_of_real)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1643
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1644	lemma ln_Gamma_real_pos: "x > 0 \<Longrightarrow> ln_Gamma x = ln (Gamma x :: real)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1645	unfolding Gamma_real_pos_exp by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1646
64969 a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1647	lemma ln_Gamma_complex_conv_fact: "n > 0 \<Longrightarrow> ln_Gamma (of_nat n :: complex) = ln (fact (n - 1))"
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1648	using ln_Gamma_complex_of_real[of "real n"] Gamma_fact[of "n - 1", where 'a = real]
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	1649	by (simp add: ln_Gamma_real_pos of_nat_diff Ln_of_real [symmetric])
89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	1650
64969 a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1651	lemma ln_Gamma_real_conv_fact: "n > 0 \<Longrightarrow> ln_Gamma (real n) = ln (fact (n - 1))"
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1652	using Gamma_fact[of "n - 1", where 'a = real]
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1653	by (simp add: ln_Gamma_real_pos of_nat_diff Ln_of_real [symmetric])
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1654
67278 c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	1655	lemma Gamma_real_pos [simp, intro]: "x > (0::real) \<Longrightarrow> Gamma x > 0"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	1656	by (simp add: Gamma_real_pos_exp)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	1657
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	1658	lemma Gamma_real_nonneg [simp, intro]: "x > (0::real) \<Longrightarrow> Gamma x \<ge> 0"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1659	by (simp add: Gamma_real_pos_exp)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1660
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1661	lemma has_field_derivative_ln_Gamma_real [derivative_intros]:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1662	assumes x: "x > (0::real)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1663	shows "(ln_Gamma has_field_derivative Digamma x) (at x)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1664	proof (subst DERIV_cong_ev[OF refl _ refl])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1665	from assms show "((Re \<circ> ln_Gamma \<circ> complex_of_real) has_field_derivative Digamma x) (at x)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1666	by (auto intro!: derivative_eq_intros has_vector_derivative_real_complex
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1667	simp: Polygamma_of_real o_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1668	from eventually_nhds_in_nhd[of x "{0<..}"] assms
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1669	show "eventually (\<lambda>y. ln_Gamma y = (Re \<circ> ln_Gamma \<circ> of_real) y) (nhds x)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1670	by (auto elim!: eventually_mono simp: ln_Gamma_complex_of_real interior_open)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1671	qed
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	1672
89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	1673	lemma field_differentiable_ln_Gamma_real:
64969 a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1674	"x > 0 \<Longrightarrow> ln_Gamma field_differentiable (at (x::real) within A)"
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1675	by (rule field_differentiable_within_subset[of _ _ UNIV])
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1676	(auto simp: field_differentiable_def intro!: derivative_intros)+
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1677
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1678	declare has_field_derivative_ln_Gamma_real[THEN DERIV_chain2, derivative_intros]
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	1679
64969 a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1680	lemma deriv_ln_Gamma_real:
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1681	assumes "z > 0"
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1682	shows "deriv ln_Gamma z = Digamma (z :: real)"
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	1683	by (intro DERIV_imp_deriv has_field_derivative_ln_Gamma_real assms)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1684
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1685
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1686	lemma has_field_derivative_rGamma_real' [derivative_intros]:
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1687	"(rGamma has_field_derivative (if x \<in> \<int>\<^sub>\<le>\<^sub>0 then (-1)^(nat \<lfloor>-x\<rfloor>) * fact (nat \<lfloor>-x\<rfloor>) else
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1688	-rGamma x * Digamma x)) (at x within A)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1689	using has_field_derivative_rGamma[of x] by (force elim!: nonpos_Ints_cases')
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1690
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1691	declare has_field_derivative_rGamma_real'[THEN DERIV_chain2, derivative_intros]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1692
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1693	lemma Polygamma_real_odd_pos:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1694	assumes "(x::real) \<notin> \<int>\<^sub>\<le>\<^sub>0" "odd n"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1695	shows "Polygamma n x > 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1696	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1697	from assms have "x \<noteq> 0" by auto
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1698	with assms show ?thesis
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1699	unfolding Polygamma_def using Polygamma_converges'[of x "Suc n"]
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1700	by (auto simp: zero_less_power_eq simp del: power_Suc
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1701	dest: plus_of_nat_eq_0_imp intro!: mult_pos_pos suminf_pos)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1702	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1703
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1704	lemma Polygamma_real_even_neg:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1705	assumes "(x::real) > 0" "n > 0" "even n"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1706	shows "Polygamma n x < 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1707	using assms unfolding Polygamma_def using Polygamma_converges'[of x "Suc n"]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1708	by (auto intro!: mult_pos_pos suminf_pos)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1709
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1710	lemma Polygamma_real_strict_mono:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1711	assumes "x > 0" "x < (y::real)" "even n"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1712	shows "Polygamma n x < Polygamma n y"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1713	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1714	have "\<exists>\<xi>. x < \<xi> \<and> \<xi> < y \<and> Polygamma n y - Polygamma n x = (y - x) * Polygamma (Suc n) \<xi>"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1715	using assms by (intro MVT2 derivative_intros impI allI) (auto elim!: nonpos_Ints_cases)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1716	then guess \<xi> by (elim exE conjE) note \<xi> = this
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1717	note \<xi>(3)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1718	also from \<xi>(1,2) assms have "(y - x) * Polygamma (Suc n) \<xi> > 0"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1719	by (intro mult_pos_pos Polygamma_real_odd_pos) (auto elim!: nonpos_Ints_cases)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1720	finally show ?thesis by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1721	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1722
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1723	lemma Polygamma_real_strict_antimono:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1724	assumes "x > 0" "x < (y::real)" "odd n"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1725	shows "Polygamma n x > Polygamma n y"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1726	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1727	have "\<exists>\<xi>. x < \<xi> \<and> \<xi> < y \<and> Polygamma n y - Polygamma n x = (y - x) * Polygamma (Suc n) \<xi>"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1728	using assms by (intro MVT2 derivative_intros impI allI) (auto elim!: nonpos_Ints_cases)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1729	then guess \<xi> by (elim exE conjE) note \<xi> = this
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1730	note \<xi>(3)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1731	also from \<xi>(1,2) assms have "(y - x) * Polygamma (Suc n) \<xi> < 0"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1732	by (intro mult_pos_neg Polygamma_real_even_neg) simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1733	finally show ?thesis by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1734	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1735
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1736	lemma Polygamma_real_mono:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1737	assumes "x > 0" "x \<le> (y::real)" "even n"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1738	shows "Polygamma n x \<le> Polygamma n y"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1739	using Polygamma_real_strict_mono[OF assms(1) _ assms(3), of y] assms(2)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1740	by (cases "x = y") simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1741
63721 492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	1742	lemma Digamma_real_strict_mono: "(0::real) < x \<Longrightarrow> x < y \<Longrightarrow> Digamma x < Digamma y"
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	1743	by (rule Polygamma_real_strict_mono) simp_all
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	1744
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	1745	lemma Digamma_real_mono: "(0::real) < x \<Longrightarrow> x \<le> y \<Longrightarrow> Digamma x \<le> Digamma y"
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	1746	by (rule Polygamma_real_mono) simp_all
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	1747
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1748	lemma Digamma_real_ge_three_halves_pos:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1749	assumes "x \<ge> 3/2"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1750	shows "Digamma (x :: real) > 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1751	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1752	have "0 < Digamma (3/2 :: real)" by (fact Digamma_real_three_halves_pos)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1753	also from assms have "\<dots> \<le> Digamma x" by (intro Polygamma_real_mono) simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1754	finally show ?thesis .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1755	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1756
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1757	lemma ln_Gamma_real_strict_mono:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1758	assumes "x \<ge> 3/2" "x < y"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1759	shows "ln_Gamma (x :: real) < ln_Gamma y"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1760	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1761	have "\<exists>\<xi>. x < \<xi> \<and> \<xi> < y \<and> ln_Gamma y - ln_Gamma x = (y - x) * Digamma \<xi>"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1762	using assms by (intro MVT2 derivative_intros impI allI) (auto elim!: nonpos_Ints_cases)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1763	then guess \<xi> by (elim exE conjE) note \<xi> = this
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1764	note \<xi>(3)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1765	also from \<xi>(1,2) assms have "(y - x) * Digamma \<xi> > 0"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1766	by (intro mult_pos_pos Digamma_real_ge_three_halves_pos) simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1767	finally show ?thesis by simp
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1768	qed
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1769
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1770	lemma Gamma_real_strict_mono:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1771	assumes "x \<ge> 3/2" "x < y"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1772	shows "Gamma (x :: real) < Gamma y"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1773	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1774	from Gamma_real_pos_exp[of x] assms have "Gamma x = exp (ln_Gamma x)" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1775	also have "\<dots> < exp (ln_Gamma y)" by (intro exp_less_mono ln_Gamma_real_strict_mono assms)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1776	also from Gamma_real_pos_exp[of y] assms have "\<dots> = Gamma y" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1777	finally show ?thesis .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1778	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1779
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1780	lemma log_convex_Gamma_real: "convex_on {0<..} (ln \<circ> Gamma :: real \<Rightarrow> real)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1781	by (rule convex_on_realI[of _ _ Digamma])
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1782	(auto intro!: derivative_eq_intros Polygamma_real_mono Gamma_real_pos
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1783	simp: o_def Gamma_eq_zero_iff elim!: nonpos_Ints_cases')
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1784
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1785
63725 4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1786	subsection \<open>The uniqueness of the real Gamma function\<close>
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1787
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1788	text \<open>
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	1789	The following is a proof of the Bohr--Mollerup theorem, which states that
63725 4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1790	any log-convex function $G$ on the positive reals that fulfils $G(1) = 1$ and
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	1791	satisfies the functional equation $G(x+1) = x G(x)$ must be equal to the
63725 4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1792	Gamma function.
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	1793	In principle, if $G$ is a holomorphic complex function, one could then extend
89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	1794	this from the positive reals to the entire complex plane (minus the non-positive
63725 4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1795	integers, where the Gamma function is not defined).
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1796	\<close>
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1797
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1798	context
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1799	fixes G :: "real \<Rightarrow> real"
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1800	assumes G_1: "G 1 = 1"
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1801	assumes G_plus1: "x > 0 \<Longrightarrow> G (x + 1) = x * G x"
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1802	assumes G_pos: "x > 0 \<Longrightarrow> G x > 0"
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1803	assumes log_convex_G: "convex_on {0<..} (ln \<circ> G)"
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1804	begin
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1805
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1806	private lemma G_fact: "G (of_nat n + 1) = fact n"
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1807	using G_plus1[of "real n + 1" for n]
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1808	by (induction n) (simp_all add: G_1 G_plus1)
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1809
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1810	private definition S :: "real \<Rightarrow> real \<Rightarrow> real" where
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1811	"S x y = (ln (G y) - ln (G x)) / (y - x)"
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1812
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	1813	private lemma S_eq:
63725 4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1814	"n \<ge> 2 \<Longrightarrow> S (of_nat n) (of_nat n + x) = (ln (G (real n + x)) - ln (fact (n - 1))) / x"
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1815	by (subst G_fact [symmetric]) (simp add: S_def add_ac of_nat_diff)
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1816
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1817	private lemma G_lower:
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1818	assumes x: "x > 0" and n: "n \<ge> 1"
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1819	shows "Gamma_series x n \<le> G x"
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1820	proof -
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1821	have "(ln \<circ> G) (real (Suc n)) \<le> ((ln \<circ> G) (real (Suc n) + x) -
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1822	(ln \<circ> G) (real (Suc n) - 1)) / (real (Suc n) + x - (real (Suc n) - 1)) *
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1823	(real (Suc n) - (real (Suc n) - 1)) + (ln \<circ> G) (real (Suc n) - 1)"
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1824	using x n by (intro convex_onD_Icc' convex_on_subset[OF log_convex_G]) auto
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	1825	hence "S (of_nat n) (of_nat (Suc n)) \<le> S (of_nat (Suc n)) (of_nat (Suc n) + x)"
63725 4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1826	unfolding S_def using x by (simp add: field_simps)
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1827	also have "S (of_nat n) (of_nat (Suc n)) = ln (fact n) - ln (fact (n-1))"
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	1828	unfolding S_def using n
63725 4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1829	by (subst (1 2) G_fact [symmetric]) (simp_all add: add_ac of_nat_diff)
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1830	also have "\<dots> = ln (fact n / fact (n-1))" by (subst ln_div) simp_all
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1831	also from n have "fact n / fact (n - 1) = n" by (cases n) simp_all
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1832	finally have "x * ln (real n) + ln (fact n) \<le> ln (G (real (Suc n) + x))"
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1833	using x n by (subst (asm) S_eq) (simp_all add: field_simps)
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	1834	also have "x * ln (real n) + ln (fact n) = ln (exp (x * ln (real n)) * fact n)"
63725 4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1835	using x by (simp add: ln_mult)
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1836	finally have "exp (x * ln (real n)) * fact n \<le> G (real (Suc n) + x)" using x
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1837	by (subst (asm) ln_le_cancel_iff) (simp_all add: G_pos)
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1838	also have "G (real (Suc n) + x) = pochhammer x (Suc n) * G x"
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1839	using G_plus1[of "real (Suc n) + x" for n] G_plus1[of x] x
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1840	by (induction n) (simp_all add: pochhammer_Suc add_ac)
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1841	finally show "Gamma_series x n \<le> G x"
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1842	using x by (simp add: field_simps pochhammer_pos Gamma_series_def)
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1843	qed
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1844
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1845	private lemma G_upper:
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1846	assumes x: "x > 0" "x \<le> 1" and n: "n \<ge> 2"
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1847	shows "G x \<le> Gamma_series x n * (1 + x / real n)"
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1848	proof -
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1849	have "(ln \<circ> G) (real n + x) \<le> ((ln \<circ> G) (real n + 1) -
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1850	(ln \<circ> G) (real n)) / (real n + 1 - (real n)) *
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	1851	((real n + x) - real n) + (ln \<circ> G) (real n)"
63725 4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1852	using x n by (intro convex_onD_Icc' convex_on_subset[OF log_convex_G]) auto
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	1853	hence "S (of_nat n) (of_nat n + x) \<le> S (of_nat n) (of_nat n + 1)"
63725 4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1854	unfolding S_def using x by (simp add: field_simps)
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1855	also from n have "S (of_nat n) (of_nat n + 1) = ln (fact n) - ln (fact (n-1))"
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1856	by (subst (1 2) G_fact [symmetric]) (simp add: S_def add_ac of_nat_diff)
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1857	also have "\<dots> = ln (fact n / (fact (n-1)))" using n by (subst ln_div) simp_all
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1858	also from n have "fact n / fact (n - 1) = n" by (cases n) simp_all
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	1859	finally have "ln (G (real n + x)) \<le> x * ln (real n) + ln (fact (n - 1))"
63725 4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1860	using x n by (subst (asm) S_eq) (simp_all add: field_simps)
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1861	also have "\<dots> = ln (exp (x * ln (real n)) * fact (n - 1))" using x
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1862	by (simp add: ln_mult)
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1863	finally have "G (real n + x) \<le> exp (x * ln (real n)) * fact (n - 1)" using x
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1864	by (subst (asm) ln_le_cancel_iff) (simp_all add: G_pos)
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1865	also have "G (real n + x) = pochhammer x n * G x"
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1866	using G_plus1[of "real n + x" for n] x
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1867	by (induction n) (simp_all add: pochhammer_Suc add_ac)
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1868	finally have "G x \<le> exp (x * ln (real n)) * fact (n- 1) / pochhammer x n"
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1869	using x by (simp add: field_simps pochhammer_pos)
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1870	also from n have "fact (n - 1) = fact n / n" by (cases n) simp_all
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	1871	also have "exp (x * ln (real n)) * \<dots> / pochhammer x n =
63725 4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1872	Gamma_series x n * (1 + x / real n)" using n x
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1873	by (simp add: Gamma_series_def divide_simps pochhammer_Suc)
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1874	finally show ?thesis .
