isabelle: src/HOL/Hyperreal/HTranscendental.thy@1eb23f805c06 (annotated)

13958 c1c67582c9b5 New material on integration, etc. Moving Hyperreal/ex paulson parents: diff changeset	1	(* Title : HTranscendental.thy
c1c67582c9b5 New material on integration, etc. Moving Hyperreal/ex paulson parents: diff changeset	2	Author : Jacques D. Fleuriot
c1c67582c9b5 New material on integration, etc. Moving Hyperreal/ex paulson parents: diff changeset	3	Copyright : 2001 University of Edinburgh
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	4
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	5	Converted to Isar and polished by lcp
13958 c1c67582c9b5 New material on integration, etc. Moving Hyperreal/ex paulson parents: diff changeset	6	*)
c1c67582c9b5 New material on integration, etc. Moving Hyperreal/ex paulson parents: diff changeset	7
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	8	header{Nonstandard Extensions of Transcendental Functions}
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	9
15131 c69542757a4d New theory header syntax. nipkow parents: 15077 diff changeset	10	theory HTranscendental
15140 322485b816ac import -> imports nipkow parents: 15131 diff changeset	11	imports Transcendental Integration
15131 c69542757a4d New theory header syntax. nipkow parents: 15077 diff changeset	12	begin
13958 c1c67582c9b5 New material on integration, etc. Moving Hyperreal/ex paulson parents: diff changeset	13
15013 34264f5e4691 new treatment of binary numerals paulson parents: 14641 diff changeset	14	text{really belongs in Transcendental}
34264f5e4691 new treatment of binary numerals paulson parents: 14641 diff changeset	15	lemma sqrt_divide_self_eq:
34264f5e4691 new treatment of binary numerals paulson parents: 14641 diff changeset	16	assumes nneg: "0 \<le> x"
34264f5e4691 new treatment of binary numerals paulson parents: 14641 diff changeset	17	shows "sqrt x / x = inverse (sqrt x)"
34264f5e4691 new treatment of binary numerals paulson parents: 14641 diff changeset	18	proof cases
34264f5e4691 new treatment of binary numerals paulson parents: 14641 diff changeset	19	assume "x=0" thus ?thesis by simp
34264f5e4691 new treatment of binary numerals paulson parents: 14641 diff changeset	20	next
34264f5e4691 new treatment of binary numerals paulson parents: 14641 diff changeset	21	assume nz: "x\<noteq>0"
34264f5e4691 new treatment of binary numerals paulson parents: 14641 diff changeset	22	hence pos: "0<x" using nneg by arith
34264f5e4691 new treatment of binary numerals paulson parents: 14641 diff changeset	23	show ?thesis
34264f5e4691 new treatment of binary numerals paulson parents: 14641 diff changeset	24	proof (rule right_inverse_eq [THEN iffD1, THEN sym])
34264f5e4691 new treatment of binary numerals paulson parents: 14641 diff changeset	25	show "sqrt x / x \<noteq> 0" by (simp add: divide_inverse nneg nz)
34264f5e4691 new treatment of binary numerals paulson parents: 14641 diff changeset	26	show "inverse (sqrt x) / (sqrt x / x) = 1"
34264f5e4691 new treatment of binary numerals paulson parents: 14641 diff changeset	27	by (simp add: divide_inverse mult_assoc [symmetric]
34264f5e4691 new treatment of binary numerals paulson parents: 14641 diff changeset	28	power2_eq_square [symmetric] real_inv_sqrt_pow2 pos nz)
34264f5e4691 new treatment of binary numerals paulson parents: 14641 diff changeset	29	qed
34264f5e4691 new treatment of binary numerals paulson parents: 14641 diff changeset	30	qed
34264f5e4691 new treatment of binary numerals paulson parents: 14641 diff changeset	31
34264f5e4691 new treatment of binary numerals paulson parents: 14641 diff changeset	32
13958 c1c67582c9b5 New material on integration, etc. Moving Hyperreal/ex paulson parents: diff changeset	33	constdefs
c1c67582c9b5 New material on integration, etc. Moving Hyperreal/ex paulson parents: diff changeset	34
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	35	exphr :: "real => hypreal"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	36	--{define exponential function using standard part }
13958 c1c67582c9b5 New material on integration, etc. Moving Hyperreal/ex paulson parents: diff changeset	37	"exphr x == st(sumhr (0, whn, %n. inverse(real (fact n)) * (x ^ n)))"
c1c67582c9b5 New material on integration, etc. Moving Hyperreal/ex paulson parents: diff changeset	38
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	39	sinhr :: "real => hypreal"
13958 c1c67582c9b5 New material on integration, etc. Moving Hyperreal/ex paulson parents: diff changeset	40	"sinhr x == st(sumhr (0, whn, %n. (if even(n) then 0 else
c1c67582c9b5 New material on integration, etc. Moving Hyperreal/ex paulson parents: diff changeset	41	((-1) ^ ((n - 1) div 2))/(real (fact n))) * (x ^ n)))"
c1c67582c9b5 New material on integration, etc. Moving Hyperreal/ex paulson parents: diff changeset	42
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	43	coshr :: "real => hypreal"
13958 c1c67582c9b5 New material on integration, etc. Moving Hyperreal/ex paulson parents: diff changeset	44	"coshr x == st(sumhr (0, whn, %n. (if even(n) then
c1c67582c9b5 New material on integration, etc. Moving Hyperreal/ex paulson parents: diff changeset	45	((-1) ^ (n div 2))/(real (fact n)) else 0) * x ^ n))"
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	46
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	47
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	48	subsection{Nonstandard Extension of Square Root Function}
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	49
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	50	lemma STAR_sqrt_zero [simp]: "( f sqrt) 0 = 0"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	51	by (simp add: starfun hypreal_zero_num)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	52
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	53	lemma STAR_sqrt_one [simp]: "( f sqrt) 1 = 1"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	54	by (simp add: starfun hypreal_one_num)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	55
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	56	lemma hypreal_sqrt_pow2_iff: "(( f sqrt)(x) ^ 2 = x) = (0 \<le> x)"
14468 6be497cacab5 heavy tidying paulson parents: 14430 diff changeset	57	apply (cases x)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	58	apply (auto simp add: hypreal_le hypreal_zero_num starfun hrealpow
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	59	real_sqrt_pow2_iff
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	60	simp del: hpowr_Suc realpow_Suc)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	61	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	62
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	63	lemma hypreal_sqrt_gt_zero_pow2: "0 < x ==> ( f sqrt) (x) ^ 2 = x"
14468 6be497cacab5 heavy tidying paulson parents: 14430 diff changeset	64	apply (cases x)
15077 89840837108e converting Hyperreal/Transcendental to Isar script paulson parents: 15013 diff changeset	65	apply (auto intro: FreeUltrafilterNat_subset
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	66	simp add: hypreal_less starfun hrealpow hypreal_zero_num
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	67	simp del: hpowr_Suc realpow_Suc)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	68	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	69
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	70	lemma hypreal_sqrt_pow2_gt_zero: "0 < x ==> 0 < ( f sqrt) (x) ^ 2"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	71	by (frule hypreal_sqrt_gt_zero_pow2, auto)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	72
