isabelle: src/HOL/Library/FrechetDeriv.thy@9ff94e7cc3b3 (annotated)

21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	1	(* Title : FrechetDeriv.thy
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	2	Author : Brian Huffman
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	3	*)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	4
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	5	header {* Frechet Derivative *}
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	6
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	7	theory FrechetDeriv
30663 0b6aff7451b2 Main is (Complex_Main) base entry point in library theories haftmann parents: 30273 diff changeset	8	imports Lim Complex_Main
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	9	begin
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	10
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	11	definition
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	12	fderiv ::
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	13	"['a::real_normed_vector \<Rightarrow> 'b::real_normed_vector, 'a, 'a \<Rightarrow> 'b] \<Rightarrow> bool"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	14	-- {* Frechet derivative: D is derivative of function f at x *}
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	15	("(FDERIV (_)/ (_)/ :> (_))" [1000, 1000, 60] 60) where
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	16	"FDERIV f x :> D = (bounded_linear D \<and>
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	17	(\<lambda>h. norm (f (x + h) - f x - D h) / norm h) -- 0 --> 0)"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	18
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	19	lemma FDERIV_I:
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	20	"\<lbrakk>bounded_linear D; (\<lambda>h. norm (f (x + h) - f x - D h) / norm h) -- 0 --> 0\<rbrakk>
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	21	\<Longrightarrow> FDERIV f x :> D"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	22	by (simp add: fderiv_def)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	23
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	24	lemma FDERIV_D:
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	25	"FDERIV f x :> D \<Longrightarrow> (\<lambda>h. norm (f (x + h) - f x - D h) / norm h) -- 0 --> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	26	by (simp add: fderiv_def)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	27
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	28	lemma FDERIV_bounded_linear: "FDERIV f x :> D \<Longrightarrow> bounded_linear D"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	29	by (simp add: fderiv_def)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	30
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	31	lemma bounded_linear_zero:
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	32	"bounded_linear (\<lambda>x::'a::real_normed_vector. 0::'b::real_normed_vector)"
28823 dcbef866c9e2 tuned unfold_locales invocation haftmann parents: 27611 diff changeset	33	proof
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	34	show "(0::'b) = 0 + 0" by simp
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	35	fix r show "(0::'b) = scaleR r 0" by simp
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	36	have "\<forall>x::'a. norm (0::'b) \<le> norm x * 0" by simp
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	37	thus "\<exists>K. \<forall>x::'a. norm (0::'b) \<le> norm x * K" ..
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	38	qed
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	39
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	40	lemma FDERIV_const: "FDERIV (\<lambda>x. k) x :> (\<lambda>h. 0)"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	41	by (simp add: fderiv_def bounded_linear_zero)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	42
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	43	lemma bounded_linear_ident:
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	44	"bounded_linear (\<lambda>x::'a::real_normed_vector. x)"
28823 dcbef866c9e2 tuned unfold_locales invocation haftmann parents: 27611 diff changeset	45	proof
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	46	fix x y :: 'a show "x + y = x + y" by simp
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	47	fix r and x :: 'a show "scaleR r x = scaleR r x" by simp
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	48	have "\<forall>x::'a. norm x \<le> norm x * 1" by simp
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	49	thus "\<exists>K. \<forall>x::'a. norm x \<le> norm x * K" ..