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1875	qed
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1876
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1877	private lemma G_eq_Gamma_aux:
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1878	assumes x: "x > 0" "x \<le> 1"
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1879	shows "G x = Gamma x"
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1880	proof (rule antisym)
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1881	show "G x \<ge> Gamma x"
63952 354808e9f44b new material connected with HOL Light measure theory, plus more rationalisation paulson <lp15@cam.ac.uk> parents: 63918 diff changeset	1882	proof (rule tendsto_upperbound)
63725 4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1883	from G_lower[of x] show "eventually (\<lambda>n. Gamma_series x n \<le> G x) sequentially"
65578 e4997c181cce New material from PNT proof, as well as more default [simp] declarations. Also removed duplicate theorems about geometric series paulson <lp15@cam.ac.uk> parents: 64969 diff changeset	1884	using x by (auto intro: eventually_mono[OF eventually_ge_at_top[of "1::nat"]])
63725 4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1885	qed (simp_all add: Gamma_series_LIMSEQ)
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1886	next
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1887	show "G x \<le> Gamma x"
63952 354808e9f44b new material connected with HOL Light measure theory, plus more rationalisation paulson <lp15@cam.ac.uk> parents: 63918 diff changeset	1888	proof (rule tendsto_lowerbound)
63725 4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1889	have "(\<lambda>n. Gamma_series x n * (1 + x / real n)) \<longlonglongrightarrow> Gamma x * (1 + 0)"
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	1890	by (rule tendsto_intros real_tendsto_divide_at_top
63725 4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1891	Gamma_series_LIMSEQ filterlim_real_sequentially)+
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1892	thus "(\<lambda>n. Gamma_series x n * (1 + x / real n)) \<longlonglongrightarrow> Gamma x" by simp
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1893	next
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1894	from G_upper[of x] show "eventually (\<lambda>n. Gamma_series x n * (1 + x / real n) \<ge> G x) sequentially"
65578 e4997c181cce New material from PNT proof, as well as more default [simp] declarations. Also removed duplicate theorems about geometric series paulson <lp15@cam.ac.uk> parents: 64969 diff changeset	1895	using x by (auto intro: eventually_mono[OF eventually_ge_at_top[of "2::nat"]])
63725 4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1896	qed simp_all
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1897	qed
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1898
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1899	theorem Gamma_pos_real_unique:
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1900	assumes x: "x > 0"
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1901	shows "G x = Gamma x"
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1902	proof -
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1903	have G_eq: "G (real n + x) = Gamma (real n + x)" if "x \<in> {0<..1}" for n x using that
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1904	proof (induction n)
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1905	case (Suc n)
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1906	from Suc have "x + real n > 0" by simp
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1907	hence "x + real n \<notin> \<int>\<^sub>\<le>\<^sub>0" by auto
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1908	with Suc show ?case using G_plus1[of "real n + x"] Gamma_plus1[of "real n + x"]
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1909	by (auto simp: add_ac)
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1910	qed (simp_all add: G_eq_Gamma_aux)
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	1911
63725 4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1912	show ?thesis
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1913	proof (cases "frac x = 0")
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1914	case True
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1915	hence "x = of_int (floor x)" by (simp add: frac_def)
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1916	with x have x_eq: "x = of_nat (nat (floor x) - 1) + 1" by simp
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1917	show ?thesis by (subst (1 2) x_eq, rule G_eq) simp_all
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1918	next
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1919	case False
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1920	from assms have x_eq: "x = of_nat (nat (floor x)) + frac x"
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1921	by (simp add: frac_def)
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1922	have frac_le_1: "frac x \<le> 1" unfolding frac_def by linarith
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1923	show ?thesis
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1924	by (subst (1 2) x_eq, rule G_eq, insert False frac_le_1) simp_all
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1925	qed
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1926	qed
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1927
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1928	end
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1929
4c00ba1ad11a Bohr-Mollerup theorem for the Gamma function Manuel Eberl <eberlm@in.tum.de> parents: 63721 diff changeset	1930
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1931	subsection \<open>Beta function\<close>
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1932
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1933	definition Beta where "Beta a b = Gamma a * Gamma b / Gamma (a + b)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1934
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1935	lemma Beta_altdef: "Beta a b = Gamma a * Gamma b * rGamma (a + b)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1936	by (simp add: inverse_eq_divide Beta_def Gamma_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1937
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1938	lemma Beta_commute: "Beta a b = Beta b a"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1939	unfolding Beta_def by (simp add: ac_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1940
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1941	lemma has_field_derivative_Beta1 [derivative_intros]:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1942	assumes "x \<notin> \<int>\<^sub>\<le>\<^sub>0" "x + y \<notin> \<int>\<^sub>\<le>\<^sub>0"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1943	shows "((\<lambda>x. Beta x y) has_field_derivative (Beta x y * (Digamma x - Digamma (x + y))))
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1944	(at x within A)" unfolding Beta_altdef
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1945	by (rule DERIV_cong, (rule derivative_intros assms)+) (simp add: algebra_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1946
63295 52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	1947	lemma Beta_pole1: "x \<in> \<int>\<^sub>\<le>\<^sub>0 \<Longrightarrow> Beta x y = 0"
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	1948	by (auto simp add: Beta_def elim!: nonpos_Ints_cases')
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	1949
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	1950	lemma Beta_pole2: "y \<in> \<int>\<^sub>\<le>\<^sub>0 \<Longrightarrow> Beta x y = 0"
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	1951	by (auto simp add: Beta_def elim!: nonpos_Ints_cases')
63594 bd218a9320b5 HOL-Multivariate_Analysis: rename theories for more descriptive names hoelzl parents: 63539 diff changeset	1952
63295 52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	1953	lemma Beta_zero: "x + y \<in> \<int>\<^sub>\<le>\<^sub>0 \<Longrightarrow> Beta x y = 0"
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	1954	by (auto simp add: Beta_def elim!: nonpos_Ints_cases')
63594 bd218a9320b5 HOL-Multivariate_Analysis: rename theories for more descriptive names hoelzl parents: 63539 diff changeset	1955
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1956	lemma has_field_derivative_Beta2 [derivative_intros]:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1957	assumes "y \<notin> \<int>\<^sub>\<le>\<^sub>0" "x + y \<notin> \<int>\<^sub>\<le>\<^sub>0"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1958	shows "((\<lambda>y. Beta x y) has_field_derivative (Beta x y * (Digamma y - Digamma (x + y))))
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1959	(at y within A)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1960	using has_field_derivative_Beta1[of y x A] assms by (simp add: Beta_commute add_ac)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1961
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1962	lemma Beta_plus1_plus1:
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1963	assumes "x \<notin> \<int>\<^sub>\<le>\<^sub>0" "y \<notin> \<int>\<^sub>\<le>\<^sub>0"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1964	shows "Beta (x + 1) y + Beta x (y + 1) = Beta x y"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1965	proof -
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1966	have "Beta (x + 1) y + Beta x (y + 1) =
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1967	(Gamma (x + 1) * Gamma y + Gamma x * Gamma (y + 1)) * rGamma ((x + y) + 1)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1968	by (simp add: Beta_altdef add_divide_distrib algebra_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1969	also have "\<dots> = (Gamma x * Gamma y) * ((x + y) * rGamma ((x + y) + 1))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1970	by (subst assms[THEN Gamma_plus1])+ (simp add: algebra_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1971	also from assms have "\<dots> = Beta x y" unfolding Beta_altdef by (subst rGamma_plus1) simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1972	finally show ?thesis .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1973	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1974
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1975	lemma Beta_plus1_left:
63295 52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	1976	assumes "x \<notin> \<int>\<^sub>\<le>\<^sub>0"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1977	shows "(x + y) * Beta (x + 1) y = x * Beta x y"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1978	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1979	have "(x + y) * Beta (x + 1) y = Gamma (x + 1) * Gamma y * ((x + y) * rGamma ((x + y) + 1))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1980	unfolding Beta_altdef by (simp only: ac_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1981	also have "\<dots> = x * Beta x y" unfolding Beta_altdef
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1982	by (subst assms[THEN Gamma_plus1] rGamma_plus1)+ (simp only: ac_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1983	finally show ?thesis .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1984	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1985
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	1986	lemma Beta_plus1_right:
63295 52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	1987	assumes "y \<notin> \<int>\<^sub>\<le>\<^sub>0"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1988	shows "(x + y) * Beta x (y + 1) = y * Beta x y"
63295 52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	1989	using Beta_plus1_left[of y x] assms by (simp_all add: Beta_commute add.commute)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1990
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1991	lemma Gamma_Gamma_Beta:
63295 52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	1992	assumes "x + y \<notin> \<int>\<^sub>\<le>\<^sub>0"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1993	shows "Gamma x * Gamma y = Beta x y * Gamma (x + y)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1994	unfolding Beta_altdef using assms Gamma_eq_zero_iff[of "x+y"]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1995	by (simp add: rGamma_inverse_Gamma)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1996
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1997
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1998
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	1999	subsection \<open>Legendre duplication theorem\<close>
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2000
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2001	context
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2002	begin
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2003
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2004	private lemma Gamma_legendre_duplication_aux:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2005	fixes z :: "'a :: Gamma"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2006	assumes "z \<notin> \<int>\<^sub>\<le>\<^sub>0" "z + 1/2 \<notin> \<int>\<^sub>\<le>\<^sub>0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2007	shows "Gamma z * Gamma (z + 1/2) = exp ((1 - 2z) of_real (ln 2)) * Gamma (1/2) * Gamma (2*z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2008	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2009	let ?powr = "\<lambda>b a. exp (a * of_real (ln (of_nat b)))"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2010	let ?h = "\<lambda>n. (fact (n-1))\<^sup>2 / fact (2n-1) of_nat (2^(2n))
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2011	exp (1/2 * of_real (ln (real_of_nat n)))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2012	{
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2013	fix z :: 'a assume z: "z \<notin> \<int>\<^sub>\<le>\<^sub>0" "z + 1/2 \<notin> \<int>\<^sub>\<le>\<^sub>0"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2014	let ?g = "\<lambda>n. ?powr 2 (2z) Gamma_series' z n * Gamma_series' (z + 1/2) n /
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2015	Gamma_series' (2z) (2n)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2016	have "eventually (\<lambda>n. ?g n = ?h n) sequentially" using eventually_gt_at_top
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2017	proof eventually_elim
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2018	fix n :: nat assume n: "n > 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2019	let ?f = "fact (n - 1) :: 'a" and ?f' = "fact (2*n - 1) :: 'a"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2020	have A: "exp t * exp t = exp (2*t :: 'a)" for t by (subst exp_add [symmetric]) simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2021	have A: "Gamma_series' z n * Gamma_series' (z + 1/2) n = ?f^2 * ?powr n (2*z + 1/2) /
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2022	(pochhammer z n * pochhammer (z + 1/2) n)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2023	by (simp add: Gamma_series'_def exp_add ring_distribs power2_eq_square A mult_ac)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2024	have B: "Gamma_series' (2z) (2n) =
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2025	?f' * ?powr 2 (2z) ?powr n (2*z) /
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2026	(of_nat (2^(2n)) pochhammer z n * pochhammer (z+1/2) n)" using n
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2027	by (simp add: Gamma_series'_def ln_mult exp_add ring_distribs pochhammer_double)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2028	from z have "pochhammer z n \<noteq> 0" by (auto dest: pochhammer_eq_0_imp_nonpos_Int)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2029	moreover from z have "pochhammer (z + 1/2) n \<noteq> 0" by (auto dest: pochhammer_eq_0_imp_nonpos_Int)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2030	ultimately have "?powr 2 (2z) (Gamma_series' z n * Gamma_series' (z + 1/2) n) / Gamma_series' (2z) (2n) =
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2031	?f^2 / ?f' * of_nat (2^(2n)) (?powr n ((4z + 1)/2) ?powr n (-2*z))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2032	using n unfolding A B by (simp add: divide_simps exp_minus)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2033	also have "?powr n ((4z + 1)/2) ?powr n (-2*z) = ?powr n (1/2)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2034	by (simp add: algebra_simps exp_add[symmetric] add_divide_distrib)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2035	finally show "?g n = ?h n" by (simp only: mult_ac)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2036	qed
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2037
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2038	moreover from z double_in_nonpos_Ints_imp[of z] have "2 * z \<notin> \<int>\<^sub>\<le>\<^sub>0" by auto
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2039	hence "?g \<longlonglongrightarrow> ?powr 2 (2z) Gamma z * Gamma (z+1/2) / Gamma (2*z)"
67399 eab6ce8368fa ran isabelle update_op on all sources nipkow parents: 67278 diff changeset	2040	using LIMSEQ_subseq_LIMSEQ[OF Gamma_series'_LIMSEQ, of "( * )2" "2*z"]
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2041	by (intro tendsto_intros Gamma_series'_LIMSEQ)
66447 a1f5c5c26fa6 Replaced subseq with strict_mono eberlm <eberlm@in.tum.de> parents: 66286 diff changeset	2042	(simp_all add: o_def strict_mono_def Gamma_eq_zero_iff)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2043	ultimately have "?h \<longlonglongrightarrow> ?powr 2 (2z) Gamma z * Gamma (z+1/2) / Gamma (2*z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2044	by (rule Lim_transform_eventually)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2045	} note lim = this
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2046
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2047	from assms double_in_nonpos_Ints_imp[of z] have z': "2 * z \<notin> \<int>\<^sub>\<le>\<^sub>0" by auto
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2048	from fraction_not_in_ints[of 2 1] have "(1/2 :: 'a) \<notin> \<int>\<^sub>\<le>\<^sub>0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2049	by (intro not_in_Ints_imp_not_in_nonpos_Ints) simp_all
67976 75b94eb58c3d Analysis builds using set_borel_measurable_def, etc. paulson <lp15@cam.ac.uk> parents: 67399 diff changeset	2050	with lim[of "1/2 :: 'a"] have "?h \<longlonglongrightarrow> 2 * Gamma (1/2 :: 'a)" by (simp add: exp_of_real)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2051	from LIMSEQ_unique[OF this lim[OF assms]] z' show ?thesis
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2052	by (simp add: divide_simps Gamma_eq_zero_iff ring_distribs exp_diff exp_of_real ac_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2053	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2054
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2055	lemma Gamma_reflection_complex:
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2056	fixes z :: complex
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2057	shows "Gamma z * Gamma (1 - z) = of_real pi / sin (of_real pi * z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2058	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2059	let ?g = "\<lambda>z::complex. Gamma z * Gamma (1 - z) * sin (of_real pi * z)"
63040 eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62534 diff changeset	2060	define g where [abs_def]: "g z = (if z \<in> \<int> then of_real pi else ?g z)" for z :: complex
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2061	let ?h = "\<lambda>z::complex. (of_real pi * cot (of_real pi*z) + Digamma z - Digamma (1 - z))"
63040 eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62534 diff changeset	2062	define h where [abs_def]: "h z = (if z \<in> \<int> then 0 else ?h z)" for z :: complex
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2063
62072 bf3d9f113474 isabelle update_cartouches -c -t; wenzelm parents: 62055 diff changeset	2064	\<comment> \<open>@{term g} is periodic with period 1.\<close>
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2065	interpret g: periodic_fun_simple' g
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2066	proof
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2067	fix z :: complex
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2068	show "g (z + 1) = g z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2069	proof (cases "z \<in> \<int>")
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2070	case False
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2071	hence "z * g z = z * Beta z (- z + 1) * sin (of_real pi * z)" by (simp add: g_def Beta_def)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2072	also have "z * Beta z (- z + 1) = (z + 1 + -z) * Beta (z + 1) (- z + 1)"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2073	using False Ints_diff[of 1 "1 - z"] nonpos_Ints_subset_Ints
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2074	by (subst Beta_plus1_left [symmetric]) auto
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2075	also have "\<dots> * sin (of_real pi * z) = z * (Beta (z + 1) (-z) * sin (of_real pi * (z + 1)))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2076	using False Ints_diff[of "z+1" 1] Ints_minus[of "-z"] nonpos_Ints_subset_Ints