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	73	lemma hypreal_sqrt_not_zero: "0 < x ==> ( f sqrt) (x) \<noteq> 0"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	74	apply (frule hypreal_sqrt_pow2_gt_zero)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	75	apply (auto simp add: numeral_2_eq_2)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	76	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	77
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	78	lemma hypreal_inverse_sqrt_pow2:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	79	"0 < x ==> inverse (( f sqrt)(x)) ^ 2 = inverse x"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	80	apply (cut_tac n1 = 2 and a1 = "( f sqrt) x" in power_inverse [symmetric])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	81	apply (auto dest: hypreal_sqrt_gt_zero_pow2)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	82	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	83
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	84	lemma hypreal_sqrt_mult_distrib:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	85	"[\|0 < x; 0 <y \|] ==> ( f sqrt)(xy) = ( f* sqrt)(x) * ( f sqrt)(y)"
14468 6be497cacab5 heavy tidying paulson parents: 14430 diff changeset	86	apply (cases x, cases y)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	87	apply (simp add: hypreal_zero_def starfun hypreal_mult hypreal_less hypreal_zero_num, ultra)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	88	apply (auto intro: real_sqrt_mult_distrib)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	89	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	90
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	91	lemma hypreal_sqrt_mult_distrib2:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	92	"[\|0\<le>x; 0\<le>y \|] ==>
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	93	( f sqrt)(xy) = ( f* sqrt)(x) * ( f sqrt)(y)"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	94	by (auto intro: hypreal_sqrt_mult_distrib simp add: order_le_less)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	95
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	96	lemma hypreal_sqrt_approx_zero [simp]:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	97	"0 < x ==> (( f sqrt)(x) @= 0) = (x @= 0)"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	98	apply (auto simp add: mem_infmal_iff [symmetric])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	99	apply (rule hypreal_sqrt_gt_zero_pow2 [THEN subst])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	100	apply (auto intro: Infinitesimal_mult
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	101	dest!: hypreal_sqrt_gt_zero_pow2 [THEN ssubst]
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	102	simp add: numeral_2_eq_2)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	103	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	104
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	105	lemma hypreal_sqrt_approx_zero2 [simp]:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	106	"0 \<le> x ==> (( f sqrt)(x) @= 0) = (x @= 0)"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	107	by (auto simp add: order_le_less)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	108
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	109	lemma hypreal_sqrt_sum_squares [simp]:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	110	"(( f sqrt)(xx + yy + zz) @= 0) = (xx + yy + zz @= 0)"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	111	apply (rule hypreal_sqrt_approx_zero2)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	112	apply (rule hypreal_le_add_order)+
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	113	apply (auto simp add: zero_le_square)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	114	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	115
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	116	lemma hypreal_sqrt_sum_squares2 [simp]:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	117	"(( f sqrt)(xx + yy) @= 0) = (xx + yy @= 0)"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	118	apply (rule hypreal_sqrt_approx_zero2)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	119	apply (rule hypreal_le_add_order)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	120	apply (auto simp add: zero_le_square)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	121	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	122
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	123	lemma hypreal_sqrt_gt_zero: "0 < x ==> 0 < ( f sqrt)(x)"
14468 6be497cacab5 heavy tidying paulson parents: 14430 diff changeset	124	apply (cases x)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	125	apply (auto simp add: starfun hypreal_zero_def hypreal_less hypreal_zero_num, ultra)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	126	apply (auto intro: real_sqrt_gt_zero)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	127	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	128
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	129	lemma hypreal_sqrt_ge_zero: "0 \<le> x ==> 0 \<le> ( f sqrt)(x)"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	130	by (auto intro: hypreal_sqrt_gt_zero simp add: order_le_less)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	131
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	132	lemma hypreal_sqrt_hrabs [simp]: "( f sqrt)(x ^ 2) = abs(x)"
14468 6be497cacab5 heavy tidying paulson parents: 14430 diff changeset	133	apply (cases x)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	134	apply (simp add: starfun hypreal_hrabs hypreal_mult numeral_2_eq_2)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	135	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	136
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	137	lemma hypreal_sqrt_hrabs2 [simp]: "( f sqrt)(x*x) = abs(x)"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	138	apply (rule hrealpow_two [THEN subst])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	139	apply (rule numeral_2_eq_2 [THEN subst])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	140	apply (rule hypreal_sqrt_hrabs)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	141	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	142
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	143	lemma hypreal_sqrt_hyperpow_hrabs [simp]:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	144	"( f sqrt)(x pow (hypnat_of_nat 2)) = abs(x)"
14468 6be497cacab5 heavy tidying paulson parents: 14430 diff changeset	145	apply (cases x)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	146	apply (simp add: starfun hypreal_hrabs hypnat_of_nat_eq hyperpow)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	147	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	148
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	149	lemma star_sqrt_HFinite: "\<lbrakk>x \<in> HFinite; 0 \<le> x\<rbrakk> \<Longrightarrow> ( f sqrt) x \<in> HFinite"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	150	apply (rule HFinite_square_iff [THEN iffD1])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	151	apply (simp only: hypreal_sqrt_mult_distrib2 [symmetric], simp)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	152	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	153
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	154	lemma st_hypreal_sqrt:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	155	"[\| x \<in> HFinite; 0 \<le> x \|] ==> st(( f sqrt) x) = ( f sqrt)(st x)"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	156	apply (rule power_inject_base [where n=1])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	157	apply (auto intro!: st_zero_le hypreal_sqrt_ge_zero)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	158	apply (rule st_mult [THEN subst])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	159	apply (rule_tac [3] hypreal_sqrt_mult_distrib2 [THEN subst])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	160	apply (rule_tac [5] hypreal_sqrt_mult_distrib2 [THEN subst])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	161	apply (auto simp add: st_hrabs st_zero_le star_sqrt_HFinite)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	162	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	163