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	50	qed
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	51
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	52	lemma FDERIV_ident: "FDERIV (\<lambda>x. x) x :> (\<lambda>h. h)"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	53	by (simp add: fderiv_def bounded_linear_ident)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	54
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	55	subsection {* Addition *}
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	56
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	57	lemma bounded_linear_add:
27611 2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	58	assumes "bounded_linear f"
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	59	assumes "bounded_linear g"
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	60	shows "bounded_linear (\<lambda>x. f x + g x)"
27611 2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	61	proof -
29233 ce6d35a0bed6 Ported HOL and HOL-Library to new locales. ballarin parents: 28952 diff changeset	62	interpret f: bounded_linear f by fact
ce6d35a0bed6 Ported HOL and HOL-Library to new locales. ballarin parents: 28952 diff changeset	63	interpret g: bounded_linear g by fact
27611 2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	64	show ?thesis apply (unfold_locales)
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	65	apply (simp only: f.add g.add add_ac)
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	66	apply (simp only: f.scaleR g.scaleR scaleR_right_distrib)
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	67	apply (rule f.pos_bounded [THEN exE], rename_tac Kf)
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	68	apply (rule g.pos_bounded [THEN exE], rename_tac Kg)
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	69	apply (rule_tac x="Kf + Kg" in exI, safe)
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	70	apply (subst right_distrib)
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	71	apply (rule order_trans [OF norm_triangle_ineq])
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	72	apply (rule add_mono, erule spec, erule spec)
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	73	done
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	74	qed
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	75
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	76	lemma norm_ratio_ineq:
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	77	fixes x y :: "'a::real_normed_vector"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	78	fixes h :: "'b::real_normed_vector"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	79	shows "norm (x + y) / norm h \<le> norm x / norm h + norm y / norm h"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	80	apply (rule ord_le_eq_trans)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	81	apply (rule divide_right_mono)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	82	apply (rule norm_triangle_ineq)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	83	apply (rule norm_ge_zero)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	84	apply (rule add_divide_distrib)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	85	done
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	86
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	87	lemma FDERIV_add:
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	88	assumes f: "FDERIV f x :> F"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	89	assumes g: "FDERIV g x :> G"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	90	shows "FDERIV (\<lambda>x. f x + g x) x :> (\<lambda>h. F h + G h)"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	91	proof (rule FDERIV_I)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	92	show "bounded_linear (\<lambda>h. F h + G h)"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	93	apply (rule bounded_linear_add)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	94	apply (rule FDERIV_bounded_linear [OF f])
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	95	apply (rule FDERIV_bounded_linear [OF g])
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	96	done
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	97	next
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	98	have f': "(\<lambda>h. norm (f (x + h) - f x - F h) / norm h) -- 0 --> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	99	using f by (rule FDERIV_D)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	100	have g': "(\<lambda>h. norm (g (x + h) - g x - G h) / norm h) -- 0 --> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	101	using g by (rule FDERIV_D)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	102	from f' g'
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	103	have "(\<lambda>h. norm (f (x + h) - f x - F h) / norm h
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	104	+ norm (g (x + h) - g x - G h) / norm h) -- 0 --> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	105	by (rule LIM_add_zero)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	106	thus "(\<lambda>h. norm (f (x + h) + g (x + h) - (f x + g x) - (F h + G h))
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	107	/ norm h) -- 0 --> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	108	apply (rule real_LIM_sandwich_zero)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	109	apply (simp add: divide_nonneg_pos)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	110	apply (simp only: add_diff_add)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	111	apply (rule norm_ratio_ineq)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	112	done
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	113	qed
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	114
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	115	subsection {* Subtraction *}
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	116
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	117	lemma bounded_linear_minus:
27611 2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	118	assumes "bounded_linear f"
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	119	shows "bounded_linear (\<lambda>x. - f x)"
27611 2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	120	proof -
29233 ce6d35a0bed6 Ported HOL and HOL-Library to new locales. ballarin parents: 28952 diff changeset	121	interpret f: bounded_linear f by fact
27611 2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	122	show ?thesis apply (unfold_locales)
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	123	apply (simp add: f.add)
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	124	apply (simp add: f.scaleR)
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	125	apply (simp add: f.bounded)
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	126	done
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	127	qed
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	128
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	129	lemma FDERIV_minus:
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	130	"FDERIV f x :> F \<Longrightarrow> FDERIV (\<lambda>x. - f x) x :> (\<lambda>h. - F h)"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	131	apply (rule FDERIV_I)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	132	apply (rule bounded_linear_minus)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	133	apply (erule FDERIV_bounded_linear)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	134	apply (simp only: fderiv_def minus_diff_minus norm_minus_cancel)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	135	done
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	136
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	137	lemma FDERIV_diff:
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	138	"\<lbrakk>FDERIV f x :> F; FDERIV g x :> G\<rbrakk>
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	139	\<Longrightarrow> FDERIV (\<lambda>x. f x - g x) x :> (\<lambda>h. F h - G h)"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	140	by (simp only: diff_minus FDERIV_add FDERIV_minus)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	141
37729 daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	142	subsection {* Uniqueness *}
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	143
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	144	lemma FDERIV_zero_unique:
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	145	assumes "FDERIV (\<lambda>x. 0) x :> F" shows "F = (\<lambda>h. 0)"
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	146	proof -
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	147	interpret F: bounded_linear F
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	148	using assms by (rule FDERIV_bounded_linear)
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	149	let ?r = "\<lambda>h. norm (F h) / norm h"
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	150	have *: "?r -- 0 --> 0"
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	151	using assms unfolding fderiv_def by simp
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	152	show "F = (\<lambda>h. 0)"
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	153	proof
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	154	fix h show "F h = 0"
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	155	proof (rule ccontr)
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	156	assume "F h \<noteq> 0"
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	157	moreover from this have h: "h \<noteq> 0"
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	158	by (clarsimp simp add: F.zero)
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	159	ultimately have "0 < ?r h"
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	160	by (simp add: divide_pos_pos)
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	161	from LIM_D [OF * this] obtain s where s: "0 < s"
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	162	and r: "\<And>x. x \<noteq> 0 \<Longrightarrow> norm x < s \<Longrightarrow> ?r x < ?r h" by auto
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	163	from dense [OF s] obtain t where t: "0 < t \<and> t < s" ..