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2077	by (subst Beta_plus1_right) (auto simp: ring_distribs sin_plus_pi)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2078	also from False have "Beta (z + 1) (-z) * sin (of_real pi * (z + 1)) = g (z + 1)"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2079	using Ints_diff[of "z+1" 1] by (auto simp: g_def Beta_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2080	finally show "g (z + 1) = g z" using False by (subst (asm) mult_left_cancel) auto
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2081	qed (simp add: g_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2082	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2083
62072 bf3d9f113474 isabelle update_cartouches -c -t; wenzelm parents: 62055 diff changeset	2084	\<comment> \<open>@{term g} is entire.\<close>
64969 a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	2085	have g_g' [derivative_intros]: "(g has_field_derivative (h z * g z)) (at z)" for z :: complex
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2086	proof (cases "z \<in> \<int>")
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2087	let ?h' = "\<lambda>z. Beta z (1 - z) * ((Digamma z - Digamma (1 - z)) * sin (z * of_real pi) +
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2088	of_real pi * cos (z * of_real pi))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2089	case False
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2090	from False have "eventually (\<lambda>t. t \<in> UNIV - \<int>) (nhds z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2091	by (intro eventually_nhds_in_open) (auto simp: open_Diff)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2092	hence "eventually (\<lambda>t. g t = ?g t) (nhds z)" by eventually_elim (simp add: g_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2093	moreover {
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2094	from False Ints_diff[of 1 "1-z"] have "1 - z \<notin> \<int>" by auto
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2095	hence "(?g has_field_derivative ?h' z) (at z)" using nonpos_Ints_subset_Ints
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2096	by (auto intro!: derivative_eq_intros simp: algebra_simps Beta_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2097	also from False have "sin (of_real pi * z) \<noteq> 0" by (subst sin_eq_0) auto
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2098	hence "?h' z = h z * g z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2099	using False unfolding g_def h_def cot_def by (simp add: field_simps Beta_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2100	finally have "(?g has_field_derivative (h z * g z)) (at z)" .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2101	}
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2102	ultimately show ?thesis by (subst DERIV_cong_ev[OF refl _ refl])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2103	next
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2104	case True
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2105	then obtain n where z: "z = of_int n" by (auto elim!: Ints_cases)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2106	let ?t = "(\<lambda>z::complex. if z = 0 then 1 else sin z / z) \<circ> (\<lambda>z. of_real pi * z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2107	have deriv_0: "(g has_field_derivative 0) (at 0)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2108	proof (subst DERIV_cong_ev[OF refl _ refl])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2109	show "eventually (\<lambda>z. g z = of_real pi * Gamma (1 + z) * Gamma (1 - z) * ?t z) (nhds 0)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2110	using eventually_nhds_ball[OF zero_less_one, of "0::complex"]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2111	proof eventually_elim
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2112	fix z :: complex assume z: "z \<in> ball 0 1"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2113	show "g z = of_real pi * Gamma (1 + z) * Gamma (1 - z) * ?t z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2114	proof (cases "z = 0")
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2115	assume z': "z \<noteq> 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2116	with z have z'': "z \<notin> \<int>\<^sub>\<le>\<^sub>0" "z \<notin> \<int>" by (auto elim!: Ints_cases simp: dist_0_norm)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2117	from Gamma_plus1[OF this(1)] have "Gamma z = Gamma (z + 1) / z" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2118	with z'' z' show ?thesis by (simp add: g_def ac_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2119	qed (simp add: g_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2120	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2121	have "(?t has_field_derivative (0 * of_real pi)) (at 0)"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2122	using has_field_derivative_sin_z_over_z[of "UNIV :: complex set"]
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2123	by (intro DERIV_chain) simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2124	thus "((\<lambda>z. of_real pi * Gamma (1 + z) * Gamma (1 - z) * ?t z) has_field_derivative 0) (at 0)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2125	by (auto intro!: derivative_eq_intros simp: o_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2126	qed
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2127
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2128	have "((g \<circ> (\<lambda>x. x - of_int n)) has_field_derivative 0 * 1) (at (of_int n))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2129	using deriv_0 by (intro DERIV_chain) (auto intro!: derivative_eq_intros)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2130	also have "g \<circ> (\<lambda>x. x - of_int n) = g" by (intro ext) (simp add: g.minus_of_int)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2131	finally show "(g has_field_derivative (h z * g z)) (at z)" by (simp add: z h_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2132	qed
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	2133
64969 a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	2134	have g_holo [holomorphic_intros]: "g holomorphic_on A" for A
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	2135	by (rule holomorphic_on_subset[of _ UNIV])
64969 a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	2136	(force simp: holomorphic_on_open intro!: derivative_intros)+
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2137
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2138	have g_eq: "g (z/2) * g ((z+1)/2) = Gamma (1/2)^2 * g z" if "Re z > -1" "Re z < 2" for z
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2139	proof (cases "z \<in> \<int>")
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2140	case True
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2141	with that have "z = 0 \<or> z = 1" by (force elim!: Ints_cases)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2142	moreover have "g 0 * g (1/2) = Gamma (1/2)^2 * g 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2143	using fraction_not_in_ints[where 'a = complex, of 2 1] by (simp add: g_def power2_eq_square)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2144	moreover have "g (1/2) * g 1 = Gamma (1/2)^2 * g 1"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2145	using fraction_not_in_ints[where 'a = complex, of 2 1]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2146	by (simp add: g_def power2_eq_square Beta_def algebra_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2147	ultimately show ?thesis by force
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2148	next
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2149	case False
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2150	hence z: "z/2 \<notin> \<int>" "(z+1)/2 \<notin> \<int>" using Ints_diff[of "z+1" 1] by (auto elim!: Ints_cases)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2151	hence z': "z/2 \<notin> \<int>\<^sub>\<le>\<^sub>0" "(z+1)/2 \<notin> \<int>\<^sub>\<le>\<^sub>0" by (auto elim!: nonpos_Ints_cases)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2152	from z have "1-z/2 \<notin> \<int>" "1-((z+1)/2) \<notin> \<int>"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2153	using Ints_diff[of 1 "1-z/2"] Ints_diff[of 1 "1-((z+1)/2)"] by auto
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2154	hence z'': "1-z/2 \<notin> \<int>\<^sub>\<le>\<^sub>0" "1-((z+1)/2) \<notin> \<int>\<^sub>\<le>\<^sub>0" by (auto elim!: nonpos_Ints_cases)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2155	from z have "g (z/2) * g ((z+1)/2) =
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2156	(Gamma (z/2) * Gamma ((z+1)/2)) * (Gamma (1-z/2) * Gamma (1-((z+1)/2))) *
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2157	(sin (of_real pi * z/2) * sin (of_real pi * (z+1)/2))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2158	by (simp add: g_def)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2159	also from z' Gamma_legendre_duplication_aux[of "z/2"]
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2160	have "Gamma (z/2) * Gamma ((z+1)/2) = exp ((1-z) * of_real (ln 2)) * Gamma (1/2) * Gamma z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2161	by (simp add: add_divide_distrib)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2162	also from z'' Gamma_legendre_duplication_aux[of "1-(z+1)/2"]
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2163	have "Gamma (1-z/2) * Gamma (1-(z+1)/2) =
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2164	Gamma (1-z) * Gamma (1/2) * exp (z * of_real (ln 2))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2165	by (simp add: add_divide_distrib ac_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2166	finally have "g (z/2) * g ((z+1)/2) = Gamma (1/2)^2 * (Gamma z * Gamma (1-z) *
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2167	(2 * (sin (of_real piz/2) sin (of_real pi*(z+1)/2))))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2168	by (simp add: add_ac power2_eq_square exp_add ring_distribs exp_diff exp_of_real)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2169	also have "sin (of_real pi(z+1)/2) = cos (of_real piz/2)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2170	using cos_sin_eq[of "- of_real pi * z/2", symmetric]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2171	by (simp add: ring_distribs add_divide_distrib ac_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2172	also have "2 * (sin (of_real piz/2) cos (of_real piz/2)) = sin (of_real pi z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2173	by (subst sin_times_cos) (simp add: field_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2174	also have "Gamma z * Gamma (1 - z) * sin (complex_of_real pi * z) = g z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2175	using \<open>z \<notin> \<int>\<close> by (simp add: g_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2176	finally show ?thesis .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2177	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2178	have g_eq: "g (z/2) * g ((z+1)/2) = Gamma (1/2)^2 * g z" for z
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2179	proof -
63040 eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62534 diff changeset	2180	define r where "r = \<lfloor>Re z / 2\<rfloor>"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2181	have "Gamma (1/2)^2 * g z = Gamma (1/2)^2 * g (z - of_int (2*r))" by (simp only: g.minus_of_int)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2182	also have "of_int (2r) = 2 of_int r" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2183	also have "Re z - 2 * of_int r > -1" "Re z - 2 * of_int r < 2" unfolding r_def by linarith+
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2184	hence "Gamma (1/2)^2 * g (z - 2 * of_int r) =
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2185	g ((z - 2 * of_int r)/2) * g ((z - 2 * of_int r + 1)/2)"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2186	unfolding r_def by (intro g_eq[symmetric]) simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2187	also have "(z - 2 * of_int r) / 2 = z/2 - of_int r" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2188	also have "g \<dots> = g (z/2)" by (rule g.minus_of_int)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2189	also have "(z - 2 * of_int r + 1) / 2 = (z + 1)/2 - of_int r" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2190	also have "g \<dots> = g ((z+1)/2)" by (rule g.minus_of_int)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2191	finally show ?thesis ..
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2192	qed
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2193
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2194	have g_nz [simp]: "g z \<noteq> 0" for z :: complex
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2195	unfolding g_def using Ints_diff[of 1 "1 - z"]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2196	by (auto simp: Gamma_eq_zero_iff sin_eq_0 dest!: nonpos_Ints_Int)
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	2197
64969 a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	2198	have h_altdef: "h z = deriv g z / g z" for z :: complex
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	2199	using DERIV_imp_deriv[OF g_g', of z] by simp
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	2200
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2201	have h_eq: "h z = (h (z/2) + h ((z+1)/2)) / 2" for z
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2202	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2203	have "((\<lambda>t. g (t/2) * g ((t+1)/2)) has_field_derivative
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2204	(g (z/2) * g ((z+1)/2)) * ((h (z/2) + h ((z+1)/2)) / 2)) (at z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2205	by (auto intro!: derivative_eq_intros g_g'[THEN DERIV_chain2] simp: field_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2206	hence "((\<lambda>t. Gamma (1/2)^2 * g t) has_field_derivative
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2207	Gamma (1/2)^2 * g z * ((h (z/2) + h ((z+1)/2)) / 2)) (at z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2208	by (subst (1 2) g_eq[symmetric]) simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2209	from DERIV_cmult[OF this, of "inverse ((Gamma (1/2))^2)"]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2210	have "(g has_field_derivative (g z * ((h (z/2) + h ((z+1)/2))/2))) (at z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2211	using fraction_not_in_ints[where 'a = complex, of 2 1]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2212	by (simp add: divide_simps Gamma_eq_zero_iff not_in_Ints_imp_not_in_nonpos_Ints)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2213	moreover have "(g has_field_derivative (g z * h z)) (at z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2214	using g_g'[of z] by (simp add: ac_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2215	ultimately have "g z * h z = g z * ((h (z/2) + h ((z+1)/2))/2)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2216	by (intro DERIV_unique)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2217	thus "h z = (h (z/2) + h ((z+1)/2)) / 2" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2218	qed
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2219
64969 a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	2220	have h_holo [holomorphic_intros]: "h holomorphic_on A" for A
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	2221	unfolding h_altdef [abs_def]
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	2222	by (rule holomorphic_on_subset[of _ UNIV]) (auto intro!: holomorphic_intros)
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	2223	define h' where "h' = deriv h"
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	2224	have h_h': "(h has_field_derivative h' z) (at z)" for z unfolding h'_def
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	2225	by (auto intro!: holomorphic_derivI[of _ UNIV] holomorphic_intros)
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	2226	have h'_holo [holomorphic_intros]: "h' holomorphic_on A" for A unfolding h'_def
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	2227	by (rule holomorphic_on_subset[of _ UNIV]) (auto intro!: holomorphic_intros)
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	2228	have h'_cont: "continuous_on UNIV h'"
a6953714799d Simplified Gamma_Function eberlm <eberlm@in.tum.de> parents: 64272 diff changeset	2229	by (intro holomorphic_on_imp_continuous_on holomorphic_intros)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2230
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2231	have h'_eq: "h' z = (h' (z/2) + h' ((z+1)/2)) / 4" for z
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2232	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2233	have "((\<lambda>t. (h (t/2) + h ((t+1)/2)) / 2) has_field_derivative
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2234	((h' (z/2) + h' ((z+1)/2)) / 4)) (at z)"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2235	by (fastforce intro!: derivative_eq_intros h_h'[THEN DERIV_chain2])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2236	hence "(h has_field_derivative ((h' (z/2) + h' ((z+1)/2))/4)) (at z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2237	by (subst (asm) h_eq[symmetric])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2238	from h_h' and this show "h' z = (h' (z/2) + h' ((z+1)/2)) / 4" by (rule DERIV_unique)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2239	qed
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2240
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2241	have h'_zero: "h' z = 0" for z
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2242	proof -
63040 eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62534 diff changeset	2243	define m where "m = max 1 \<bar>Re z\<bar>"
eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62534 diff changeset	2244	define B where "B = {t. abs (Re t) \<le> m \<and> abs (Im t) \<le> abs (Im z)}"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2245	have "closed ({t. Re t \<ge> -m} \<inter> {t. Re t \<le> m} \<inter>
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2246	{t. Im t \<ge> -\<bar>Im z\<bar>} \<inter> {t. Im t \<le> \<bar>Im z\<bar>})"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2247	(is "closed ?B") by (intro closed_Int closed_halfspace_Re_ge closed_halfspace_Re_le
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2248	closed_halfspace_Im_ge closed_halfspace_Im_le)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2249	also have "?B = B" unfolding B_def by fastforce
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2250	finally have "closed B" .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2251	moreover have "bounded B" unfolding bounded_iff
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2252	proof (intro ballI exI)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2253	fix t assume t: "t \<in> B"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2254	have "norm t \<le> \<bar>Re t\<bar> + \<bar>Im t\<bar>" by (rule cmod_le)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2255	also from t have "\<bar>Re t\<bar> \<le> m" unfolding B_def by blast
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2256	also from t have "\<bar>Im t\<bar> \<le> \<bar>Im z\<bar>" unfolding B_def by blast
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2257	finally show "norm t \<le> m + \<bar>Im z\<bar>" by - simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2258	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2259	ultimately have compact: "compact B" by (subst compact_eq_bounded_closed) blast
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2260
63040 eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62534 diff changeset	2261	define M where "M = (SUP z:B. norm (h' z))"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2262	have "compact (h' ` B)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2263	by (intro compact_continuous_image continuous_on_subset[OF h'_cont] compact) blast+
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2264	hence bdd: "bdd_above ((\<lambda>z. norm (h' z)) ` B)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2265	using bdd_above_norm[of "h' ` B"] by (simp add: image_comp o_def compact_imp_bounded)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2266	have "norm (h' z) \<le> M" unfolding M_def by (intro cSUP_upper bdd) (simp_all add: B_def m_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2267	also have "M \<le> M/2"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2268	proof (subst M_def, subst cSUP_le_iff)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2269	have "z \<in> B" unfolding B_def m_def by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2270	thus "B \<noteq> {}" by auto
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2271	next
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2272	show "\<forall>z\<in>B. norm (h' z) \<le> M/2"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2273	proof