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	164	lemma hypreal_sqrt_sum_squares_ge1 [simp]: "x \<le> ( f sqrt)(x ^ 2 + y ^ 2)"
14468 6be497cacab5 heavy tidying paulson parents: 14430 diff changeset	165	apply (cases x, cases y)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	166	apply (simp add: starfun hypreal_add hrealpow hypreal_le
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	167	del: hpowr_Suc realpow_Suc)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	168	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	169
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	170	lemma HFinite_hypreal_sqrt:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	171	"[\| 0 \<le> x; x \<in> HFinite \|] ==> ( f sqrt) x \<in> HFinite"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	172	apply (auto simp add: order_le_less)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	173	apply (rule HFinite_square_iff [THEN iffD1])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	174	apply (drule hypreal_sqrt_gt_zero_pow2)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	175	apply (simp add: numeral_2_eq_2)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	176	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	177
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	178	lemma HFinite_hypreal_sqrt_imp_HFinite:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	179	"[\| 0 \<le> x; ( f sqrt) x \<in> HFinite \|] ==> x \<in> HFinite"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	180	apply (auto simp add: order_le_less)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	181	apply (drule HFinite_square_iff [THEN iffD2])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	182	apply (drule hypreal_sqrt_gt_zero_pow2)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	183	apply (simp add: numeral_2_eq_2 del: HFinite_square_iff)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	184	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	185
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	186	lemma HFinite_hypreal_sqrt_iff [simp]:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	187	"0 \<le> x ==> (( f sqrt) x \<in> HFinite) = (x \<in> HFinite)"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	188	by (blast intro: HFinite_hypreal_sqrt HFinite_hypreal_sqrt_imp_HFinite)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	189
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	190	lemma HFinite_sqrt_sum_squares [simp]:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	191	"(( f sqrt)(xx + yy) \<in> HFinite) = (xx + yy \<in> HFinite)"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	192	apply (rule HFinite_hypreal_sqrt_iff)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	193	apply (rule hypreal_le_add_order)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	194	apply (auto simp add: zero_le_square)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	195	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	196
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	197	lemma Infinitesimal_hypreal_sqrt:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	198	"[\| 0 \<le> x; x \<in> Infinitesimal \|] ==> ( f sqrt) x \<in> Infinitesimal"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	199	apply (auto simp add: order_le_less)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	200	apply (rule Infinitesimal_square_iff [THEN iffD2])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	201	apply (drule hypreal_sqrt_gt_zero_pow2)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	202	apply (simp add: numeral_2_eq_2)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	203	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	204
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	205	lemma Infinitesimal_hypreal_sqrt_imp_Infinitesimal:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	206	"[\| 0 \<le> x; ( f sqrt) x \<in> Infinitesimal \|] ==> x \<in> Infinitesimal"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	207	apply (auto simp add: order_le_less)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	208	apply (drule Infinitesimal_square_iff [THEN iffD1])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	209	apply (drule hypreal_sqrt_gt_zero_pow2)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	210	apply (simp add: numeral_2_eq_2 del: Infinitesimal_square_iff [symmetric])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	211	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	212
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	213	lemma Infinitesimal_hypreal_sqrt_iff [simp]:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	214	"0 \<le> x ==> (( f sqrt) x \<in> Infinitesimal) = (x \<in> Infinitesimal)"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	215	by (blast intro: Infinitesimal_hypreal_sqrt_imp_Infinitesimal Infinitesimal_hypreal_sqrt)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	216
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	217	lemma Infinitesimal_sqrt_sum_squares [simp]:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	218	"(( f sqrt)(xx + yy) \<in> Infinitesimal) = (xx + yy \<in> Infinitesimal)"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	219	apply (rule Infinitesimal_hypreal_sqrt_iff)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	220	apply (rule hypreal_le_add_order)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	221	apply (auto simp add: zero_le_square)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	222	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	223
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	224	lemma HInfinite_hypreal_sqrt:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	225	"[\| 0 \<le> x; x \<in> HInfinite \|] ==> ( f sqrt) x \<in> HInfinite"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	226	apply (auto simp add: order_le_less)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	227	apply (rule HInfinite_square_iff [THEN iffD1])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	228	apply (drule hypreal_sqrt_gt_zero_pow2)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	229	apply (simp add: numeral_2_eq_2)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	230	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	231
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	232	lemma HInfinite_hypreal_sqrt_imp_HInfinite:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	233	"[\| 0 \<le> x; ( f sqrt) x \<in> HInfinite \|] ==> x \<in> HInfinite"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	234	apply (auto simp add: order_le_less)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	235	apply (drule HInfinite_square_iff [THEN iffD2])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	236	apply (drule hypreal_sqrt_gt_zero_pow2)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	237	apply (simp add: numeral_2_eq_2 del: HInfinite_square_iff)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	238	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	239