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	164	let ?x = "scaleR (t / norm h) h"
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	165	have "?x \<noteq> 0" and "norm ?x < s" using t h by simp_all
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	166	hence "?r ?x < ?r h" by (rule r)
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	167	thus "False" using t h by (simp add: F.scaleR)
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	168	qed
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	169	qed
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	170	qed
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	171
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	172	lemma FDERIV_unique:
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	173	assumes "FDERIV f x :> F" and "FDERIV f x :> F'" shows "F = F'"
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	174	proof -
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	175	have "FDERIV (\<lambda>x. 0) x :> (\<lambda>h. F h - F' h)"
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	176	using FDERIV_diff [OF assms] by simp
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	177	hence "(\<lambda>h. F h - F' h) = (\<lambda>h. 0)"
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	178	by (rule FDERIV_zero_unique)
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	179	thus "F = F'"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	180	unfolding fun_eq_iff right_minus_eq .
37729 daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	181	qed
daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	182
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	183	subsection {* Continuity *}
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	184
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	185	lemma FDERIV_isCont:
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	186	assumes f: "FDERIV f x :> F"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	187	shows "isCont f x"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	188	proof -
29233 ce6d35a0bed6 Ported HOL and HOL-Library to new locales. ballarin parents: 28952 diff changeset	189	from f interpret F: bounded_linear "F" by (rule FDERIV_bounded_linear)
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	190	have "(\<lambda>h. norm (f (x + h) - f x - F h) / norm h) -- 0 --> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	191	by (rule FDERIV_D [OF f])
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	192	hence "(\<lambda>h. norm (f (x + h) - f x - F h) / norm h * norm h) -- 0 --> 0"
28866 30cd9d89a0fb reactivated some dead theories (based on hints by Mark Hillebrand); wenzelm parents: 28823 diff changeset	193	by (intro LIM_mult_zero LIM_norm_zero LIM_ident)
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	194	hence "(\<lambda>h. norm (f (x + h) - f x - F h)) -- 0 --> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	195	by (simp cong: LIM_cong)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	196	hence "(\<lambda>h. f (x + h) - f x - F h) -- 0 --> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	197	by (rule LIM_norm_zero_cancel)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	198	hence "(\<lambda>h. f (x + h) - f x - F h + F h) -- 0 --> 0"
28866 30cd9d89a0fb reactivated some dead theories (based on hints by Mark Hillebrand); wenzelm parents: 28823 diff changeset	199	by (intro LIM_add_zero F.LIM_zero LIM_ident)
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	200	hence "(\<lambda>h. f (x + h) - f x) -- 0 --> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	201	by simp
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	202	thus "isCont f x"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	203	unfolding isCont_iff by (rule LIM_zero_cancel)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	204	qed
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	205
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	206	subsection {* Composition *}
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	207
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	208	lemma real_divide_cancel_lemma:
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	209	fixes a b c :: real
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	210	shows "(b = 0 \<Longrightarrow> a = 0) \<Longrightarrow> (a / b) * (b / c) = a / c"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	211	by simp
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	212
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	213	lemma bounded_linear_compose:
27611 2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	214	assumes "bounded_linear f"
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	215	assumes "bounded_linear g"
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	216	shows "bounded_linear (\<lambda>x. f (g x))"
27611 2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	217	proof -
29233 ce6d35a0bed6 Ported HOL and HOL-Library to new locales. ballarin parents: 28952 diff changeset	218	interpret f: bounded_linear f by fact
ce6d35a0bed6 Ported HOL and HOL-Library to new locales. ballarin parents: 28952 diff changeset	219	interpret g: bounded_linear g by fact