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2274	fix t :: complex assume t: "t \<in> B"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2275	from h'_eq[of t] t have "h' t = (h' (t/2) + h' ((t+1)/2)) / 4" by (simp add: dist_0_norm)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2276	also have "norm \<dots> = norm (h' (t/2) + h' ((t+1)/2)) / 4" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2277	also have "norm (h' (t/2) + h' ((t+1)/2)) \<le> norm (h' (t/2)) + norm (h' ((t+1)/2))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2278	by (rule norm_triangle_ineq)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2279	also from t have "abs (Re ((t + 1)/2)) \<le> m" unfolding m_def B_def by auto
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2280	with t have "t/2 \<in> B" "(t+1)/2 \<in> B" unfolding B_def by auto
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2281	hence "norm (h' (t/2)) + norm (h' ((t+1)/2)) \<le> M + M" unfolding M_def
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2282	by (intro add_mono cSUP_upper bdd) (auto simp: B_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2283	also have "(M + M) / 4 = M / 2" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2284	finally show "norm (h' t) \<le> M/2" by - simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2285	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2286	qed (insert bdd, auto simp: cball_eq_empty)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2287	hence "M \<le> 0" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2288	finally show "h' z = 0" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2289	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2290	have h_h'_2: "(h has_field_derivative 0) (at z)" for z
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2291	using h_h'[of z] h'_zero[of z] by simp
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2292
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2293	have g_real: "g z \<in> \<real>" if "z \<in> \<real>" for z
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2294	unfolding g_def using that by (auto intro!: Reals_mult Gamma_complex_real)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2295	have h_real: "h z \<in> \<real>" if "z \<in> \<real>" for z
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2296	unfolding h_def using that by (auto intro!: Reals_mult Reals_add Reals_diff Polygamma_Real)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2297
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2298	from h'_zero h_h'_2 have "\<exists>c. \<forall>z\<in>UNIV. h z = c"
66936 cf8d8fc23891 tuned some proofs and added some lemmas haftmann parents: 66526 diff changeset	2299	by (intro has_field_derivative_zero_constant) simp_all
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2300	then obtain c where c: "\<And>z. h z = c" by auto
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2301	have "\<exists>u. u \<in> closed_segment 0 1 \<and> Re (g 1) - Re (g 0) = Re (h u * g u * (1 - 0))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2302	by (intro complex_mvt_line g_g')
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2303	then guess u by (elim exE conjE) note u = this
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2304	from u(1) have u': "u \<in> \<real>" unfolding closed_segment_def
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2305	by (auto simp: scaleR_conv_of_real)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2306	from u' g_real[of u] g_nz[of u] have "Re (g u) \<noteq> 0" by (auto elim!: Reals_cases)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2307	with u(2) c[of u] g_real[of u] g_nz[of u] u'
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2308	have "Re c = 0" by (simp add: complex_is_Real_iff g.of_1)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2309	with h_real[of 0] c[of 0] have "c = 0" by (auto elim!: Reals_cases)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2310	with c have A: "h z * g z = 0" for z by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2311	hence "(g has_field_derivative 0) (at z)" for z using g_g'[of z] by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2312	hence "\<exists>c'. \<forall>z\<in>UNIV. g z = c'" by (intro has_field_derivative_zero_constant) simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2313	then obtain c' where c: "\<And>z. g z = c'" by (force simp: dist_0_norm)
63539 70d4d9e5707b tuned proofs -- avoid improper use of "this"; wenzelm parents: 63417 diff changeset	2314	from this[of 0] have "c' = pi" unfolding g_def by simp
70d4d9e5707b tuned proofs -- avoid improper use of "this"; wenzelm parents: 63417 diff changeset	2315	with c have "g z = pi" by simp
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2316
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2317	show ?thesis
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2318	proof (cases "z \<in> \<int>")
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2319	case False
62072 bf3d9f113474 isabelle update_cartouches -c -t; wenzelm parents: 62055 diff changeset	2320	with \<open>g z = pi\<close> show ?thesis by (auto simp: g_def divide_simps)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2321	next
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2322	case True
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2323	then obtain n where n: "z = of_int n" by (elim Ints_cases)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2324	with sin_eq_0[of "of_real pi * z"] have "sin (of_real pi * z) = 0" by force
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2325	moreover have "of_int (1 - n) \<in> \<int>\<^sub>\<le>\<^sub>0" if "n > 0" using that by (intro nonpos_Ints_of_int) simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2326	ultimately show ?thesis using n
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2327	by (cases "n \<le> 0") (auto simp: Gamma_eq_zero_iff nonpos_Ints_of_int)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2328	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2329	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2330
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2331	lemma rGamma_reflection_complex:
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2332	"rGamma z * rGamma (1 - z :: complex) = sin (of_real pi * z) / of_real pi"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2333	using Gamma_reflection_complex[of z]
62390 842917225d56 more canonical names nipkow parents: 62131 diff changeset	2334	by (simp add: Gamma_def divide_simps split: if_split_asm)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2335
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2336	lemma rGamma_reflection_complex':
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2337	"rGamma z * rGamma (- z :: complex) = -z * sin (of_real pi * z) / of_real pi"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2338	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2339	have "rGamma z * rGamma (-z) = -z * (rGamma z * rGamma (1 - z))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2340	using rGamma_plus1[of "-z", symmetric] by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2341	also have "rGamma z * rGamma (1 - z) = sin (of_real pi * z) / of_real pi"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2342	by (rule rGamma_reflection_complex)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2343	finally show ?thesis by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2344	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2345
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2346	lemma Gamma_reflection_complex':
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2347	"Gamma z * Gamma (- z :: complex) = - of_real pi / (z * sin (of_real pi * z))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2348	using rGamma_reflection_complex'[of z] by (force simp add: Gamma_def divide_simps mult_ac)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2349
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2350
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2351
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2352	lemma Gamma_one_half_real: "Gamma (1/2 :: real) = sqrt pi"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2353	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2354	from Gamma_reflection_complex[of "1/2"] fraction_not_in_ints[where 'a = complex, of 2 1]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2355	have "Gamma (1/2 :: complex)^2 = of_real pi" by (simp add: power2_eq_square)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2356	hence "of_real pi = Gamma (complex_of_real (1/2))^2" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2357	also have "\<dots> = of_real ((Gamma (1/2))^2)" by (subst Gamma_complex_of_real) simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2358	finally have "Gamma (1/2)^2 = pi" by (subst (asm) of_real_eq_iff) simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2359	moreover have "Gamma (1/2 :: real) \<ge> 0" using Gamma_real_pos[of "1/2"] by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2360	ultimately show ?thesis by (rule real_sqrt_unique [symmetric])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2361	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2362
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2363	lemma Gamma_one_half_complex: "Gamma (1/2 :: complex) = of_real (sqrt pi)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2364	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2365	have "Gamma (1/2 :: complex) = Gamma (of_real (1/2))" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2366	also have "\<dots> = of_real (sqrt pi)" by (simp only: Gamma_complex_of_real Gamma_one_half_real)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2367	finally show ?thesis .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2368	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2369
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2370	lemma Gamma_legendre_duplication:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2371	fixes z :: complex
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2372	assumes "z \<notin> \<int>\<^sub>\<le>\<^sub>0" "z + 1/2 \<notin> \<int>\<^sub>\<le>\<^sub>0"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2373	shows "Gamma z * Gamma (z + 1/2) =
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2374	exp ((1 - 2z) of_real (ln 2)) * of_real (sqrt pi) * Gamma (2*z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2375	using Gamma_legendre_duplication_aux[OF assms] by (simp add: Gamma_one_half_complex)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2376
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2377	end
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2378
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2379
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2380	subsection \<open>Limits and residues\<close>
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2381
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2382	text \<open>
62085 5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2383	The inverse of the Gamma function has simple zeros:
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2384	\<close>
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2385
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2386	lemma rGamma_zeros:
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2387	"(\<lambda>z. rGamma z / (z + of_nat n)) \<midarrow> (- of_nat n) \<rightarrow> ((-1)^n * fact n :: 'a :: Gamma)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2388	proof (subst tendsto_cong)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2389	let ?f = "\<lambda>z. pochhammer z n * rGamma (z + of_nat (Suc n)) :: 'a"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2390	from eventually_at_ball'[OF zero_less_one, of "- of_nat n :: 'a" UNIV]
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2391	show "eventually (\<lambda>z. rGamma z / (z + of_nat n) = ?f z) (at (- of_nat n))"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2392	by (subst pochhammer_rGamma[of _ "Suc n"])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2393	(auto elim!: eventually_mono simp: divide_simps pochhammer_rec' eq_neg_iff_add_eq_0)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2394	have "isCont ?f (- of_nat n)" by (intro continuous_intros)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2395	thus "?f \<midarrow> (- of_nat n) \<rightarrow> (- 1) ^ n * fact n" unfolding isCont_def
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2396	by (simp add: pochhammer_same)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2397	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2398
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2399
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2400	text \<open>
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2401	The simple zeros of the inverse of the Gamma function correspond to simple poles of the Gamma function,
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2402	and their residues can easily be computed from the limit we have just proven:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2403	\<close>
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2404
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2405	lemma Gamma_poles: "filterlim Gamma at_infinity (at (- of_nat n :: 'a :: Gamma))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2406	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2407	from eventually_at_ball'[OF zero_less_one, of "- of_nat n :: 'a" UNIV]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2408	have "eventually (\<lambda>z. rGamma z \<noteq> (0 :: 'a)) (at (- of_nat n))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2409	by (auto elim!: eventually_mono nonpos_Ints_cases'
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2410	simp: rGamma_eq_zero_iff dist_of_nat dist_minus)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2411	with isCont_rGamma[of "- of_nat n :: 'a", OF continuous_ident]
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2412	have "filterlim (\<lambda>z. inverse (rGamma z) :: 'a) at_infinity (at (- of_nat n))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2413	unfolding isCont_def by (intro filterlim_compose[OF filterlim_inverse_at_infinity])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2414	(simp_all add: filterlim_at)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2415	moreover have "(\<lambda>z. inverse (rGamma z) :: 'a) = Gamma"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2416	by (intro ext) (simp add: rGamma_inverse_Gamma)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2417	ultimately show ?thesis by (simp only: )
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2418	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2419
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2420	lemma Gamma_residues:
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2421	"(\<lambda>z. Gamma z * (z + of_nat n)) \<midarrow> (- of_nat n) \<rightarrow> ((-1)^n / fact n :: 'a :: Gamma)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2422	proof (subst tendsto_cong)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2423	let ?c = "(- 1) ^ n / fact n :: 'a"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2424	from eventually_at_ball'[OF zero_less_one, of "- of_nat n :: 'a" UNIV]
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2425	show "eventually (\<lambda>z. Gamma z * (z + of_nat n) = inverse (rGamma z / (z + of_nat n)))
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2426	(at (- of_nat n))"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2427	by (auto elim!: eventually_mono simp: divide_simps rGamma_inverse_Gamma)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2428	have "(\<lambda>z. inverse (rGamma z / (z + of_nat n))) \<midarrow> (- of_nat n) \<rightarrow>
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2429	inverse ((- 1) ^ n * fact n :: 'a)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2430	by (intro tendsto_intros rGamma_zeros) simp_all
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2431	also have "inverse ((- 1) ^ n * fact n) = ?c"
68403 223172b97d0b reorient -> split; documented split nipkow parents: 68224 diff changeset	2432	by (simp_all add: field_simps flip: power_mult_distrib)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2433	finally show "(\<lambda>z. inverse (rGamma z / (z + of_nat n))) \<midarrow> (- of_nat n) \<rightarrow> ?c" .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2434	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2435
66286 1c977b13414f poles and residues of the Gamma function eberlm <eberlm@in.tum.de> parents: 65587 diff changeset	2436	lemma is_pole_Gamma: "is_pole Gamma (- of_nat n)"
1c977b13414f poles and residues of the Gamma function eberlm <eberlm@in.tum.de> parents: 65587 diff changeset	2437	unfolding is_pole_def using Gamma_poles .
1c977b13414f poles and residues of the Gamma function eberlm <eberlm@in.tum.de> parents: 65587 diff changeset	2438
1c977b13414f poles and residues of the Gamma function eberlm <eberlm@in.tum.de> parents: 65587 diff changeset	2439	lemma Gamme_residue:
1c977b13414f poles and residues of the Gamma function eberlm <eberlm@in.tum.de> parents: 65587 diff changeset	2440	"residue Gamma (- of_nat n) = (-1) ^ n / fact n"
1c977b13414f poles and residues of the Gamma function eberlm <eberlm@in.tum.de> parents: 65587 diff changeset	2441	proof (rule residue_simple')
1c977b13414f poles and residues of the Gamma function eberlm <eberlm@in.tum.de> parents: 65587 diff changeset	2442	show "open (- (\<int>\<^sub>\<le>\<^sub>0 - {-of_nat n}) :: complex set)"
1c977b13414f poles and residues of the Gamma function eberlm <eberlm@in.tum.de> parents: 65587 diff changeset	2443	by (intro open_Compl closed_subset_Ints) auto
1c977b13414f poles and residues of the Gamma function eberlm <eberlm@in.tum.de> parents: 65587 diff changeset	2444	show "Gamma holomorphic_on (- (\<int>\<^sub>\<le>\<^sub>0 - {-of_nat n}) - {- of_nat n})"
1c977b13414f poles and residues of the Gamma function eberlm <eberlm@in.tum.de> parents: 65587 diff changeset	2445	by (rule holomorphic_Gamma) auto
1c977b13414f poles and residues of the Gamma function eberlm <eberlm@in.tum.de> parents: 65587 diff changeset	2446	show "(\<lambda>w. Gamma w * (w - - of_nat n)) \<midarrow>- of_nat n \<rightarrow> (- 1) ^ n / fact n"
1c977b13414f poles and residues of the Gamma function eberlm <eberlm@in.tum.de> parents: 65587 diff changeset	2447	using Gamma_residues[of n] by simp
1c977b13414f poles and residues of the Gamma function eberlm <eberlm@in.tum.de> parents: 65587 diff changeset	2448	qed auto
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2449
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2450
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2451	subsection \<open>Alternative definitions\<close>
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2452
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2453
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2454	subsubsection \<open>Variant of the Euler form\<close>
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2455
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2456
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2457	definition Gamma_series_euler' where
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2458	"Gamma_series_euler' z n =
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2459	inverse z * (\<Prod>k=1..n. exp (z * of_real (ln (1 + inverse (of_nat k)))) / (1 + z / of_nat k))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2460
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2461	context
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2462	begin
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2463	private lemma Gamma_euler'_aux1:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2464	fixes z :: "'a :: {real_normed_field,banach}"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2465	assumes n: "n > 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2466	shows "exp (z * of_real (ln (of_nat n + 1))) = (\<Prod>k=1..n. exp (z * of_real (ln (1 + 1 / of_nat k))))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2467	proof -
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2468	have "(\<Prod>k=1..n. exp (z * of_real (ln (1 + 1 / of_nat k)))) =
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2469	exp (z * of_real (\<Sum>k = 1..n. ln (1 + 1 / real_of_nat k)))"
64267 b9a1486e79be setsum -> sum nipkow parents: 63992 diff changeset	2470	by (subst exp_sum [symmetric]) (simp_all add: sum_distrib_left)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2471	also have "(\<Sum>k=1..n. ln (1 + 1 / of_nat k) :: real) = ln (\<Prod>k=1..n. 1 + 1 / real_of_nat k)"
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	2472	by (subst ln_prod [symmetric]) (auto intro!: add_pos_nonneg)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2473	also have "(\<Prod>k=1..n. 1 + 1 / of_nat k :: real) = (\<Prod>k=1..n. (of_nat k + 1) / of_nat k)"
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	2474	by (intro prod.cong) (simp_all add: divide_simps)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2475	also have "(\<Prod>k=1..n. (of_nat k + 1) / of_nat k :: real) = of_nat n + 1"
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	2476	by (induction n) (simp_all add: prod_nat_ivl_Suc' divide_simps)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2477	finally show ?thesis ..