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	240	lemma HInfinite_hypreal_sqrt_iff [simp]:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	241	"0 \<le> x ==> (( f sqrt) x \<in> HInfinite) = (x \<in> HInfinite)"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	242	by (blast intro: HInfinite_hypreal_sqrt HInfinite_hypreal_sqrt_imp_HInfinite)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	243
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	244	lemma HInfinite_sqrt_sum_squares [simp]:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	245	"(( f sqrt)(xx + yy) \<in> HInfinite) = (xx + yy \<in> HInfinite)"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	246	apply (rule HInfinite_hypreal_sqrt_iff)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	247	apply (rule hypreal_le_add_order)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	248	apply (auto simp add: zero_le_square)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	249	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	250
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	251	lemma HFinite_exp [simp]:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	252	"sumhr (0, whn, %n. inverse (real (fact n)) * x ^ n) \<in> HFinite"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	253	by (auto intro!: NSBseq_HFinite_hypreal NSconvergent_NSBseq
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	254	simp add: starfunNat_sumr [symmetric] starfunNat hypnat_omega_def
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	255	convergent_NSconvergent_iff [symmetric]
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	256	summable_convergent_sumr_iff [symmetric] summable_exp)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	257
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	258	lemma exphr_zero [simp]: "exphr 0 = 1"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	259	apply (simp add: exphr_def sumhr_split_add
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	260	[OF hypnat_one_less_hypnat_omega, symmetric])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	261	apply (simp add: sumhr hypnat_zero_def starfunNat hypnat_one_def hypnat_add
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	262	hypnat_omega_def hypreal_add
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	263	del: hypnat_add_zero_left)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	264	apply (simp add: hypreal_one_num [symmetric])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	265	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	266
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	267	lemma coshr_zero [simp]: "coshr 0 = 1"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	268	apply (simp add: coshr_def sumhr_split_add
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	269	[OF hypnat_one_less_hypnat_omega, symmetric])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	270	apply (simp add: sumhr hypnat_zero_def starfunNat hypnat_one_def
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	271	hypnat_add hypnat_omega_def st_add [symmetric]
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	272	hypreal_one_def [symmetric] hypreal_zero_def [symmetric]
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	273	del: hypnat_add_zero_left)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	274	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	275
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	276	lemma STAR_exp_zero_approx_one [simp]: "( f exp) 0 @= 1"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	277	by (simp add: hypreal_zero_def hypreal_one_def starfun hypreal_one_num)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	278
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	279	lemma STAR_exp_Infinitesimal: "x \<in> Infinitesimal ==> ( f exp) x @= 1"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	280	apply (case_tac "x = 0")
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	281	apply (cut_tac [2] x = 0 in DERIV_exp)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	282	apply (auto simp add: NSDERIV_DERIV_iff [symmetric] nsderiv_def)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	283	apply (drule_tac x = x in bspec, auto)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	284	apply (drule_tac c = x in approx_mult1)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	285	apply (auto intro: Infinitesimal_subset_HFinite [THEN subsetD]
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	286	simp add: mult_assoc)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	287	apply (rule approx_add_right_cancel [where d="-1"])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	288	apply (rule approx_sym [THEN [2] approx_trans2])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	289	apply (auto simp add: mem_infmal_iff)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	290	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	291
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	292	lemma STAR_exp_epsilon [simp]: "( f exp) epsilon @= 1"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	293	by (auto intro: STAR_exp_Infinitesimal)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	294
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	295	lemma STAR_exp_add: "( f exp)(x + y) = ( f exp) x * ( f exp) y"
14468 6be497cacab5 heavy tidying paulson parents: 14430 diff changeset	296	apply (cases x, cases y)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	297	apply (simp add: starfun hypreal_add hypreal_mult exp_add)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	298	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	299
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	300	lemma exphr_hypreal_of_real_exp_eq: "exphr x = hypreal_of_real (exp x)"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	301	apply (simp add: exphr_def)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	302	apply (rule st_hypreal_of_real [THEN subst])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	303	apply (rule approx_st_eq, auto)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	304	apply (rule approx_minus_iff [THEN iffD2])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	305	apply (auto simp add: mem_infmal_iff [symmetric] hypreal_of_real_def hypnat_zero_def hypnat_omega_def sumhr hypreal_minus hypreal_add)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	306	apply (rule NSLIMSEQ_zero_Infinitesimal_hypreal)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	307	apply (insert exp_converges [of x])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	308	apply (simp add: sums_def)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	309	apply (drule LIMSEQ_const [THEN [2] LIMSEQ_add, where b = "- exp x"])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	310	apply (simp add: LIMSEQ_NSLIMSEQ_iff)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	311	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	312
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	313	lemma starfun_exp_ge_add_one_self [simp]: "0 \<le> x ==> (1 + x) \<le> ( f exp) x"
14468 6be497cacab5 heavy tidying paulson parents: 14430 diff changeset	314	apply (cases x)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	315	apply (simp add: starfun hypreal_add hypreal_le hypreal_zero_num hypreal_one_num, ultra)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	316	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	317
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	318	(* exp (oo) is infinite *)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	319	lemma starfun_exp_HInfinite:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	320	"[\| x \<in> HInfinite; 0 \<le> x \|] ==> ( f exp) x \<in> HInfinite"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	321	apply (frule starfun_exp_ge_add_one_self)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	322	apply (rule HInfinite_ge_HInfinite, assumption)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	323	apply (rule order_trans [of _ "1+x"], auto)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	324	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	325