27611 2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	220	show ?thesis proof (unfold_locales)
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	221	fix x y show "f (g (x + y)) = f (g x) + f (g y)"
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	222	by (simp only: f.add g.add)
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	223	next
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	224	fix r x show "f (g (scaleR r x)) = scaleR r (f (g x))"
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	225	by (simp only: f.scaleR g.scaleR)
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	226	next
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	227	from f.pos_bounded
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	228	obtain Kf where f: "\<And>x. norm (f x) \<le> norm x * Kf" and Kf: "0 < Kf" by fast
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	229	from g.pos_bounded
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	230	obtain Kg where g: "\<And>x. norm (g x) \<le> norm x * Kg" by fast
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	231	show "\<exists>K. \<forall>x. norm (f (g x)) \<le> norm x * K"
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	232	proof (intro exI allI)
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	233	fix x
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	234	have "norm (f (g x)) \<le> norm (g x) * Kf"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 31021 diff changeset	235	using f .
27611 2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	236	also have "\<dots> \<le> (norm x * Kg) * Kf"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 31021 diff changeset	237	using g Kf [THEN order_less_imp_le] by (rule mult_right_mono)
27611 2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	238	also have "(norm x * Kg) * Kf = norm x * (Kg * Kf)"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 31021 diff changeset	239	by (rule mult_assoc)
27611 2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	240	finally show "norm (f (g x)) \<le> norm x * (Kg * Kf)" .
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23398 diff changeset	241	qed
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	242	qed
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	243	qed
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	244
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	245	lemma FDERIV_compose:
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	246	fixes f :: "'a::real_normed_vector \<Rightarrow> 'b::real_normed_vector"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	247	fixes g :: "'b::real_normed_vector \<Rightarrow> 'c::real_normed_vector"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	248	assumes f: "FDERIV f x :> F"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	249	assumes g: "FDERIV g (f x) :> G"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	250	shows "FDERIV (\<lambda>x. g (f x)) x :> (\<lambda>h. G (F h))"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	251	proof (rule FDERIV_I)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	252	from FDERIV_bounded_linear [OF g] FDERIV_bounded_linear [OF f]
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	253	show "bounded_linear (\<lambda>h. G (F h))"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	254	by (rule bounded_linear_compose)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	255	next
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	256	let ?Rf = "\<lambda>h. f (x + h) - f x - F h"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	257	let ?Rg = "\<lambda>k. g (f x + k) - g (f x) - G k"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	258	let ?k = "\<lambda>h. f (x + h) - f x"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	259	let ?Nf = "\<lambda>h. norm (?Rf h) / norm h"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	260	let ?Ng = "\<lambda>h. norm (?Rg (?k h)) / norm (?k h)"
30729 461ee3e49ad3 interpretation/interpret: prefixes are mandatory by default; wenzelm parents: 30663 diff changeset	261	from f interpret F: bounded_linear "F" by (rule FDERIV_bounded_linear)
461ee3e49ad3 interpretation/interpret: prefixes are mandatory by default; wenzelm parents: 30663 diff changeset	262	from g interpret G: bounded_linear "G" by (rule FDERIV_bounded_linear)
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	263	from F.bounded obtain kF where kF: "\<And>x. norm (F x) \<le> norm x * kF" by fast
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	264	from G.bounded obtain kG where kG: "\<And>x. norm (G x) \<le> norm x * kG" by fast
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	265
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	266	let ?fun2 = "\<lambda>h. ?Nf h * kG + ?Ng h * (?Nf h + kF)"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	267
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	268	show "(\<lambda>h. norm (g (f (x + h)) - g (f x) - G (F h)) / norm h) -- 0 --> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	269	proof (rule real_LIM_sandwich_zero)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	270	have Nf: "?Nf -- 0 --> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	271	using FDERIV_D [OF f] .