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2478	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2479
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2480	lemma Gamma_series_euler':
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2481	assumes z: "(z :: 'a :: Gamma) \<notin> \<int>\<^sub>\<le>\<^sub>0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2482	shows "(\<lambda>n. Gamma_series_euler' z n) \<longlonglongrightarrow> Gamma z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2483	proof (rule Gamma_seriesI, rule Lim_transform_eventually)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2484	let ?f = "\<lambda>n. fact n * exp (z * of_real (ln (of_nat n + 1))) / pochhammer z (n + 1)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2485	let ?r = "\<lambda>n. ?f n / Gamma_series z n"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2486	let ?r' = "\<lambda>n. exp (z * of_real (ln (of_nat (Suc n) / of_nat n)))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2487	from z have z': "z \<noteq> 0" by auto
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2488
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	2489	have "eventually (\<lambda>n. ?r' n = ?r n) sequentially"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2490	using z by (auto simp: divide_simps Gamma_series_def ring_distribs exp_diff ln_div add_ac
65578 e4997c181cce New material from PNT proof, as well as more default [simp] declarations. Also removed duplicate theorems about geometric series paulson <lp15@cam.ac.uk> parents: 64969 diff changeset	2491	intro: eventually_mono eventually_gt_at_top[of "0::nat"] dest: pochhammer_eq_0_imp_nonpos_Int)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2492	moreover have "?r' \<longlonglongrightarrow> exp (z * of_real (ln 1))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2493	by (intro tendsto_intros LIMSEQ_Suc_n_over_n) simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2494	ultimately show "?r \<longlonglongrightarrow> 1" by (force dest!: Lim_transform_eventually)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2495
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2496	from eventually_gt_at_top[of "0::nat"]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2497	show "eventually (\<lambda>n. ?r n = Gamma_series_euler' z n / Gamma_series z n) sequentially"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2498	proof eventually_elim
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2499	fix n :: nat assume n: "n > 0"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2500	from n z' have "Gamma_series_euler' z n =
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2501	exp (z * of_real (ln (of_nat n + 1))) / (z * (\<Prod>k=1..n. (1 + z / of_nat k)))"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2502	by (subst Gamma_euler'_aux1)
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	2503	(simp_all add: Gamma_series_euler'_def prod.distrib
f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	2504	prod_inversef[symmetric] divide_inverse)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2505	also have "(\<Prod>k=1..n. (1 + z / of_nat k)) = pochhammer (z + 1) n / fact n"
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	2506	by (cases n) (simp_all add: pochhammer_prod fact_prod atLeastLessThanSuc_atLeastAtMost
f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	2507	prod_dividef [symmetric] field_simps prod.atLeast_Suc_atMost_Suc_shift)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2508	also have "z * \<dots> = pochhammer z (Suc n) / fact n" by (simp add: pochhammer_rec)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2509	finally show "?r n = Gamma_series_euler' z n / Gamma_series z n" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2510	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2511	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2512
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2513	end
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2514
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2515
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2516
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2517	subsubsection \<open>Weierstrass form\<close>
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2518
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2519	definition Gamma_series_weierstrass :: "'a :: {banach,real_normed_field} \<Rightarrow> nat \<Rightarrow> 'a" where
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2520	"Gamma_series_weierstrass z n =
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2521	exp (-euler_mascheroni * z) / z * (\<Prod>k=1..n. exp (z / of_nat k) / (1 + z / of_nat k))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2522
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2523	definition rGamma_series_weierstrass :: "'a :: {banach,real_normed_field} \<Rightarrow> nat \<Rightarrow> 'a" where
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2524	"rGamma_series_weierstrass z n =
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2525	exp (euler_mascheroni * z) * z * (\<Prod>k=1..n. (1 + z / of_nat k) * exp (-z / of_nat k))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2526
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2527	lemma Gamma_series_weierstrass_nonpos_Ints:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2528	"eventually (\<lambda>k. Gamma_series_weierstrass (- of_nat n) k = 0) sequentially"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2529	using eventually_ge_at_top[of n] by eventually_elim (auto simp: Gamma_series_weierstrass_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2530
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2531	lemma rGamma_series_weierstrass_nonpos_Ints:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2532	"eventually (\<lambda>k. rGamma_series_weierstrass (- of_nat n) k = 0) sequentially"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2533	using eventually_ge_at_top[of n] by eventually_elim (auto simp: rGamma_series_weierstrass_def)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2534
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2535	lemma Gamma_weierstrass_complex: "Gamma_series_weierstrass z \<longlonglongrightarrow> Gamma (z :: complex)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2536	proof (cases "z \<in> \<int>\<^sub>\<le>\<^sub>0")
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2537	case True
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2538	then obtain n where "z = - of_nat n" by (elim nonpos_Ints_cases')
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2539	also from True have "Gamma_series_weierstrass \<dots> \<longlonglongrightarrow> Gamma z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2540	by (simp add: tendsto_cong[OF Gamma_series_weierstrass_nonpos_Ints] Gamma_nonpos_Int)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2541	finally show ?thesis .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2542	next
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2543	case False
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2544	hence z: "z \<noteq> 0" by auto
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2545	let ?f = "(\<lambda>x. \<Prod>x = Suc 0..x. exp (z / of_nat x) / (1 + z / of_nat x))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2546	have A: "exp (ln (1 + z / of_nat n)) = (1 + z / of_nat n)" if "n \<ge> 1" for n :: nat
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2547	using False that by (subst exp_Ln) (auto simp: field_simps dest!: plus_of_nat_eq_0_imp)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2548	have "(\<lambda>n. \<Sum>k=1..n. z / of_nat k - ln (1 + z / of_nat k)) \<longlonglongrightarrow> ln_Gamma z + euler_mascheroni * z + ln z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2549	using ln_Gamma_series'_aux[OF False]
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2550	by (simp only: atLeastLessThanSuc_atLeastAtMost [symmetric] One_nat_def
64267 b9a1486e79be setsum -> sum nipkow parents: 63992 diff changeset	2551	sum_shift_bounds_Suc_ivl sums_def atLeast0LessThan)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2552	from tendsto_exp[OF this] False z have "?f \<longlonglongrightarrow> z * exp (euler_mascheroni * z) * Gamma z"
64267 b9a1486e79be setsum -> sum nipkow parents: 63992 diff changeset	2553	by (simp add: exp_add exp_sum exp_diff mult_ac Gamma_complex_altdef A)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2554	from tendsto_mult[OF tendsto_const[of "exp (-euler_mascheroni * z) / z"] this] z
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2555	show "Gamma_series_weierstrass z \<longlonglongrightarrow> Gamma z"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2556	by (simp add: exp_minus divide_simps Gamma_series_weierstrass_def [abs_def])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2557	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2558
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2559	lemma tendsto_complex_of_real_iff: "((\<lambda>x. complex_of_real (f x)) \<longlongrightarrow> of_real c) F = (f \<longlongrightarrow> c) F"
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2560	by (rule tendsto_of_real_iff)
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2561
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2562	lemma Gamma_weierstrass_real: "Gamma_series_weierstrass x \<longlonglongrightarrow> Gamma (x :: real)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2563	using Gamma_weierstrass_complex[of "of_real x"] unfolding Gamma_series_weierstrass_def[abs_def]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2564	by (subst tendsto_complex_of_real_iff [symmetric])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2565	(simp_all add: exp_of_real[symmetric] Gamma_complex_of_real)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2566
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2567	lemma rGamma_weierstrass_complex: "rGamma_series_weierstrass z \<longlonglongrightarrow> rGamma (z :: complex)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2568	proof (cases "z \<in> \<int>\<^sub>\<le>\<^sub>0")
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2569	case True
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2570	then obtain n where "z = - of_nat n" by (elim nonpos_Ints_cases')
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2571	also from True have "rGamma_series_weierstrass \<dots> \<longlonglongrightarrow> rGamma z"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2572	by (simp add: tendsto_cong[OF rGamma_series_weierstrass_nonpos_Ints] rGamma_nonpos_Int)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2573	finally show ?thesis .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2574	next
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2575	case False
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2576	have "rGamma_series_weierstrass z = (\<lambda>n. inverse (Gamma_series_weierstrass z n))"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2577	by (simp add: rGamma_series_weierstrass_def[abs_def] Gamma_series_weierstrass_def
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	2578	exp_minus divide_inverse prod_inversef[symmetric] mult_ac)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2579	also from False have "\<dots> \<longlonglongrightarrow> inverse (Gamma z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2580	by (intro tendsto_intros Gamma_weierstrass_complex) (simp add: Gamma_eq_zero_iff)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2581	finally show ?thesis by (simp add: Gamma_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2582	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	2583
62085 5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2584	subsubsection \<open>Binomial coefficient form\<close>
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2585
63295 52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2586	lemma Gamma_gbinomial:
62085 5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2587	"(\<lambda>n. ((z + of_nat n) gchoose n) * exp (-z * of_real (ln (of_nat n)))) \<longlonglongrightarrow> rGamma (z+1)"
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2588	proof (cases "z = 0")
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2589	case False
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2590	show ?thesis
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2591	proof (rule Lim_transform_eventually)
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2592	let ?powr = "\<lambda>a b. exp (b * of_real (ln (of_nat a)))"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2593	show "eventually (\<lambda>n. rGamma_series z n / z =
62085 5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2594	((z + of_nat n) gchoose n) * ?powr n (-z)) sequentially"
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2595	proof (intro always_eventually allI)
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2596	fix n :: nat
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2597	from False have "((z + of_nat n) gchoose n) = pochhammer z (Suc n) / z / fact n"
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2598	by (simp add: gbinomial_pochhammer' pochhammer_rec)
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2599	also have "pochhammer z (Suc n) / z / fact n * ?powr n (-z) = rGamma_series z n / z"
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2600	by (simp add: rGamma_series_def divide_simps exp_minus)
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2601	finally show "rGamma_series z n / z = ((z + of_nat n) gchoose n) * ?powr n (-z)" ..
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2602	qed
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2603
62085 5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2604	from False have "(\<lambda>n. rGamma_series z n / z) \<longlonglongrightarrow> rGamma z / z" by (intro tendsto_intros)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2605	also from False have "rGamma z / z = rGamma (z + 1)" using rGamma_plus1[of z]
62085 5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2606	by (simp add: field_simps)
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2607	finally show "(\<lambda>n. rGamma_series z n / z) \<longlonglongrightarrow> rGamma (z+1)" .
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2608	qed
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2609	qed (simp_all add: binomial_gbinomial [symmetric])
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2610
63295 52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2611	lemma gbinomial_minus': "(a + of_nat b) gchoose b = (- 1) ^ b * (- (a + 1) gchoose b)"
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2612	by (subst gbinomial_minus) (simp add: power_mult_distrib [symmetric])
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2613
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2614	lemma gbinomial_asymptotic:
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2615	fixes z :: "'a :: Gamma"
63594 bd218a9320b5 HOL-Multivariate_Analysis: rename theories for more descriptive names hoelzl parents: 63539 diff changeset	2616	shows "(\<lambda>n. (z gchoose n) / ((-1)^n / exp ((z+1) * of_real (ln (real n))))) \<longlonglongrightarrow>
63295 52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2617	inverse (Gamma (- z))"
63594 bd218a9320b5 HOL-Multivariate_Analysis: rename theories for more descriptive names hoelzl parents: 63539 diff changeset	2618	unfolding rGamma_inverse_Gamma [symmetric] using Gamma_gbinomial[of "-z-1"]
63295 52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2619	by (subst (asm) gbinomial_minus')
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2620	(simp add: add_ac mult_ac divide_inverse power_inverse [symmetric])
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2621
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	2622	lemma fact_binomial_limit:
62085 5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2623	"(\<lambda>n. of_nat ((k + n) choose n) / of_nat (n ^ k) :: 'a :: Gamma) \<longlonglongrightarrow> 1 / fact k"
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2624	proof (rule Lim_transform_eventually)
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2625	have "(\<lambda>n. of_nat ((k + n) choose n) / of_real (exp (of_nat k * ln (real_of_nat n))))
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2626	\<longlonglongrightarrow> 1 / Gamma (of_nat (Suc k) :: 'a)" (is "?f \<longlonglongrightarrow> _")
63295 52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2627	using Gamma_gbinomial[of "of_nat k :: 'a"]
62085 5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2628	by (simp add: binomial_gbinomial add_ac Gamma_def divide_simps exp_of_real [symmetric] exp_minus)
63295 52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2629	also have "Gamma (of_nat (Suc k)) = fact k" by (simp add: Gamma_fact)
62085 5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2630	finally show "?f \<longlonglongrightarrow> 1 / fact k" .
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2631
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2632	show "eventually (\<lambda>n. ?f n = of_nat ((k + n) choose n) / of_nat (n ^ k)) sequentially"
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2633	using eventually_gt_at_top[of "0::nat"]
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2634	proof eventually_elim
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2635	fix n :: nat assume n: "n > 0"
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2636	from n have "exp (real_of_nat k * ln (real_of_nat n)) = real_of_nat (n^k)"
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2637	by (simp add: exp_of_nat_mult)
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2638	thus "?f n = of_nat ((k + n) choose n) / of_nat (n ^ k)" by simp
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2639	qed
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2640	qed
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2641
63295 52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2642	lemma binomial_asymptotic':
62085 5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2643	"(\<lambda>n. of_nat ((k + n) choose n) / (of_nat (n ^ k) / fact k) :: 'a :: Gamma) \<longlonglongrightarrow> 1"
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2644	using tendsto_mult[OF fact_binomial_limit[of k] tendsto_const[of "fact k :: 'a"]] by simp
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2645
63295 52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2646	lemma gbinomial_Beta:
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2647	assumes "z + 1 \<notin> \<int>\<^sub>\<le>\<^sub>0"
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2648	shows "((z::'a::Gamma) gchoose n) = inverse ((z + 1) * Beta (z - of_nat n + 1) (of_nat n + 1))"
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2649	using assms
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2650	proof (induction n arbitrary: z)
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2651	case 0
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2652	hence "z + 2 \<notin> \<int>\<^sub>\<le>\<^sub>0"
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2653	using plus_one_in_nonpos_Ints_imp[of "z+1"] by (auto simp: add.commute)
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2654	with 0 show ?case
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2655	by (auto simp: Beta_def Gamma_eq_zero_iff Gamma_plus1 [symmetric] add.commute)
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2656	next
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2657	case (Suc n z)
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2658	show ?case
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2659	proof (cases "z \<in> \<int>\<^sub>\<le>\<^sub>0")
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2660	case True
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2661	with Suc.prems have "z = 0"
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2662	by (auto elim!: nonpos_Ints_cases simp: algebra_simps one_plus_of_int_in_nonpos_Ints_iff)
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2663	show ?thesis
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2664	proof (cases "n = 0")
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2665	case True
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2666	with \<open>z = 0\<close> show ?thesis
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2667	by (simp add: Beta_def Gamma_eq_zero_iff Gamma_plus1 [symmetric])
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2668	next
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2669	case False
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2670	with \<open>z = 0\<close> show ?thesis
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2671	by (simp_all add: Beta_pole1 one_minus_of_nat_in_nonpos_Ints_iff gbinomial_1)
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2672	qed
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2673	next
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2674	case False
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2675	have "(z gchoose (Suc n)) = ((z - 1 + 1) gchoose (Suc n))" by simp
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2676	also have "\<dots> = (z - 1 gchoose n) * ((z - 1) + 1) / of_nat (Suc n)"
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2677	by (subst gbinomial_factors) (simp add: field_simps)
63594 bd218a9320b5 HOL-Multivariate_Analysis: rename theories for more descriptive names hoelzl parents: 63539 diff changeset	2678	also from False have "\<dots> = inverse (of_nat (Suc n) * Beta (z - of_nat n) (of_nat (Suc n)))"
63295 52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2679	(is "_ = inverse ?x") by (subst Suc.IH) (simp_all add: field_simps Beta_pole1)
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2680	also have "of_nat (Suc n) \<notin> (\<int>\<^sub>\<le>\<^sub>0 :: 'a set)" by (subst of_nat_in_nonpos_Ints_iff) simp_all
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2681	hence "?x = (z + 1) * Beta (z - of_nat (Suc n) + 1) (of_nat (Suc n) + 1)"
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2682	by (subst Beta_plus1_right [symmetric]) simp_all
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2683	finally show ?thesis .
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2684	qed
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2685	qed
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2686
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2687	lemma gbinomial_Gamma:
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2688	assumes "z + 1 \<notin> \<int>\<^sub>\<le>\<^sub>0"
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2689	shows "(z gchoose n) = Gamma (z + 1) / (fact n * Gamma (z - of_nat n + 1))"
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2690	proof -
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2691	have "(z gchoose n) = Gamma (z + 2) / (z + 1) / (fact n * Gamma (z - of_nat n + 1))"
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2692	by (subst gbinomial_Beta[OF assms]) (simp_all add: Beta_def Gamma_fact [symmetric] add_ac)
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2693	also from assms have "Gamma (z + 2) / (z + 1) = Gamma (z + 1)"
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2694	using Gamma_plus1[of "z+1"] by (auto simp add: divide_simps mult_ac add_ac)
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2695	finally show ?thesis .
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2696	qed
52792bb9126e Facts about HK integration, complex powers, Gamma function eberlm parents: 63040 diff changeset	2697
62085 5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	2698
63296 3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2699	subsubsection \<open>Integral form\<close>
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2700
66526 322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2701	lemma integrable_on_powr_from_0':
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2702	assumes a: "a > (-1::real)" and c: "c \<ge> 0"
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2703	shows "(\<lambda>x. x powr a) integrable_on {0<..c}"
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2704	proof -
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2705	from c have *: "{0<..c} - {0..c} = {}" "{0..c} - {0<..c} = {0}" by auto
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2706	show ?thesis
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2707	by (rule integrable_spike_set [OF integrable_on_powr_from_0[OF a c]]) (simp_all add: *)
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2708	qed
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2709
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2710	lemma absolutely_integrable_Gamma_integral:
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2711	assumes "Re z > 0" "a > 0"
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2712	shows "(\<lambda>t. complex_of_real t powr (z - 1) / of_real (exp (a * t)))
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2713	absolutely_integrable_on {0<..}" (is "?f absolutely_integrable_on _")
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2714	proof -
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2715	have "((\<lambda>x. (Re z - 1) * (ln x / x)) \<longlongrightarrow> (Re z - 1) * 0) at_top"
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2716	by (intro tendsto_intros ln_x_over_x_tendsto_0)
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2717	hence "((\<lambda>x. ((Re z - 1) * ln x) / x) \<longlongrightarrow> 0) at_top" by simp
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2718	from order_tendstoD(2)[OF this, of "a/2"] and \<open>a > 0\<close>
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2719	have "eventually (\<lambda>x. (Re z - 1) * ln x / x < a/2) at_top" by simp
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2720	from eventually_conj[OF this eventually_gt_at_top[of 0]]
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2721	obtain x0 where "\<forall>x\<ge>x0. (Re z - 1) * ln x / x < a/2 \<and> x > 0"
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2722	by (auto simp: eventually_at_top_linorder)
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2723	hence "x0 > 0" by simp
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2724	have "x powr (Re z - 1) / exp (a * x) < exp (-(a/2) * x)" if "x \<ge> x0" for x
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2725	proof -
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2726	from that and \<open>\<forall>x\<ge>x0. _\<close> have x: "(Re z - 1) * ln x / x < a / 2" "x > 0" by auto
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2727	have "x powr (Re z - 1) = exp ((Re z - 1) * ln x)"
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2728	using \<open>x > 0\<close> by (simp add: powr_def)
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2729	also from x have "(Re z - 1) * ln x < (a * x) / 2" by (simp add: field_simps)
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2730	finally show ?thesis by (simp add: field_simps exp_add [symmetric])
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2731	qed
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2732	note x0 = \<open>x0 > 0\<close> this
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2733
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2734	have "?f absolutely_integrable_on ({0<..x0} \<union> {x0..})"
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2735	proof (rule set_integrable_Un)
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2736	show "?f absolutely_integrable_on {0<..x0}"
67976 75b94eb58c3d Analysis builds using set_borel_measurable_def, etc. paulson <lp15@cam.ac.uk> parents: 67399 diff changeset	2737	unfolding set_integrable_def
66526 322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2738	proof (rule Bochner_Integration.integrable_bound [OF _ _ AE_I2])
67976 75b94eb58c3d Analysis builds using set_borel_measurable_def, etc. paulson <lp15@cam.ac.uk> parents: 67399 diff changeset	2739	show "integrable lebesgue (\<lambda>x. indicat_real {0<..x0} x *\<^sub>R x powr (Re z - 1))"
75b94eb58c3d Analysis builds using set_borel_measurable_def, etc. paulson <lp15@cam.ac.uk> parents: 67399 diff changeset	2740	using x0(1) assms
75b94eb58c3d Analysis builds using set_borel_measurable_def, etc. paulson <lp15@cam.ac.uk> parents: 67399 diff changeset	2741	by (intro nonnegative_absolutely_integrable_1 [unfolded set_integrable_def] integrable_on_powr_from_0') auto
75b94eb58c3d Analysis builds using set_borel_measurable_def, etc. paulson <lp15@cam.ac.uk> parents: 67399 diff changeset	2742	show "(\<lambda>x. indicat_real {0<..x0} x \<^sub>R (x powr (z - 1) / exp (a x))) \<in> borel_measurable lebesgue"
66526 322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2743	by (intro measurable_completion)
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2744	(auto intro!: borel_measurable_continuous_on_indicator continuous_intros)
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2745	fix x :: real
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2746	have "x powr (Re z - 1) / exp (a * x) \<le> x powr (Re z - 1) / 1" if "x \<ge> 0"
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2747	using that assms by (intro divide_left_mono) auto
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2748	thus "norm (indicator {0<..x0} x *\<^sub>R ?f x) \<le>
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2749	norm (indicator {0<..x0} x *\<^sub>R x powr (Re z - 1))"
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2750	by (simp_all add: norm_divide norm_powr_real_powr indicator_def)
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2751	qed
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2752	next
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2753	show "?f absolutely_integrable_on {x0..}"
67976 75b94eb58c3d Analysis builds using set_borel_measurable_def, etc. paulson <lp15@cam.ac.uk> parents: 67399 diff changeset	2754	unfolding set_integrable_def
66526 322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2755	proof (rule Bochner_Integration.integrable_bound [OF _ _ AE_I2])
67976 75b94eb58c3d Analysis builds using set_borel_measurable_def, etc. paulson <lp15@cam.ac.uk> parents: 67399 diff changeset	2756	show "integrable lebesgue (\<lambda>x. indicat_real {x0..} x \<^sub>R exp (- (a / 2) x))" using assms
75b94eb58c3d Analysis builds using set_borel_measurable_def, etc. paulson <lp15@cam.ac.uk> parents: 67399 diff changeset	2757	by (intro nonnegative_absolutely_integrable_1 [unfolded set_integrable_def] integrable_on_exp_minus_to_infinity) auto
75b94eb58c3d Analysis builds using set_borel_measurable_def, etc. paulson <lp15@cam.ac.uk> parents: 67399 diff changeset	2758	show "(\<lambda>x. indicat_real {x0..} x \<^sub>R (x powr (z - 1) / exp (a x))) \<in> borel_measurable lebesgue" using x0(1)
66526 322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2759	by (intro measurable_completion)
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2760	(auto intro!: borel_measurable_continuous_on_indicator continuous_intros)
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2761	fix x :: real
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2762	show "norm (indicator {x0..} x *\<^sub>R ?f x) \<le>
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2763	norm (indicator {x0..} x \<^sub>R exp (-(a/2) x))" using x0
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2764	by (auto simp: norm_divide norm_powr_real_powr indicator_def less_imp_le)
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2765	qed
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2766	qed auto
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2767	also have "{0<..x0} \<union> {x0..} = {0<..}" using x0(1) by auto
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2768	finally show ?thesis .