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	326	lemma starfun_exp_minus: "( f exp) (-x) = inverse(( f exp) x)"
14468 6be497cacab5 heavy tidying paulson parents: 14430 diff changeset	327	apply (cases x)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	328	apply (simp add: starfun hypreal_inverse hypreal_minus exp_minus)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	329	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	330
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	331	(* exp (-oo) is infinitesimal *)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	332	lemma starfun_exp_Infinitesimal:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	333	"[\| x \<in> HInfinite; x \<le> 0 \|] ==> ( f exp) x \<in> Infinitesimal"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	334	apply (subgoal_tac "\<exists>y. x = - y")
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	335	apply (rule_tac [2] x = "- x" in exI)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	336	apply (auto intro!: HInfinite_inverse_Infinitesimal starfun_exp_HInfinite
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	337	simp add: starfun_exp_minus HInfinite_minus_iff)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	338	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	339
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	340	lemma starfun_exp_gt_one [simp]: "0 < x ==> 1 < ( f exp) x"
14468 6be497cacab5 heavy tidying paulson parents: 14430 diff changeset	341	apply (cases x)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	342	apply (simp add: starfun hypreal_one_num hypreal_zero_num hypreal_less, ultra)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	343	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	344
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	345	(* needs derivative of inverse function
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	346	TRY a NS one today!!!
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	347
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	348	Goal "x @= 1 ==> ( f ln) x @= 1"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	349	by (res_inst_tac [("z","x")] eq_Abs_hypreal 1);
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	350	by (auto_tac (claset(),simpset() addsimps [hypreal_one_def]));
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	351
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	352
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	353	Goalw [nsderiv_def] "0r < x ==> NSDERIV ln x :> inverse x";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	354
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	355	*)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	356
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	357
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	358	lemma starfun_ln_exp [simp]: "( f ln) (( f exp) x) = x"
14468 6be497cacab5 heavy tidying paulson parents: 14430 diff changeset	359	apply (cases x)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	360	apply (simp add: starfun)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	361	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	362
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	363	lemma starfun_exp_ln_iff [simp]: "(( f exp)(( f ln) x) = x) = (0 < x)"
14468 6be497cacab5 heavy tidying paulson parents: 14430 diff changeset	364	apply (cases x)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	365	apply (simp add: starfun hypreal_zero_num hypreal_less)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	366	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	367
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	368	lemma starfun_exp_ln_eq: "( f exp) u = x ==> ( f ln) x = u"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	369	by (auto simp add: starfun)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	370
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	371	lemma starfun_ln_less_self [simp]: "0 < x ==> ( f ln) x < x"
14468 6be497cacab5 heavy tidying paulson parents: 14430 diff changeset	372	apply (cases x)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	373	apply (simp add: starfun hypreal_zero_num hypreal_less, ultra)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	374	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	375
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	376	lemma starfun_ln_ge_zero [simp]: "1 \<le> x ==> 0 \<le> ( f ln) x"
14468 6be497cacab5 heavy tidying paulson parents: 14430 diff changeset	377	apply (cases x)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	378	apply (simp add: starfun hypreal_zero_num hypreal_le hypreal_one_num, ultra)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	379	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	380
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	381	lemma starfun_ln_gt_zero [simp]: "1 < x ==> 0 < ( f ln) x"
14468 6be497cacab5 heavy tidying paulson parents: 14430 diff changeset	382	apply (cases x)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	383	apply (simp add: starfun hypreal_zero_num hypreal_less hypreal_one_num, ultra)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	384	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	385
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	386	lemma starfun_ln_not_eq_zero [simp]: "[\| 0 < x; x \<noteq> 1 \|] ==> ( f ln) x \<noteq> 0"
14468 6be497cacab5 heavy tidying paulson parents: 14430 diff changeset	387	apply (cases x)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	388	apply (auto simp add: starfun hypreal_zero_num hypreal_less hypreal_one_num, ultra)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	389	apply (auto dest: ln_not_eq_zero)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	390	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	391
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	392	lemma starfun_ln_HFinite: "[\| x \<in> HFinite; 1 \<le> x \|] ==> ( f ln) x \<in> HFinite"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	393	apply (rule HFinite_bounded)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	394	apply (rule_tac [2] order_less_imp_le)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	395	apply (rule_tac [2] starfun_ln_less_self)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	396	apply (rule_tac [2] order_less_le_trans, auto)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	397	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	398
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	399	lemma starfun_ln_inverse: "0 < x ==> ( f ln) (inverse x) = -( f ln) x"
14468 6be497cacab5 heavy tidying paulson parents: 14430 diff changeset	400	apply (cases x)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	401	apply (simp add: starfun hypreal_zero_num hypreal_minus hypreal_inverse hypreal_less, ultra)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	402	apply (simp add: ln_inverse)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	403	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	404
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	405	lemma starfun_exp_HFinite: "x \<in> HFinite ==> ( f exp) x \<in> HFinite"