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	272
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	273	have Ng1: "isCont (\<lambda>k. norm (?Rg k) / norm k) 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	274	by (simp add: isCont_def FDERIV_D [OF g])
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	275	have Ng2: "?k -- 0 --> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	276	apply (rule LIM_zero)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	277	apply (fold isCont_iff)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	278	apply (rule FDERIV_isCont [OF f])
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	279	done
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	280	have Ng: "?Ng -- 0 --> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	281	using isCont_LIM_compose [OF Ng1 Ng2] by simp
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	282
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	283	have "(\<lambda>h. ?Nf h * kG + ?Ng h * (?Nf h + kF))
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	284	-- 0 --> 0 * kG + 0 * (0 + kF)"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	285	by (intro LIM_add LIM_mult LIM_const Nf Ng)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	286	thus "(\<lambda>h. ?Nf h * kG + ?Ng h * (?Nf h + kF)) -- 0 --> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	287	by simp
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	288	next
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	289	fix h::'a assume h: "h \<noteq> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	290	thus "0 \<le> norm (g (f (x + h)) - g (f x) - G (F h)) / norm h"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	291	by (simp add: divide_nonneg_pos)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	292	next
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	293	fix h::'a assume h: "h \<noteq> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	294	have "g (f (x + h)) - g (f x) - G (F h) = G (?Rf h) + ?Rg (?k h)"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	295	by (simp add: G.diff)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	296	hence "norm (g (f (x + h)) - g (f x) - G (F h)) / norm h
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	297	= norm (G (?Rf h) + ?Rg (?k h)) / norm h"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	298	by (rule arg_cong)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	299	also have "\<dots> \<le> norm (G (?Rf h)) / norm h + norm (?Rg (?k h)) / norm h"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	300	by (rule norm_ratio_ineq)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	301	also have "\<dots> \<le> ?Nf h * kG + ?Ng h * (?Nf h + kF)"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	302	proof (rule add_mono)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	303	show "norm (G (?Rf h)) / norm h \<le> ?Nf h * kG"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	304	apply (rule ord_le_eq_trans)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	305	apply (rule divide_right_mono [OF kG norm_ge_zero])
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	306	apply simp
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	307	done
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	308	next
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	309	have "norm (?Rg (?k h)) / norm h = ?Ng h * (norm (?k h) / norm h)"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	310	apply (rule real_divide_cancel_lemma [symmetric])
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	311	apply (simp add: G.zero)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	312	done
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	313	also have "\<dots> \<le> ?Ng h * (?Nf h + kF)"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	314	proof (rule mult_left_mono)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	315	have "norm (?k h) / norm h = norm (?Rf h + F h) / norm h"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	316	by simp
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	317	also have "\<dots> \<le> ?Nf h + norm (F h) / norm h"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	318	by (rule norm_ratio_ineq)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	319	also have "\<dots> \<le> ?Nf h + kF"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	320	apply (rule add_left_mono)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	321	apply (subst pos_divide_le_eq, simp add: h)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	322	apply (subst mult_commute)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	323	apply (rule kF)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	324	done
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	325	finally show "norm (?k h) / norm h \<le> ?Nf h + kF" .
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	326	next
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	327	show "0 \<le> ?Ng h"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	328	apply (case_tac "f (x + h) - f x = 0", simp)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	329	apply (rule divide_nonneg_pos [OF norm_ge_zero])
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	330	apply simp
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	331	done
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	332	qed
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	333	finally show "norm (?Rg (?k h)) / norm h \<le> ?Ng h * (?Nf h + kF)" .
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	334	qed
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	335	finally show "norm (g (f (x + h)) - g (f x) - G (F h)) / norm h
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	336	\<le> ?Nf h * kG + ?Ng h * (?Nf h + kF)" .