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2769	qed
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2770
63296 3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2771	lemma integrable_Gamma_integral_bound:
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2772	fixes a c :: real
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2773	assumes a: "a > -1" and c: "c \<ge> 0"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2774	defines "f \<equiv> \<lambda>x. if x \<in> {0..c} then x powr a else exp (-x/2)"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2775	shows "f integrable_on {0..}"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2776	proof -
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2777	have "f integrable_on {0..c}"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2778	by (rule integrable_spike_finite[of "{}", OF _ _ integrable_on_powr_from_0[of a c]])
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2779	(insert a c, simp_all add: f_def)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2780	moreover have A: "(\<lambda>x. exp (-x/2)) integrable_on {c..}"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2781	using integrable_on_exp_minus_to_infinity[of "1/2"] by simp
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2782	have "f integrable_on {c..}"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2783	by (rule integrable_spike_finite[of "{c}", OF _ _ A]) (simp_all add: f_def)
63594 bd218a9320b5 HOL-Multivariate_Analysis: rename theories for more descriptive names hoelzl parents: 63539 diff changeset	2784	ultimately show "f integrable_on {0..}"
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	2785	by (rule integrable_Un') (insert c, auto simp: max_def)
63594 bd218a9320b5 HOL-Multivariate_Analysis: rename theories for more descriptive names hoelzl parents: 63539 diff changeset	2786	qed
63296 3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2787
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2788	lemma Gamma_integral_complex:
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2789	assumes z: "Re z > 0"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2790	shows "((\<lambda>t. of_real t powr (z - 1) / of_real (exp t)) has_integral Gamma z) {0..}"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2791	proof -
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2792	have A: "((\<lambda>t. (of_real t) powr (z - 1) * of_real ((1 - t) ^ n))
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2793	has_integral (fact n / pochhammer z (n+1))) {0..1}"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2794	if "Re z > 0" for n z using that
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2795	proof (induction n arbitrary: z)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2796	case 0
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2797	have "((\<lambda>t. complex_of_real t powr (z - 1)) has_integral
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2798	(of_real 1 powr z / z - of_real 0 powr z / z)) {0..1}" using 0
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2799	by (intro fundamental_theorem_of_calculus_interior)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2800	(auto intro!: continuous_intros derivative_eq_intros has_vector_derivative_real_complex)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2801	thus ?case by simp
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2802	next
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2803	case (Suc n)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2804	let ?f = "\<lambda>t. complex_of_real t powr z / z"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2805	let ?f' = "\<lambda>t. complex_of_real t powr (z - 1)"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2806	let ?g = "\<lambda>t. (1 - complex_of_real t) ^ Suc n"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2807	let ?g' = "\<lambda>t. - ((1 - complex_of_real t) ^ n) * of_nat (Suc n)"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2808	have "((\<lambda>t. ?f' t * ?g t) has_integral
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2809	(of_nat (Suc n)) * fact n / pochhammer z (n+2)) {0..1}"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2810	(is "(_ has_integral ?I) _")
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2811	proof (rule integration_by_parts_interior[where f' = ?f' and g = ?g])
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2812	from Suc.prems show "continuous_on {0..1} ?f" "continuous_on {0..1} ?g"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2813	by (auto intro!: continuous_intros)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2814	next
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2815	fix t :: real assume t: "t \<in> {0<..<1}"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2816	show "(?f has_vector_derivative ?f' t) (at t)" using t Suc.prems
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2817	by (auto intro!: derivative_eq_intros has_vector_derivative_real_complex)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2818	show "(?g has_vector_derivative ?g' t) (at t)"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2819	by (rule has_vector_derivative_real_complex derivative_eq_intros refl)+ simp_all
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2820	next
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2821	from Suc.prems have [simp]: "z \<noteq> 0" by auto
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2822	from Suc.prems have A: "Re (z + of_nat n) > 0" for n by simp
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2823	have [simp]: "z + of_nat n \<noteq> 0" "z + 1 + of_nat n \<noteq> 0" for n
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2824	using A[of n] A[of "Suc n"] by (auto simp add: add.assoc simp del: plus_complex.sel)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2825	have "((\<lambda>x. of_real x powr z * of_real ((1 - x) ^ n) * (- of_nat (Suc n) / z)) has_integral
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2826	fact n / pochhammer (z+1) (n+1) * (- of_nat (Suc n) / z)) {0..1}"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2827	(is "(?A has_integral ?B) _")
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2828	using Suc.IH[of "z+1"] Suc.prems by (intro has_integral_mult_left) (simp_all add: add_ac pochhammer_rec)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2829	also have "?A = (\<lambda>t. ?f t * ?g' t)" by (intro ext) (simp_all add: field_simps)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2830	also have "?B = - (of_nat (Suc n) * fact n / pochhammer z (n+2))"
63417 c184ec919c70 more lemmas to emphasize {0::nat..(<)n} as canonical representation of intervals on nat haftmann parents: 63367 diff changeset	2831	by (simp add: divide_simps pochhammer_rec
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	2832	prod_shift_bounds_cl_Suc_ivl del: of_nat_Suc)
63296 3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2833	finally show "((\<lambda>t. ?f t * ?g' t) has_integral (?f 1 * ?g 1 - ?f 0 * ?g 0 - ?I)) {0..1}"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2834	by simp
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2835	qed (simp_all add: bounded_bilinear_mult)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2836	thus ?case by simp
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2837	qed
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2838
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2839	have B: "((\<lambda>t. if t \<in> {0..of_nat n} then
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2840	of_real t powr (z - 1) * (1 - of_real t / of_nat n) ^ n else 0)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2841	has_integral (of_nat n powr z * fact n / pochhammer z (n+1))) {0..}" for n
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2842	proof (cases "n > 0")
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2843	case [simp]: True
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2844	hence [simp]: "n \<noteq> 0" by auto
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2845	with has_integral_affinity01[OF A[OF z, of n], of "inverse (of_nat n)" 0]
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2846	have "((\<lambda>x. (of_nat n - of_real x) ^ n * (of_real x / of_nat n) powr (z - 1) / of_nat n ^ n)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2847	has_integral fact n * of_nat n / pochhammer z (n+1)) ((\<lambda>x. real n * x)`{0..1})"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2848	(is "(?f has_integral ?I) ?ivl") by (simp add: field_simps scaleR_conv_of_real)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2849	also from True have "((\<lambda>x. real n*x)`{0..1}) = {0..real n}"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2850	by (subst image_mult_atLeastAtMost) simp_all
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2851	also have "?f = (\<lambda>x. (of_real x / of_nat n) powr (z - 1) * (1 - of_real x / of_nat n) ^ n)"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2852	using True by (intro ext) (simp add: field_simps)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2853	finally have "((\<lambda>x. (of_real x / of_nat n) powr (z - 1) * (1 - of_real x / of_nat n) ^ n)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2854	has_integral ?I) {0..real n}" (is ?P) .
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2855	also have "?P \<longleftrightarrow> ((\<lambda>x. exp ((z - 1) * of_real (ln (x / of_nat n))) * (1 - of_real x / of_nat n) ^ n)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2856	has_integral ?I) {0..real n}"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2857	by (intro has_integral_spike_finite_eq[of "{0}"]) (auto simp: powr_def Ln_of_real [symmetric])
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2858	also have "\<dots> \<longleftrightarrow> ((\<lambda>x. exp ((z - 1) * of_real (ln x - ln (of_nat n))) * (1 - of_real x / of_nat n) ^ n)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2859	has_integral ?I) {0..real n}"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2860	by (intro has_integral_spike_finite_eq[of "{0}"]) (simp_all add: ln_div)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2861	finally have \<dots> .
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2862	note B = has_integral_mult_right[OF this, of "exp ((z - 1) * ln (of_nat n))"]
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2863	have "((\<lambda>x. exp ((z - 1) * of_real (ln x)) * (1 - of_real x / of_nat n) ^ n)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2864	has_integral (?I * exp ((z - 1) * ln (of_nat n)))) {0..real n}" (is ?P)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2865	by (insert B, subst (asm) mult.assoc [symmetric], subst (asm) exp_add [symmetric])
66936 cf8d8fc23891 tuned some proofs and added some lemmas haftmann parents: 66526 diff changeset	2866	(simp add: algebra_simps)
63296 3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2867	also have "?P \<longleftrightarrow> ((\<lambda>x. of_real x powr (z - 1) * (1 - of_real x / of_nat n) ^ n)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2868	has_integral (?I * exp ((z - 1) * ln (of_nat n)))) {0..real n}"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2869	by (intro has_integral_spike_finite_eq[of "{0}"]) (simp_all add: powr_def Ln_of_real)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2870	also have "fact n * of_nat n / pochhammer z (n+1) * exp ((z - 1) * Ln (of_nat n)) =
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2871	(of_nat n powr z * fact n / pochhammer z (n+1))"
65587 16a8991ab398 New material (and some tidying) purely in the Analysis directory paulson <lp15@cam.ac.uk> parents: 65578 diff changeset	2872	by (auto simp add: powr_def algebra_simps exp_diff exp_of_real)
63296 3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2873	finally show ?thesis by (subst has_integral_restrict) simp_all
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2874	next
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2875	case False
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2876	thus ?thesis by (subst has_integral_restrict) (simp_all add: has_integral_refl)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2877	qed
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2878
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2879	have "eventually (\<lambda>n. Gamma_series z n =
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2880	of_nat n powr z * fact n / pochhammer z (n+1)) sequentially"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2881	using eventually_gt_at_top[of "0::nat"]
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2882	by eventually_elim (simp add: powr_def algebra_simps Ln_of_nat Gamma_series_def)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2883	from this and Gamma_series_LIMSEQ[of z]
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2884	have C: "(\<lambda>k. of_nat k powr z * fact k / pochhammer z (k+1)) \<longlonglongrightarrow> Gamma z"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2885	by (rule Lim_transform_eventually)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2886
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2887	{
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2888	fix x :: real assume x: "x \<ge> 0"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2889	have lim_exp: "(\<lambda>k. (1 - x / real k) ^ k) \<longlonglongrightarrow> exp (-x)"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2890	using tendsto_exp_limit_sequentially[of "-x"] by simp
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2891	have "(\<lambda>k. of_real x powr (z - 1) * of_real ((1 - x / of_nat k) ^ k))
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2892	\<longlonglongrightarrow> of_real x powr (z - 1) * of_real (exp (-x))" (is ?P)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2893	by (intro tendsto_intros lim_exp)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2894	also from eventually_gt_at_top[of "nat \<lceil>x\<rceil>"]
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2895	have "eventually (\<lambda>k. of_nat k > x) sequentially" by eventually_elim linarith
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2896	hence "?P \<longleftrightarrow> (\<lambda>k. if x \<le> of_nat k then
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2897	of_real x powr (z - 1) * of_real ((1 - x / of_nat k) ^ k) else 0)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2898	\<longlonglongrightarrow> of_real x powr (z - 1) * of_real (exp (-x))"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2899	by (intro tendsto_cong) (auto elim!: eventually_mono)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2900	finally have \<dots> .
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2901	}
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2902	hence D: "\<forall>x\<in>{0..}. (\<lambda>k. if x \<in> {0..real k} then
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2903	of_real x powr (z - 1) * (1 - of_real x / of_nat k) ^ k else 0)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2904	\<longlonglongrightarrow> of_real x powr (z - 1) / of_real (exp x)"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2905	by (simp add: exp_minus field_simps cong: if_cong)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2906
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2907	have "((\<lambda>x. (Re z - 1) * (ln x / x)) \<longlongrightarrow> (Re z - 1) * 0) at_top"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2908	by (intro tendsto_intros ln_x_over_x_tendsto_0)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2909	hence "((\<lambda>x. ((Re z - 1) * ln x) / x) \<longlongrightarrow> 0) at_top" by simp
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2910	from order_tendstoD(2)[OF this, of "1/2"]
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2911	have "eventually (\<lambda>x. (Re z - 1) * ln x / x < 1/2) at_top" by simp
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2912	from eventually_conj[OF this eventually_gt_at_top[of 0]]
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2913	obtain x0 where "\<forall>x\<ge>x0. (Re z - 1) * ln x / x < 1/2 \<and> x > 0"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2914	by (auto simp: eventually_at_top_linorder)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2915	hence x0: "x0 > 0" "\<And>x. x \<ge> x0 \<Longrightarrow> (Re z - 1) * ln x < x / 2" by auto
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2916
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2917	define h where "h = (\<lambda>x. if x \<in> {0..x0} then x powr (Re z - 1) else exp (-x/2))"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2918	have le_h: "x powr (Re z - 1) * exp (-x) \<le> h x" if x: "x \<ge> 0" for x
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2919	proof (cases "x > x0")
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2920	case True
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2921	from True x0(1) have "x powr (Re z - 1) * exp (-x) = exp ((Re z - 1) * ln x - x)"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2922	by (simp add: powr_def exp_diff exp_minus field_simps exp_add)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2923	also from x0(2)[of x] True have "\<dots> < exp (-x/2)"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2924	by (simp add: field_simps)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2925	finally show ?thesis using True by (auto simp add: h_def)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2926	next
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2927	case False
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2928	from x have "x powr (Re z - 1) * exp (- x) \<le> x powr (Re z - 1) * 1"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2929	by (intro mult_left_mono) simp_all
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2930	with False show ?thesis by (auto simp add: h_def)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2931	qed
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2932
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2933	have E: "\<forall>x\<in>{0..}. cmod (if x \<in> {0..real k} then of_real x powr (z - 1) *
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2934	(1 - complex_of_real x / of_nat k) ^ k else 0) \<le> h x"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2935	(is "\<forall>x\<in>_. ?f x \<le> _") for k
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2936	proof safe
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2937	fix x :: real assume x: "x \<ge> 0"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2938	{
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2939	fix x :: real and n :: nat assume x: "x \<le> of_nat n"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2940	have "(1 - complex_of_real x / of_nat n) = complex_of_real ((1 - x / of_nat n))" by simp
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2941	also have "norm \<dots> = \<bar>(1 - x / real n)\<bar>" by (subst norm_of_real) (rule refl)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2942	also from x have "\<dots> = (1 - x / real n)" by (intro abs_of_nonneg) (simp_all add: divide_simps)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2943	finally have "cmod (1 - complex_of_real x / of_nat n) = 1 - x / real n" .