14468 6be497cacab5 heavy tidying paulson parents: 14430 diff changeset	406	apply (cases x)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	407	apply (auto simp add: starfun HFinite_FreeUltrafilterNat_iff)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	408	apply (rule bexI, rule_tac [2] lemma_hyprel_refl, auto)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	409	apply (rule_tac x = "exp u" in exI)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	410	apply (ultra, arith)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	411	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	412
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	413	lemma starfun_exp_add_HFinite_Infinitesimal_approx:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	414	"[\|x \<in> Infinitesimal; z \<in> HFinite \|] ==> ( f exp) (z + x) @= ( f exp) z"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	415	apply (simp add: STAR_exp_add)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	416	apply (frule STAR_exp_Infinitesimal)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	417	apply (drule approx_mult2)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	418	apply (auto intro: starfun_exp_HFinite)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	419	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	420
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	421	(* using previous result to get to result *)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	422	lemma starfun_ln_HInfinite:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	423	"[\| x \<in> HInfinite; 0 < x \|] ==> ( f ln) x \<in> HInfinite"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	424	apply (rule ccontr, drule HFinite_HInfinite_iff [THEN iffD2])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	425	apply (drule starfun_exp_HFinite)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	426	apply (simp add: starfun_exp_ln_iff [THEN iffD2] HFinite_HInfinite_iff)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	427	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	428
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	429	lemma starfun_exp_HInfinite_Infinitesimal_disj:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	430	"x \<in> HInfinite ==> ( f exp) x \<in> HInfinite \| ( f exp) x \<in> Infinitesimal"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	431	apply (insert linorder_linear [of x 0])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	432	apply (auto intro: starfun_exp_HInfinite starfun_exp_Infinitesimal)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	433	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	434
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	435	(* check out this proof!!! *)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	436	lemma starfun_ln_HFinite_not_Infinitesimal:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	437	"[\| x \<in> HFinite - Infinitesimal; 0 < x \|] ==> ( f ln) x \<in> HFinite"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	438	apply (rule ccontr, drule HInfinite_HFinite_iff [THEN iffD2])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	439	apply (drule starfun_exp_HInfinite_Infinitesimal_disj)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	440	apply (simp add: starfun_exp_ln_iff [symmetric] HInfinite_HFinite_iff
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	441	del: starfun_exp_ln_iff)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	442	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	443
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	444	(* we do proof by considering ln of 1/x *)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	445	lemma starfun_ln_Infinitesimal_HInfinite:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	446	"[\| x \<in> Infinitesimal; 0 < x \|] ==> ( f ln) x \<in> HInfinite"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	447	apply (drule Infinitesimal_inverse_HInfinite)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	448	apply (frule positive_imp_inverse_positive)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	449	apply (drule_tac [2] starfun_ln_HInfinite)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	450	apply (auto simp add: starfun_ln_inverse HInfinite_minus_iff)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	451	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	452
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	453	lemma starfun_ln_less_zero: "[\| 0 < x; x < 1 \|] ==> ( f ln) x < 0"
14468 6be497cacab5 heavy tidying paulson parents: 14430 diff changeset	454	apply (cases x)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	455	apply (simp add: hypreal_zero_num hypreal_one_num hypreal_less starfun, ultra)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	456	apply (auto intro: ln_less_zero)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	457	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	458
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	459	lemma starfun_ln_Infinitesimal_less_zero:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	460	"[\| x \<in> Infinitesimal; 0 < x \|] ==> ( f ln) x < 0"
15229 1eb23f805c06 new simprules for abs and for things like a/b<1 paulson parents: 15140 diff changeset	461	by (auto intro!: starfun_ln_less_zero simp add: Infinitesimal_def)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	462
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	463	lemma starfun_ln_HInfinite_gt_zero:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	464	"[\| x \<in> HInfinite; 0 < x \|] ==> 0 < ( f ln) x"
15229 1eb23f805c06 new simprules for abs and for things like a/b<1 paulson parents: 15140 diff changeset	465	by (auto intro!: starfun_ln_gt_zero simp add: HInfinite_def)
1eb23f805c06 new simprules for abs and for things like a/b<1 paulson parents: 15140 diff changeset	466
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	467
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	468	(*
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	469	Goalw [NSLIM_def] "(%h. ((x powr h) - 1) / h) -- 0 --NS> ln x"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	470	*)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	471
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	472	lemma HFinite_sin [simp]:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	473	"sumhr (0, whn, %n. (if even(n) then 0 else
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	474	((- 1) ^ ((n - 1) div 2))/(real (fact n))) * x ^ n)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	475	\<in> HFinite"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	476	apply (auto intro!: NSBseq_HFinite_hypreal NSconvergent_NSBseq
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	477	simp add: starfunNat_sumr [symmetric] starfunNat hypnat_omega_def
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	478	convergent_NSconvergent_iff [symmetric]
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	479	summable_convergent_sumr_iff [symmetric])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	480	apply (simp only: One_nat_def summable_sin)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	481	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	482
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	483	lemma STAR_sin_zero [simp]: "( f sin) 0 = 0"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	484	by (simp add: starfun hypreal_zero_num)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	485
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	486	lemma STAR_sin_Infinitesimal [simp]: "x \<in> Infinitesimal ==> ( f sin) x @= x"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	487	apply (case_tac "x = 0")