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	337	qed
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	338	qed
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	339
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	340	subsection {* Product Rule *}
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	341
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	342	lemma (in bounded_bilinear) FDERIV_lemma:
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	343	"a' b' - a b - (a B + A b)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	344	= a (b' - b - B) + (a' - a - A) b' + A ** (b' - b)"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	345	by (simp add: diff_left diff_right)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	346
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	347	lemma (in bounded_bilinear) FDERIV:
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	348	fixes x :: "'d::real_normed_vector"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	349	assumes f: "FDERIV f x :> F"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	350	assumes g: "FDERIV g x :> G"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	351	shows "FDERIV (\<lambda>x. f x g x) x :> (\<lambda>h. f x G h + F h ** g x)"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	352	proof (rule FDERIV_I)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	353	show "bounded_linear (\<lambda>h. f x G h + F h g x)"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	354	apply (rule bounded_linear_add)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	355	apply (rule bounded_linear_compose [OF bounded_linear_right])
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	356	apply (rule FDERIV_bounded_linear [OF g])
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	357	apply (rule bounded_linear_compose [OF bounded_linear_left])
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	358	apply (rule FDERIV_bounded_linear [OF f])
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	359	done
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	360	next
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	361	from bounded_linear.bounded [OF FDERIV_bounded_linear [OF f]]
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	362	obtain KF where norm_F: "\<And>x. norm (F x) \<le> norm x * KF" by fast
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	363
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	364	from pos_bounded obtain K where K: "0 < K" and norm_prod:
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	365	"\<And>a b. norm (a ** b) \<le> norm a * norm b * K" by fast
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	366
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	367	let ?Rf = "\<lambda>h. f (x + h) - f x - F h"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	368	let ?Rg = "\<lambda>h. g (x + h) - g x - G h"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	369
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	370	let ?fun1 = "\<lambda>h.
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	371	norm (f x ?Rg h + ?Rf h g (x + h) + F h ** (g (x + h) - g x)) /
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	372	norm h"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	373
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	374	let ?fun2 = "\<lambda>h.
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	375	norm (f x) * (norm (?Rg h) / norm h) * K +
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	376	norm (?Rf h) / norm h * norm (g (x + h)) * K +
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	377	KF * norm (g (x + h) - g x) * K"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	378
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	379	have "?fun1 -- 0 --> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	380	proof (rule real_LIM_sandwich_zero)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	381	from f g isCont_iff [THEN iffD1, OF FDERIV_isCont [OF g]]
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	382	have "?fun2 -- 0 -->
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	383	norm (f x) * 0 * K + 0 * norm (g x) * K + KF * norm (0::'b) * K"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	384	by (intro LIM_add LIM_mult LIM_const LIM_norm LIM_zero FDERIV_D)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	385	thus "?fun2 -- 0 --> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	386	by simp
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	387	next
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	388	fix h::'d assume "h \<noteq> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	389	thus "0 \<le> ?fun1 h"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	390	by (simp add: divide_nonneg_pos)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	391	next
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	392	fix h::'d assume "h \<noteq> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	393	have "?fun1 h \<le> (norm (f x) * norm (?Rg h) * K +
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	394	norm (?Rf h) * norm (g (x + h)) * K +
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	395	norm h * KF * norm (g (x + h) - g x) * K) / norm h"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	396	by (intro
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	397	divide_right_mono mult_mono'
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	398	order_trans [OF norm_triangle_ineq add_mono]
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	399	order_trans [OF norm_prod mult_right_mono]
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	400	mult_nonneg_nonneg order_refl norm_ge_zero norm_F
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	401	K [THEN order_less_imp_le]
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	402	)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	403	also have "\<dots> = ?fun2 h"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	404	by (simp add: add_divide_distrib)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	405	finally show "?fun1 h \<le> ?fun2 h" .
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	406	qed
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	407	thus "(\<lambda>h.