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2944	} note D = this
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2945	from D[of x k] x
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2946	have "?f x \<le> (if of_nat k \<ge> x \<and> k > 0 then x powr (Re z - 1) * (1 - x / real k) ^ k else 0)"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2947	by (auto simp: norm_mult norm_powr_real_powr norm_power intro!: mult_nonneg_nonneg)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2948	also have "\<dots> \<le> x powr (Re z - 1) * exp (-x)"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2949	by (auto intro!: mult_left_mono exp_ge_one_minus_x_over_n_power_n)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2950	also from x have "\<dots> \<le> h x" by (rule le_h)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2951	finally show "?f x \<le> h x" .
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2952	qed
63594 bd218a9320b5 HOL-Multivariate_Analysis: rename theories for more descriptive names hoelzl parents: 63539 diff changeset	2953
63296 3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2954	have F: "h integrable_on {0..}" unfolding h_def
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2955	by (rule integrable_Gamma_integral_bound) (insert assms x0(1), simp_all)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2956	show ?thesis
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2957	by (rule has_integral_dominated_convergence[OF B F E D C])
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2958	qed
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2959
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2960	lemma Gamma_integral_real:
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2961	assumes x: "x > (0 :: real)"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2962	shows "((\<lambda>t. t powr (x - 1) / exp t) has_integral Gamma x) {0..}"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2963	proof -
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2964	have A: "((\<lambda>t. complex_of_real t powr (complex_of_real x - 1) /
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2965	complex_of_real (exp t)) has_integral complex_of_real (Gamma x)) {0..}"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2966	using Gamma_integral_complex[of x] assms by (simp_all add: Gamma_complex_of_real powr_of_real)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2967	have "((\<lambda>t. complex_of_real (t powr (x - 1) / exp t)) has_integral of_real (Gamma x)) {0..}"
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2968	by (rule has_integral_eq[OF _ A]) (simp_all add: powr_of_real [symmetric])
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2969	from has_integral_linear[OF this bounded_linear_Re] show ?thesis by (simp add: o_def)
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2970	qed
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	2971
66526 322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2972	lemma absolutely_integrable_Gamma_integral':
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2973	assumes "Re z > 0"
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2974	shows "(\<lambda>t. complex_of_real t powr (z - 1) / of_real (exp t)) absolutely_integrable_on {0<..}"
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2975	using absolutely_integrable_Gamma_integral [OF assms zero_less_one] by simp
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2976
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2977	lemma Gamma_integral_complex':
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2978	assumes z: "Re z > 0"
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2979	shows "((\<lambda>t. of_real t powr (z - 1) / of_real (exp t)) has_integral Gamma z) {0<..}"
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2980	proof -
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2981	have "((\<lambda>t. of_real t powr (z - 1) / of_real (exp t)) has_integral Gamma z) {0..}"
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2982	by (rule Gamma_integral_complex) fact+
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2983	hence "((\<lambda>t. if t \<in> {0<..} then of_real t powr (z - 1) / of_real (exp t) else 0)
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2984	has_integral Gamma z) {0..}"
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2985	by (rule has_integral_spike [of "{0}", rotated 2]) auto
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2986	also have "?this = ?thesis"
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2987	by (subst has_integral_restrict) auto
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2988	finally show ?thesis .
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2989	qed
322120e880c5 More material on infinite sums eberlm <eberlm@in.tum.de> parents: 66512 diff changeset	2990
67278 c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	2991	lemma Gamma_conv_nn_integral_real:
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	2992	assumes "s > (0::real)"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	2993	shows "Gamma s = nn_integral lborel (\<lambda>t. ennreal (indicator {0..} t * t powr (s - 1) / exp t))"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	2994	using nn_integral_has_integral_lebesgue[OF _ Gamma_integral_real[OF assms]] by simp
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	2995
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	2996	lemma integrable_Beta:
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	2997	assumes "a > 0" "b > (0::real)"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	2998	shows "set_integrable lborel {0..1} (\<lambda>t. t powr (a - 1) * (1 - t) powr (b - 1))"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	2999	proof -
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3000	define C where "C = max 1 ((1/2) powr (b - 1))"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3001	define D where "D = max 1 ((1/2) powr (a - 1))"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3002	have C: "(1 - x) powr (b - 1) \<le> C" if "x \<in> {0..1/2}" for x
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3003	proof (cases "b < 1")
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3004	case False
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3005	with that have "(1 - x) powr (b - 1) \<le> (1 powr (b - 1))" by (intro powr_mono2) auto
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3006	thus ?thesis by (auto simp: C_def)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3007	qed (insert that, auto simp: max.coboundedI1 max.coboundedI2 powr_mono2' powr_mono2 C_def)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3008	have D: "x powr (a - 1) \<le> D" if "x \<in> {1/2..1}" for x
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3009	proof (cases "a < 1")
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3010	case False
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3011	with that have "x powr (a - 1) \<le> (1 powr (a - 1))" by (intro powr_mono2) auto
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3012	thus ?thesis by (auto simp: D_def)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3013	next
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3014	case True
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3015	qed (insert that, auto simp: max.coboundedI1 max.coboundedI2 powr_mono2' powr_mono2 D_def)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3016	have [simp]: "C \<ge> 0" "D \<ge> 0" by (simp_all add: C_def D_def)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3017
67976 75b94eb58c3d Analysis builds using set_borel_measurable_def, etc. paulson <lp15@cam.ac.uk> parents: 67399 diff changeset	3018	have I1: "set_integrable lborel {0..1/2} (\<lambda>t. t powr (a - 1) * (1 - t) powr (b - 1))"
75b94eb58c3d Analysis builds using set_borel_measurable_def, etc. paulson <lp15@cam.ac.uk> parents: 67399 diff changeset	3019	unfolding set_integrable_def
67278 c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3020	proof (rule Bochner_Integration.integrable_bound[OF _ _ AE_I2])
67976 75b94eb58c3d Analysis builds using set_borel_measurable_def, etc. paulson <lp15@cam.ac.uk> parents: 67399 diff changeset	3021	have "(\<lambda>t. t powr (a - 1)) integrable_on {0..1/2}"
67278 c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3022	by (rule integrable_on_powr_from_0) (use assms in auto)
67976 75b94eb58c3d Analysis builds using set_borel_measurable_def, etc. paulson <lp15@cam.ac.uk> parents: 67399 diff changeset	3023	hence "(\<lambda>t. t powr (a - 1)) absolutely_integrable_on {0..1/2}"
67278 c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3024	by (subst absolutely_integrable_on_iff_nonneg) auto
67976 75b94eb58c3d Analysis builds using set_borel_measurable_def, etc. paulson <lp15@cam.ac.uk> parents: 67399 diff changeset	3025	from integrable_mult_right[OF this [unfolded set_integrable_def], of C]
75b94eb58c3d Analysis builds using set_borel_measurable_def, etc. paulson <lp15@cam.ac.uk> parents: 67399 diff changeset	3026	show "integrable lborel (\<lambda>x. indicat_real {0..1/2} x \<^sub>R (C x powr (a - 1)))"
67278 c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3027	by (subst (asm) integrable_completion) (auto simp: mult_ac)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3028	next
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3029	fix x :: real
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3030	have "x powr (a - 1) * (1 - x) powr (b - 1) \<le> x powr (a - 1) * C" if "x \<in> {0..1/2}"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3031	using that by (intro mult_left_mono powr_mono2 C) auto
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3032	thus "norm (indicator {0..1/2} x \<^sub>R (x powr (a - 1) (1 - x) powr (b - 1))) \<le>
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3033	norm (indicator {0..1/2} x \<^sub>R (C x powr (a - 1)))"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3034	by (auto simp: indicator_def abs_mult mult_ac)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3035	qed (auto intro!: AE_I2 simp: indicator_def)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3036
67976 75b94eb58c3d Analysis builds using set_borel_measurable_def, etc. paulson <lp15@cam.ac.uk> parents: 67399 diff changeset	3037	have I2: "set_integrable lborel {1/2..1} (\<lambda>t. t powr (a - 1) * (1 - t) powr (b - 1))"
75b94eb58c3d Analysis builds using set_borel_measurable_def, etc. paulson <lp15@cam.ac.uk> parents: 67399 diff changeset	3038	unfolding set_integrable_def
67278 c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3039	proof (rule Bochner_Integration.integrable_bound[OF _ _ AE_I2])
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3040	have "(\<lambda>t. t powr (b - 1)) integrable_on {0..1/2}"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3041	by (rule integrable_on_powr_from_0) (use assms in auto)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3042	hence "(\<lambda>t. t powr (b - 1)) integrable_on (cbox 0 (1/2))" by simp
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3043	from integrable_affinity[OF this, of "-1" 1]
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3044	have "(\<lambda>t. (1 - t) powr (b - 1)) integrable_on {1/2..1}" by simp
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3045	hence "(\<lambda>t. (1 - t) powr (b - 1)) absolutely_integrable_on {1/2..1}"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3046	by (subst absolutely_integrable_on_iff_nonneg) auto
67976 75b94eb58c3d Analysis builds using set_borel_measurable_def, etc. paulson <lp15@cam.ac.uk> parents: 67399 diff changeset	3047	from integrable_mult_right[OF this [unfolded set_integrable_def], of D]
75b94eb58c3d Analysis builds using set_borel_measurable_def, etc. paulson <lp15@cam.ac.uk> parents: 67399 diff changeset	3048	show "integrable lborel (\<lambda>x. indicat_real {1/2..1} x \<^sub>R (D (1 - x) powr (b - 1)))"
67278 c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3049	by (subst (asm) integrable_completion) (auto simp: mult_ac)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3050	next
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3051	fix x :: real
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3052	have "x powr (a - 1) * (1 - x) powr (b - 1) \<le> D * (1 - x) powr (b - 1)" if "x \<in> {1/2..1}"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3053	using that by (intro mult_right_mono powr_mono2 D) auto
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3054	thus "norm (indicator {1/2..1} x \<^sub>R (x powr (a - 1) (1 - x) powr (b - 1))) \<le>
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3055	norm (indicator {1/2..1} x \<^sub>R (D (1 - x) powr (b - 1)))"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3056	by (auto simp: indicator_def abs_mult mult_ac)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3057	qed (auto intro!: AE_I2 simp: indicator_def)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3058
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3059	have "set_integrable lborel ({0..1/2} \<union> {1/2..1}) (\<lambda>t. t powr (a - 1) * (1 - t) powr (b - 1))"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3060	by (intro set_integrable_Un I1 I2) auto
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3061	also have "{0..1/2} \<union> {1/2..1} = {0..(1::real)}" by auto
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3062	finally show ?thesis .
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3063	qed
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3064
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3065	lemma integrable_Beta':
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3066	assumes "a > 0" "b > (0::real)"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3067	shows "(\<lambda>t. t powr (a - 1) * (1 - t) powr (b - 1)) integrable_on {0..1}"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3068	using integrable_Beta[OF assms] by (rule set_borel_integral_eq_integral)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3069
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3070	lemma has_integral_Beta_real:
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3071	assumes a: "a > 0" and b: "b > (0 :: real)"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3072	shows "((\<lambda>t. t powr (a - 1) * (1 - t) powr (b - 1)) has_integral Beta a b) {0..1}"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3073	proof -
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3074	define B where "B = integral {0..1} (\<lambda>x. x powr (a - 1) * (1 - x) powr (b - 1))"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3075	have [simp]: "B \<ge> 0" unfolding B_def using a b
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3076	by (intro integral_nonneg integrable_Beta') auto
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3077	from a b have "ennreal (Gamma a * Gamma b) =
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3078	(\<integral>\<^sup>+ t. ennreal (indicator {0..} t * t powr (a - 1) / exp t) \<partial>lborel) *
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3079	(\<integral>\<^sup>+ t. ennreal (indicator {0..} t * t powr (b - 1) / exp t) \<partial>lborel)"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3080	by (subst ennreal_mult') (simp_all add: Gamma_conv_nn_integral_real)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3081	also have "\<dots> = (\<integral>\<^sup>+t. \<integral>\<^sup>+u. ennreal (indicator {0..} t * t powr (a - 1) / exp t) *
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3082	ennreal (indicator {0..} u * u powr (b - 1) / exp u) \<partial>lborel \<partial>lborel)"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3083	by (simp add: nn_integral_cmult nn_integral_multc)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3084	also have "\<dots> = (\<integral>\<^sup>+t. \<integral>\<^sup>+u. ennreal (indicator ({0..}\<times>{0..}) (t,u) * t powr (a - 1) * u powr (b - 1)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3085	/ exp (t + u)) \<partial>lborel \<partial>lborel)"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3086	by (intro nn_integral_cong)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3087	(auto simp: indicator_def divide_ennreal ennreal_mult' [symmetric] exp_add)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3088	also have "\<dots> = (\<integral>\<^sup>+t. \<integral>\<^sup>+u. ennreal (indicator ({0..}\<times>{t..}) (t,u) * t powr (a - 1) *
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3089	(u - t) powr (b - 1) / exp u) \<partial>lborel \<partial>lborel)"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3090	proof (rule nn_integral_cong, goal_cases)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3091	case (1 t)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3092	have "(\<integral>\<^sup>+u. ennreal (indicator ({0..}\<times>{0..}) (t,u) * t powr (a - 1) *
67399 eab6ce8368fa ran isabelle update_op on all sources nipkow parents: 67278 diff changeset	3093	u powr (b - 1) / exp (t + u)) \<partial>distr lborel borel ((+) (-t))) =
67278 c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3094	(\<integral>\<^sup>+u. ennreal (indicator ({0..}\<times>{t..}) (t,u) * t powr (a - 1) *
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3095	(u - t) powr (b - 1) / exp u) \<partial>lborel)"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3096	by (subst nn_integral_distr) (auto intro!: nn_integral_cong simp: indicator_def)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3097	thus ?case by (subst (asm) lborel_distr_plus)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3098	qed
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3099	also have "\<dots> = (\<integral>\<^sup>+u. \<integral>\<^sup>+t. ennreal (indicator ({0..}\<times>{t..}) (t,u) * t powr (a - 1) *
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3100	(u - t) powr (b - 1) / exp u) \<partial>lborel \<partial>lborel)"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3101	by (subst lborel_pair.Fubini')
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3102	(auto simp: case_prod_unfold indicator_def cong: measurable_cong_sets)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3103	also have "\<dots> = (\<integral>\<^sup>+u. \<integral>\<^sup>+t. ennreal (indicator {0..u} t * t powr (a - 1) * (u - t) powr (b - 1)) *
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3104	ennreal (indicator {0..} u / exp u) \<partial>lborel \<partial>lborel)"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3105	by (intro nn_integral_cong) (auto simp: indicator_def ennreal_mult' [symmetric])
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3106	also have "\<dots> = (\<integral>\<^sup>+u. (\<integral>\<^sup>+t. ennreal (indicator {0..u} t * t powr (a - 1) * (u - t) powr (b - 1))
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3107	\<partial>lborel) * ennreal (indicator {0..} u / exp u) \<partial>lborel)"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3108	by (subst nn_integral_multc [symmetric]) auto
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3109	also have "\<dots> = (\<integral>\<^sup>+u. (\<integral>\<^sup>+t. ennreal (indicator {0..u} t * t powr (a - 1) * (u - t) powr (b - 1))
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3110	\<partial>lborel) * ennreal (indicator {0<..} u / exp u) \<partial>lborel)"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3111	by (intro nn_integral_cong_AE eventually_mono[OF AE_lborel_singleton[of 0]])
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3112	(auto simp: indicator_def)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3113	also have "\<dots> = (\<integral>\<^sup>+u. ennreal B * ennreal (indicator {0..} u / exp u * u powr (a + b - 1)) \<partial>lborel)"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3114	proof (intro nn_integral_cong, goal_cases)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3115	case (1 u)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3116	show ?case
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3117	proof (cases "u > 0")
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3118	case True
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3119	have "(\<integral>\<^sup>+t. ennreal (indicator {0..u} t * t powr (a - 1) * (u - t) powr (b - 1)) \<partial>lborel) =
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3120	(\<integral>\<^sup>+t. ennreal (indicator {0..1} t * (u * t) powr (a - 1) * (u - u * t) powr (b - 1))
67399 eab6ce8368fa ran isabelle update_op on all sources nipkow parents: 67278 diff changeset	3121	\<partial>distr lborel borel (( * ) (1 / u)))" (is "_ = nn_integral _ ?f")
67278 c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3122	using True
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3123	by (subst nn_integral_distr) (auto simp: indicator_def field_simps intro!: nn_integral_cong)
67399 eab6ce8368fa ran isabelle update_op on all sources nipkow parents: 67278 diff changeset	3124	also have "distr lborel borel (( * ) (1 / u)) = density lborel (\<lambda>_. u)"
67278 c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3125	using \<open>u > 0\<close> by (subst lborel_distr_mult) auto