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	488	apply (cut_tac [2] x = 0 in DERIV_sin)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	489	apply (auto simp add: NSDERIV_DERIV_iff [symmetric] nsderiv_def hypreal_of_real_zero)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	490	apply (drule bspec [where x = x], auto)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	491	apply (drule approx_mult1 [where c = x])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	492	apply (auto intro: Infinitesimal_subset_HFinite [THEN subsetD]
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	493	simp add: mult_assoc)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	494	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	495
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	496	lemma HFinite_cos [simp]:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	497	"sumhr (0, whn, %n. (if even(n) then
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	498	((- 1) ^ (n div 2))/(real (fact n)) else
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	499	0) * x ^ n) \<in> HFinite"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	500	by (auto intro!: NSBseq_HFinite_hypreal NSconvergent_NSBseq
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	501	simp add: starfunNat_sumr [symmetric] starfunNat hypnat_omega_def
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	502	convergent_NSconvergent_iff [symmetric]
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	503	summable_convergent_sumr_iff [symmetric] summable_cos)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	504
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	505	lemma STAR_cos_zero [simp]: "( f cos) 0 = 1"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	506	by (simp add: starfun hypreal_zero_num hypreal_one_num)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	507
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	508	lemma STAR_cos_Infinitesimal [simp]: "x \<in> Infinitesimal ==> ( f cos) x @= 1"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	509	apply (case_tac "x = 0")
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	510	apply (cut_tac [2] x = 0 in DERIV_cos)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	511	apply (auto simp add: NSDERIV_DERIV_iff [symmetric] nsderiv_def hypreal_of_real_zero)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	512	apply (drule bspec [where x = x])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	513	apply (auto simp add: hypreal_of_real_zero hypreal_of_real_one)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	514	apply (drule approx_mult1 [where c = x])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	515	apply (auto intro: Infinitesimal_subset_HFinite [THEN subsetD]
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	516	simp add: mult_assoc hypreal_of_real_one)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	517	apply (rule approx_add_right_cancel [where d = "-1"], auto)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	518	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	519
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	520	lemma STAR_tan_zero [simp]: "( f tan) 0 = 0"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	521	by (simp add: starfun hypreal_zero_num)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	522
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	523	lemma STAR_tan_Infinitesimal: "x \<in> Infinitesimal ==> ( f tan) x @= x"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	524	apply (case_tac "x = 0")
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	525	apply (cut_tac [2] x = 0 in DERIV_tan)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	526	apply (auto simp add: NSDERIV_DERIV_iff [symmetric] nsderiv_def hypreal_of_real_zero)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	527	apply (drule bspec [where x = x], auto)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	528	apply (drule approx_mult1 [where c = x])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	529	apply (auto intro: Infinitesimal_subset_HFinite [THEN subsetD]
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	530	simp add: mult_assoc)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	531	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	532
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	533	lemma STAR_sin_cos_Infinitesimal_mult:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	534	"x \<in> Infinitesimal ==> ( f sin) x * ( f cos) x @= x"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	535	apply (insert approx_mult_HFinite [of "( f sin) x" _ "( f cos) x" 1])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	536	apply (simp add: Infinitesimal_subset_HFinite [THEN subsetD])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	537	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	538
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	539	lemma HFinite_pi: "hypreal_of_real pi \<in> HFinite"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	540	by simp
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	541
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	542	(* lemmas *)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	543
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	544	lemma lemma_split_hypreal_of_real:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	545	"N \<in> HNatInfinite
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	546	==> hypreal_of_real a =
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	547	hypreal_of_hypnat N * (inverse(hypreal_of_hypnat N) * hypreal_of_real a)"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	548	by (simp add: mult_assoc [symmetric] HNatInfinite_not_eq_zero)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	549
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	550	lemma STAR_sin_Infinitesimal_divide:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	551	"[\|x \<in> Infinitesimal; x \<noteq> 0 \|] ==> ( f sin) x/x @= 1"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	552	apply (cut_tac x = 0 in DERIV_sin)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	553	apply (simp add: NSDERIV_DERIV_iff [symmetric] nsderiv_def hypreal_of_real_zero hypreal_of_real_one)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	554	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	555
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	556	(------------------------------------------------------------------------)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	557	(* sin* (1/n) * 1/(1/n) @= 1 for n = oo *)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	558	(------------------------------------------------------------------------)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	559
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	560	lemma lemma_sin_pi:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	561	"n \<in> HNatInfinite
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	562	==> ( f sin) (inverse (hypreal_of_hypnat n))/(inverse (hypreal_of_hypnat n)) @= 1"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	563	apply (rule STAR_sin_Infinitesimal_divide)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	564	apply (auto simp add: HNatInfinite_not_eq_zero)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	565	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	566
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	567	lemma STAR_sin_inverse_HNatInfinite:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	568	"n \<in> HNatInfinite
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	569	==> ( f sin) (inverse (hypreal_of_hypnat n)) * hypreal_of_hypnat n @= 1"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	570	apply (frule lemma_sin_pi)