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	408	norm (f (x + h) g (x + h) - f x g x - (f x G h + F h g x))
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	409	/ norm h) -- 0 --> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	410	by (simp only: FDERIV_lemma)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	411	qed
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	412
29233 ce6d35a0bed6 Ported HOL and HOL-Library to new locales. ballarin parents: 28952 diff changeset	413	lemmas FDERIV_mult = mult.FDERIV
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	414
29233 ce6d35a0bed6 Ported HOL and HOL-Library to new locales. ballarin parents: 28952 diff changeset	415	lemmas FDERIV_scaleR = scaleR.FDERIV
28866 30cd9d89a0fb reactivated some dead theories (based on hints by Mark Hillebrand); wenzelm parents: 28823 diff changeset	416
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	417
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	418	subsection {* Powers *}
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	419
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	420	lemma FDERIV_power_Suc:
31021 53642251a04f farewell to class recpower haftmann parents: 30729 diff changeset	421	fixes x :: "'a::{real_normed_algebra,comm_ring_1}"
28866 30cd9d89a0fb reactivated some dead theories (based on hints by Mark Hillebrand); wenzelm parents: 28823 diff changeset	422	shows "FDERIV (\<lambda>x. x ^ Suc n) x :> (\<lambda>h. (1 + of_nat n) * x ^ n * h)"
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	423	apply (induct n)
36361 1debc8e29f6a fix duplicate simp rule warnings huffman parents: 34146 diff changeset	424	apply (simp add: FDERIV_ident)
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	425	apply (drule FDERIV_mult [OF FDERIV_ident])
28866 30cd9d89a0fb reactivated some dead theories (based on hints by Mark Hillebrand); wenzelm parents: 28823 diff changeset	426	apply (simp only: of_nat_Suc left_distrib mult_1_left)
30cd9d89a0fb reactivated some dead theories (based on hints by Mark Hillebrand); wenzelm parents: 28823 diff changeset	427	apply (simp only: power_Suc right_distrib add_ac mult_ac)
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	428	done
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	429
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	430	lemma FDERIV_power:
31021 53642251a04f farewell to class recpower haftmann parents: 30729 diff changeset	431	fixes x :: "'a::{real_normed_algebra,comm_ring_1}"
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	432	shows "FDERIV (\<lambda>x. x ^ n) x :> (\<lambda>h. of_nat n * x ^ (n - 1) * h)"
28866 30cd9d89a0fb reactivated some dead theories (based on hints by Mark Hillebrand); wenzelm parents: 28823 diff changeset	433	apply (cases n)
30cd9d89a0fb reactivated some dead theories (based on hints by Mark Hillebrand); wenzelm parents: 28823 diff changeset	434	apply (simp add: FDERIV_const)
30273 ecd6f0ca62ea declare power_Suc [simp]; remove redundant type-specific versions of power_Suc huffman parents: 29986 diff changeset	435	apply (simp add: FDERIV_power_Suc del: power_Suc)
28866 30cd9d89a0fb reactivated some dead theories (based on hints by Mark Hillebrand); wenzelm parents: 28823 diff changeset	436	done
30cd9d89a0fb reactivated some dead theories (based on hints by Mark Hillebrand); wenzelm parents: 28823 diff changeset	437
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	438
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	439	subsection {* Inverse *}
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	440
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	441	lemmas bounded_linear_mult_const =
29233 ce6d35a0bed6 Ported HOL and HOL-Library to new locales. ballarin parents: 28952 diff changeset	442	mult.bounded_linear_left [THEN bounded_linear_compose]
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	443
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	444	lemmas bounded_linear_const_mult =
29233 ce6d35a0bed6 Ported HOL and HOL-Library to new locales. ballarin parents: 28952 diff changeset	445	mult.bounded_linear_right [THEN bounded_linear_compose]
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	446
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	447	lemma FDERIV_inverse:
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	448	fixes x :: "'a::real_normed_div_algebra"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	449	assumes x: "x \<noteq> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	450	shows "FDERIV inverse x :> (\<lambda>h. - (inverse x * h * inverse x))"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	451	(is "FDERIV ?inv _ :> _")
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	452	proof (rule FDERIV_I)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	453	show "bounded_linear (\<lambda>h. - (?inv x * h * ?inv x))"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	454	apply (rule bounded_linear_minus)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	455	apply (rule bounded_linear_mult_const)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	456	apply (rule bounded_linear_const_mult)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	457	apply (rule bounded_linear_ident)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	458	done
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	459	next
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	460	show "(\<lambda>h. norm (?inv (x + h) - ?inv x - - (?inv x * h * ?inv x)) / norm h)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	461	-- 0 --> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	462	proof (rule LIM_equal2)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	463	show "0 < norm x" using x by simp
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	464	next
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	465	fix h::'a
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	466	assume 1: "h \<noteq> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	467	assume "norm (h - 0) < norm x"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	468	hence "h \<noteq> -x" by clarsimp