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3126	also have "nn_integral \<dots> ?f = (\<integral>\<^sup>+x. ennreal (indicator {0..1} x * (u * (u * x) powr (a - 1) *
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3127	(u * (1 - x)) powr (b - 1))) \<partial>lborel)" using \<open>u > 0\<close>
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3128	by (subst nn_integral_density) (auto simp: ennreal_mult' [symmetric] algebra_simps)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3129	also have "\<dots> = (\<integral>\<^sup>+x. ennreal (u powr (a + b - 1)) *
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3130	ennreal (indicator {0..1} x * x powr (a - 1) *
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3131	(1 - x) powr (b - 1)) \<partial>lborel)" using \<open>u > 0\<close> a b
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3132	by (intro nn_integral_cong)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3133	(auto simp: indicator_def powr_mult powr_add powr_diff mult_ac ennreal_mult' [symmetric])
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3134	also have "\<dots> = ennreal (u powr (a + b - 1)) *
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3135	(\<integral>\<^sup>+x. ennreal (indicator {0..1} x * x powr (a - 1) *
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3136	(1 - x) powr (b - 1)) \<partial>lborel)"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3137	by (subst nn_integral_cmult) auto
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3138	also have "((\<lambda>x. x powr (a - 1) * (1 - x) powr (b - 1)) has_integral
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3139	integral {0..1} (\<lambda>x. x powr (a - 1) * (1 - x) powr (b - 1))) {0..1}"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3140	using a b by (intro integrable_integral integrable_Beta')
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3141	from nn_integral_has_integral_lebesgue[OF _ this] a b
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3142	have "(\<integral>\<^sup>+x. ennreal (indicator {0..1} x * x powr (a - 1) *
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3143	(1 - x) powr (b - 1)) \<partial>lborel) = B" by (simp add: mult_ac B_def)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3144	finally show ?thesis using \<open>u > 0\<close> by (simp add: ennreal_mult' [symmetric] mult_ac)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3145	qed auto
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3146	qed
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3147	also have "\<dots> = ennreal B * ennreal (Gamma (a + b))"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3148	using a b by (subst nn_integral_cmult) (auto simp: Gamma_conv_nn_integral_real)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3149	also have "\<dots> = ennreal (B * Gamma (a + b))"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3150	by (subst (1 2) mult.commute, intro ennreal_mult' [symmetric]) (use a b in auto)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3151	finally have "B = Beta a b" using a b Gamma_real_pos[of "a + b"]
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3152	by (subst (asm) ennreal_inj) (auto simp: field_simps Beta_def Gamma_eq_zero_iff)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3153	moreover have "(\<lambda>t. t powr (a - 1) * (1 - t) powr (b - 1)) integrable_on {0..1}"
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3154	by (intro integrable_Beta' a b)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3155	ultimately show ?thesis by (simp add: has_integral_iff B_def)
c60e3d615b8c Removed Analysis/ex/Circle_Area; replaced by more general Analysis/Ball_Volume eberlm <eberlm@in.tum.de> parents: 66936 diff changeset	3156	qed
63296 3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	3157
3951a15a05d1 Integral form of Gamma function eberlm parents: 63295 diff changeset	3158
62085 5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	3159	subsection \<open>The Weierstraß product formula for the sine\<close>
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	3160
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3161	lemma sin_product_formula_complex:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3162	fixes z :: complex
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3163	shows "(\<lambda>n. of_real pi * z * (\<Prod>k=1..n. 1 - z^2 / of_nat k^2)) \<longlonglongrightarrow> sin (of_real pi * z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3164	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3165	let ?f = "rGamma_series_weierstrass"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3166	have "(\<lambda>n. (- of_real pi * inverse z) * (?f z n * ?f (- z) n))
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3167	\<longlonglongrightarrow> (- of_real pi * inverse z) * (rGamma z * rGamma (- z))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3168	by (intro tendsto_intros rGamma_weierstrass_complex)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3169	also have "(\<lambda>n. (- of_real pi * inverse z) * (?f z n * ?f (-z) n)) =
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3170	(\<lambda>n. of_real pi * z * (\<Prod>k=1..n. 1 - z^2 / of_nat k ^ 2))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3171	proof
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3172	fix n :: nat
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	3173	have "(- of_real pi * inverse z) * (?f z n * ?f (-z) n) =
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3174	of_real pi * z * (\<Prod>k=1..n. (of_nat k - z) * (of_nat k + z) / of_nat k ^ 2)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3175	by (simp add: rGamma_series_weierstrass_def mult_ac exp_minus
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	3176	divide_simps prod.distrib[symmetric] power2_eq_square)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3177	also have "(\<Prod>k=1..n. (of_nat k - z) * (of_nat k + z) / of_nat k ^ 2) =
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3178	(\<Prod>k=1..n. 1 - z^2 / of_nat k ^ 2)"
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	3179	by (intro prod.cong) (simp_all add: power2_eq_square field_simps)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	3180	finally show "(- of_real pi * inverse z) * (?f z n * ?f (-z) n) = of_real pi * z * \<dots>"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3181	by (simp add: divide_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3182	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3183	also have "(- of_real pi * inverse z) * (rGamma z * rGamma (- z)) = sin (of_real pi * z)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3184	by (subst rGamma_reflection_complex') (simp add: divide_simps)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3185	finally show ?thesis .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3186	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3187
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3188	lemma sin_product_formula_real:
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3189	"(\<lambda>n. pi * (x::real) * (\<Prod>k=1..n. 1 - x^2 / of_nat k^2)) \<longlonglongrightarrow> sin (pi * x)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3190	proof -
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3191	from sin_product_formula_complex[of "of_real x"]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3192	have "(\<lambda>n. of_real pi * of_real x * (\<Prod>k=1..n. 1 - (of_real x)^2 / (of_nat k)^2))
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3193	\<longlonglongrightarrow> sin (of_real pi * of_real x :: complex)" (is "?f \<longlonglongrightarrow> ?y") .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3194	also have "?f = (\<lambda>n. of_real (pi * x * (\<Prod>k=1..n. 1 - x^2 / (of_nat k^2))))" by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3195	also have "?y = of_real (sin (pi * x))" by (simp only: sin_of_real [symmetric] of_real_mult)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3196	finally show ?thesis by (subst (asm) tendsto_of_real_iff)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3197	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3198
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3199	lemma sin_product_formula_real':
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3200	assumes "x \<noteq> (0::real)"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	3201	shows "(\<lambda>n. (\<Prod>k=1..n. 1 - x^2 / of_nat k^2)) \<longlonglongrightarrow> sin (pi * x) / (pi * x)"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3202	using tendsto_divide[OF sin_product_formula_real[of x] tendsto_const[of "pi * x"]] assms
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3203	by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3204
63721 492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	3205	theorem wallis: "(\<lambda>n. \<Prod>k=1..n. (4real k^2) / (4real k^2 - 1)) \<longlonglongrightarrow> pi / 2"
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	3206	proof -
66512 89b6455b63b6 starting to unscramble bounded_variation_absolutely_integrable_interval paulson <lp15@cam.ac.uk> parents: 66453 diff changeset	3207	from tendsto_inverse[OF tendsto_mult[OF
63721 492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	3208	sin_product_formula_real[of "1/2"] tendsto_const[of "2/pi"]]]
67976 75b94eb58c3d Analysis builds using set_borel_measurable_def, etc. paulson <lp15@cam.ac.uk> parents: 67399 diff changeset	3209	have "(\<lambda>n. (\<Prod>k=1..n. inverse (1 - (1/2)\<^sup>2 / (real k)\<^sup>2))) \<longlonglongrightarrow> pi/2"
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	3210	by (simp add: prod_inversef [symmetric])
67976 75b94eb58c3d Analysis builds using set_borel_measurable_def, etc. paulson <lp15@cam.ac.uk> parents: 67399 diff changeset	3211	also have "(\<lambda>n. (\<Prod>k=1..n. inverse (1 - (1/2)\<^sup>2 / (real k)\<^sup>2))) =
63721 492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	3212	(\<lambda>n. (\<Prod>k=1..n. (4real k^2)/(4real k^2 - 1)))"
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	3213	by (intro ext prod.cong refl) (simp add: divide_simps)
63721 492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	3214	finally show ?thesis .
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	3215	qed
492bb53c3420 More analysis lemmas Manuel Eberl <eberlm@in.tum.de> parents: 63627 diff changeset	3216
62085 5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	3217
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	3218	subsection \<open>The Solution to the Basel problem\<close>
5b7758af429e Tuned approximations in Multivariate_Analysis Manuel Eberl <eberlm@in.tum.de> parents: 62072 diff changeset	3219
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3220	theorem inverse_squares_sums: "(\<lambda>n. 1 / (n + 1)\<^sup>2) sums (pi\<^sup>2 / 6)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3221	proof -
63040 eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62534 diff changeset	3222	define P where "P x n = (\<Prod>k=1..n. 1 - x^2 / of_nat k^2)" for x :: real and n
eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62534 diff changeset	3223	define K where "K = (\<Sum>n. inverse (real_of_nat (Suc n))^2)"
eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62534 diff changeset	3224	define f where [abs_def]: "f x = (\<Sum>n. P x n / of_nat (Suc n)^2)" for x
eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62534 diff changeset	3225	define g where [abs_def]: "g x = (1 - sin (pi * x) / (pi * x))" for x
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	3226
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3227	have sums: "(\<lambda>n. P x n / of_nat (Suc n)^2) sums (if x = 0 then K else g x / x^2)" for x
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3228	proof (cases "x = 0")
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3229	assume x: "x = 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3230	have "summable (\<lambda>n. inverse ((real_of_nat (Suc n))\<^sup>2))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3231	using inverse_power_summable[of 2] by (subst summable_Suc_iff) simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3232	thus ?thesis by (simp add: x g_def P_def K_def inverse_eq_divide power_divide summable_sums)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3233	next
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3234	assume x: "x \<noteq> 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3235	have "(\<lambda>n. P x n - P x (Suc n)) sums (P x 0 - sin (pi * x) / (pi * x))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3236	unfolding P_def using x by (intro telescope_sums' sin_product_formula_real')
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3237	also have "(\<lambda>n. P x n - P x (Suc n)) = (\<lambda>n. (x^2 / of_nat (Suc n)^2) * P x n)"
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	3238	unfolding P_def by (simp add: prod_nat_ivl_Suc' algebra_simps)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3239	also have "P x 0 = 1" by (simp add: P_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3240	finally have "(\<lambda>n. x\<^sup>2 / (of_nat (Suc n))\<^sup>2 * P x n) sums (1 - sin (pi * x) / (pi * x))" .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3241	from sums_divide[OF this, of "x^2"] x show ?thesis unfolding g_def by simp
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3242	qed
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	3243
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3244	have "continuous_on (ball 0 1) f"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3245	proof (rule uniform_limit_theorem; (intro always_eventually allI)?)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3246	show "uniform_limit (ball 0 1) (\<lambda>n x. \<Sum>k<n. P x k / of_nat (Suc k)^2) f sequentially"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3247	proof (unfold f_def, rule weierstrass_m_test)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3248	fix n :: nat and x :: real assume x: "x \<in> ball 0 1"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3249	{
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3250	fix k :: nat assume k: "k \<ge> 1"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3251	from x have "x^2 < 1" by (auto simp: dist_0_norm abs_square_less_1)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3252	also from k have "\<dots> \<le> of_nat k^2" by simp
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	3253	finally have "(1 - x^2 / of_nat k^2) \<in> {0..1}" using k
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3254	by (simp_all add: field_simps del: of_nat_Suc)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3255	}
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	3256	hence "(\<Prod>k=1..n. abs (1 - x^2 / of_nat k^2)) \<le> (\<Prod>k=1..n. 1)" by (intro prod_mono) simp
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3257	thus "norm (P x n / (of_nat (Suc n)^2)) \<le> 1 / of_nat (Suc n)^2"
64272 f76b6dda2e56 setprod -> prod nipkow parents: 64267 diff changeset	3258	unfolding P_def by (simp add: field_simps abs_prod del: of_nat_Suc)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3259	qed (subst summable_Suc_iff, insert inverse_power_summable[of 2], simp add: inverse_eq_divide)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3260	qed (auto simp: P_def intro!: continuous_intros)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3261	hence "isCont f 0" by (subst (asm) continuous_on_eq_continuous_at) simp_all
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3262	hence "(f \<midarrow> 0 \<rightarrow> f 0)" by (simp add: isCont_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3263	also have "f 0 = K" unfolding f_def P_def K_def by (simp add: inverse_eq_divide power_divide)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	3264	finally have "f \<midarrow> 0 \<rightarrow> K" .
1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	3265
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3266	moreover have "f \<midarrow> 0 \<rightarrow> pi^2 / 6"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3267	proof (rule Lim_transform_eventually)
63040 eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62534 diff changeset	3268	define f' where [abs_def]: "f' x = (\<Sum>n. - sin_coeff (n+3) * pi ^ (n+2) * x^n)" for x
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	3269	have "eventually (\<lambda>x. x \<noteq> (0::real)) (at 0)"
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3270	by (auto simp add: eventually_at intro!: exI[of _ 1])
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3271	thus "eventually (\<lambda>x. f' x = f x) (at 0)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3272	proof eventually_elim
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3273	fix x :: real assume x: "x \<noteq> 0"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3274	have "sin_coeff 1 = (1 :: real)" "sin_coeff 2 = (0::real)" by (simp_all add: sin_coeff_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3275	with sums_split_initial_segment[OF sums_minus[OF sin_converges], of 3 "pi*x"]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3276	have "(\<lambda>n. - (sin_coeff (n+3) * (pix)^(n+3))) sums (pi x - sin (pi*x))"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3277	by (simp add: eval_nat_numeral)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3278	from sums_divide[OF this, of "x^3 * pi"] x
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3279	have "(\<lambda>n. - (sin_coeff (n+3) * pi^(n+2) * x^n)) sums ((1 - sin (pix) / (pix)) / x^2)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3280	by (simp add: divide_simps eval_nat_numeral power_mult_distrib mult_ac)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3281	with x have "(\<lambda>n. - (sin_coeff (n+3) * pi^(n+2) * x^n)) sums (g x / x^2)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3282	by (simp add: g_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3283	hence "f' x = g x / x^2" by (simp add: sums_iff f'_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3284	also have "\<dots> = f x" using sums[of x] x by (simp add: sums_iff g_def f_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3285	finally show "f' x = f x" .
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3286	qed
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	3287
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3288	have "isCont f' 0" unfolding f'_def
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	3289	proof (intro isCont_powser_converges_everywhere)
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3290	fix x :: real show "summable (\<lambda>n. -sin_coeff (n+3) * pi^(n+2) * x^n)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3291	proof (cases "x = 0")
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3292	assume x: "x \<noteq> 0"
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	3293	from summable_divide[OF sums_summable[OF sums_split_initial_segment[OF
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3294	sin_converges[of "pix"]], of 3], of "-pix^3"] x
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3295	show ?thesis by (simp add: mult_ac power_mult_distrib divide_simps eval_nat_numeral)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3296	qed (simp only: summable_0_powser)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3297	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3298	hence "f' \<midarrow> 0 \<rightarrow> f' 0" by (simp add: isCont_def)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	3299	also have "f' 0 = pi * pi / fact 3" unfolding f'_def
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3300	by (subst powser_zero) (simp add: sin_coeff_def)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3301	finally show "f' \<midarrow> 0 \<rightarrow> pi^2 / 6" by (simp add: eval_nat_numeral)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3302	qed
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	3303
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3304	ultimately have "K = pi^2 / 6" by (rule LIM_unique)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3305	moreover from inverse_power_summable[of 2]
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3306	have "summable (\<lambda>n. (inverse (real_of_nat (Suc n)))\<^sup>2)"
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3307	by (subst summable_Suc_iff) (simp add: power_inverse)
62131 1baed43f453e nonneg_Reals, nonpos_Reals, Cauchy integral formula, etc. paulson parents: 62085 diff changeset	3308	ultimately show ?thesis unfolding K_def
62049 b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3309	by (auto simp add: sums_iff power_divide inverse_eq_divide)
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3310	qed
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3311
b0f941e207cf Added lots of material on infinite sums, convergence radii, harmonic numbers, Gamma function eberlm parents: diff changeset	3312	end

author	nipkow
	Wed, 06 Jun 2018 18:19:55 +0200
changeset 68403	223172b97d0b
parent 68224	1f7308050349
child 68624	205d352ed727
permissions	-rw-r--r--