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	469	hence 2: "x + h \<noteq> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	470	apply (rule contrapos_nn)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	471	apply (rule sym)
34146 14595e0c27e8 rename equals_zero_I to minus_unique (keep old name too) huffman parents: 32960 diff changeset	472	apply (erule minus_unique)
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	473	done
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	474	show "norm (?inv (x + h) - ?inv x - - (?inv x * h * ?inv x)) / norm h
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	475	= norm ((?inv (x + h) - ?inv x) * h * ?inv x) / norm h"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	476	apply (subst inverse_diff_inverse [OF 2 x])
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	477	apply (subst minus_diff_minus)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	478	apply (subst norm_minus_cancel)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	479	apply (simp add: left_diff_distrib)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	480	done
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	481	next
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	482	show "(\<lambda>h. norm ((?inv (x + h) - ?inv x) * h * ?inv x) / norm h)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	483	-- 0 --> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	484	proof (rule real_LIM_sandwich_zero)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	485	show "(\<lambda>h. norm (?inv (x + h) - ?inv x) * norm (?inv x))
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	486	-- 0 --> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	487	apply (rule LIM_mult_left_zero)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	488	apply (rule LIM_norm_zero)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	489	apply (rule LIM_zero)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	490	apply (rule LIM_offset_zero)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	491	apply (rule LIM_inverse)
28866 30cd9d89a0fb reactivated some dead theories (based on hints by Mark Hillebrand); wenzelm parents: 28823 diff changeset	492	apply (rule LIM_ident)
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	493	apply (rule x)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	494	done
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	495	next
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	496	fix h::'a assume h: "h \<noteq> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	497	show "0 \<le> norm ((?inv (x + h) - ?inv x) * h * ?inv x) / norm h"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	498	apply (rule divide_nonneg_pos)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	499	apply (rule norm_ge_zero)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	500	apply (simp add: h)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	501	done
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	502	next
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	503	fix h::'a assume h: "h \<noteq> 0"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	504	have "norm ((?inv (x + h) - ?inv x) * h * ?inv x) / norm h
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	505	\<le> norm (?inv (x + h) - ?inv x) * norm h * norm (?inv x) / norm h"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	506	apply (rule divide_right_mono [OF _ norm_ge_zero])
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	507	apply (rule order_trans [OF norm_mult_ineq])
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	508	apply (rule mult_right_mono [OF _ norm_ge_zero])
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	509	apply (rule norm_mult_ineq)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	510	done
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	511	also have "\<dots> = norm (?inv (x + h) - ?inv x) * norm (?inv x)"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	512	by simp
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	513	finally show "norm ((?inv (x + h) - ?inv x) * h * ?inv x) / norm h
37729 daea77769276 uniqueness of Frechet derivative huffman parents: 36626 diff changeset	514	\<le> norm (?inv (x + h) - ?inv x) * norm (?inv x)" .
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	515	qed
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	516	qed
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	517	qed
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	518
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	519	subsection {* Alternate definition *}
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	520
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	521	lemma field_fderiv_def:
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	522	fixes x :: "'a::real_normed_field" shows
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	523	"FDERIV f x :> (\<lambda>h. h * D) = (\<lambda>h. (f (x + h) - f x) / h) -- 0 --> D"
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	524	apply (unfold fderiv_def)
29233 ce6d35a0bed6 Ported HOL and HOL-Library to new locales. ballarin parents: 28952 diff changeset	525	apply (simp add: mult.bounded_linear_left)
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	526	apply (simp cong: LIM_cong add: nonzero_norm_divide [symmetric])
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	527	apply (subst diff_divide_distrib)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	528	apply (subst times_divide_eq_left [symmetric])
23398 0b5a400c7595 made divide_self a simp rule nipkow parents: 22720 diff changeset	529	apply (simp cong: LIM_cong)
21776 e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	530	apply (simp add: LIM_norm_zero_iff LIM_zero_iff)
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	531	done
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	532
e65109e168f3 theory of Frechet derivatives huffman parents: diff changeset	533	end

author	haftmann
	Wed, 08 Dec 2010 15:05:46 +0100
changeset 41082	9ff94e7cc3b3
parent 39302	d7728f65b353
child 44127	7b57b9295d98
permissions	-rw-r--r--