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14420 diff changeset	571	apply (simp add: divide_inverse)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	572	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	573
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	574	lemma Infinitesimal_pi_divide_HNatInfinite:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	575	"N \<in> HNatInfinite
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	576	==> hypreal_of_real pi/(hypreal_of_hypnat N) \<in> Infinitesimal"
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14420 diff changeset	577	apply (simp add: divide_inverse)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	578	apply (auto intro: Infinitesimal_HFinite_mult2)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	579	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	580
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	581	lemma pi_divide_HNatInfinite_not_zero [simp]:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	582	"N \<in> HNatInfinite ==> hypreal_of_real pi/(hypreal_of_hypnat N) \<noteq> 0"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	583	by (simp add: HNatInfinite_not_eq_zero)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	584
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	585	lemma STAR_sin_pi_divide_HNatInfinite_approx_pi:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	586	"n \<in> HNatInfinite
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	587	==> ( f sin) (hypreal_of_real pi/(hypreal_of_hypnat n)) * hypreal_of_hypnat n
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	588	@= hypreal_of_real pi"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	589	apply (frule STAR_sin_Infinitesimal_divide
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	590	[OF Infinitesimal_pi_divide_HNatInfinite
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	591	pi_divide_HNatInfinite_not_zero])
14477 cc61fd03e589 conversion of Hyperreal/Lim to new-style paulson parents: 14468 diff changeset	592	apply (auto simp add: inverse_mult_distrib)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	593	apply (rule approx_SReal_mult_cancel [of "inverse (hypreal_of_real pi)"])
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14420 diff changeset	594	apply (auto intro: SReal_inverse simp add: divide_inverse mult_ac)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	595	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	596
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	597	lemma STAR_sin_pi_divide_HNatInfinite_approx_pi2:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	598	"n \<in> HNatInfinite
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	599	==> hypreal_of_hypnat n *
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	600	( f sin) (hypreal_of_real pi/(hypreal_of_hypnat n))
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	601	@= hypreal_of_real pi"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	602	apply (rule mult_commute [THEN subst])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	603	apply (erule STAR_sin_pi_divide_HNatInfinite_approx_pi)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	604	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	605
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	606	lemma starfunNat_pi_divide_n_Infinitesimal:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	607	"N \<in> HNatInfinite ==> ( fNat (%x. pi / real x)) N \<in> Infinitesimal"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	608	by (auto intro!: Infinitesimal_HFinite_mult2
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14420 diff changeset	609	simp add: starfunNat_mult [symmetric] divide_inverse
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	610	starfunNat_inverse [symmetric] starfunNat_real_of_nat)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	611
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	612	lemma STAR_sin_pi_divide_n_approx:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	613	"N \<in> HNatInfinite ==>
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	614	( f sin) (( fNat (%x. pi / real x)) N) @=
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	615	hypreal_of_real pi/(hypreal_of_hypnat N)"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	616	by (auto intro!: STAR_sin_Infinitesimal Infinitesimal_HFinite_mult2
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14420 diff changeset	617	simp add: starfunNat_mult [symmetric] divide_inverse
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	618	starfunNat_inverse_real_of_nat_eq)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	619
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	620	lemma NSLIMSEQ_sin_pi: "(%n. real n * sin (pi / real n)) ----NS> pi"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	621	apply (auto simp add: NSLIMSEQ_def starfunNat_mult [symmetric] starfunNat_real_of_nat)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	622	apply (rule_tac f1 = sin in starfun_stafunNat_o2 [THEN subst])
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14420 diff changeset	623	apply (auto simp add: starfunNat_mult [symmetric] starfunNat_real_of_nat divide_inverse)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	624	apply (rule_tac f1 = inverse in starfun_stafunNat_o2 [THEN subst])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	625	apply (auto dest: STAR_sin_pi_divide_HNatInfinite_approx_pi
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14420 diff changeset	626	simp add: starfunNat_real_of_nat mult_commute divide_inverse)
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	627	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	628
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	629	lemma NSLIMSEQ_cos_one: "(%n. cos (pi / real n))----NS> 1"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	630	apply (simp add: NSLIMSEQ_def, auto)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	631	apply (rule_tac f1 = cos in starfun_stafunNat_o2 [THEN subst])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	632	apply (rule STAR_cos_Infinitesimal)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	633	apply (auto intro!: Infinitesimal_HFinite_mult2
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14420 diff changeset	634	simp add: starfunNat_mult [symmetric] divide_inverse
14420 4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	635	starfunNat_inverse [symmetric] starfunNat_real_of_nat)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	636	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	637
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	638	lemma NSLIMSEQ_sin_cos_pi:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	639	"(%n. real n * sin (pi / real n) * cos (pi / real n)) ----NS> pi"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	640	by (insert NSLIMSEQ_mult [OF NSLIMSEQ_sin_pi NSLIMSEQ_cos_one], simp)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	641
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	642
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	643	text{A familiar approximation to @{term "cos x"} when @{term x} is small}
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	644
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	645	lemma STAR_cos_Infinitesimal_approx:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	646	"x \<in> Infinitesimal ==> ( f cos) x @= 1 - x ^ 2"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	647	apply (rule STAR_cos_Infinitesimal [THEN approx_trans])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	648	apply (auto simp add: Infinitesimal_approx_minus [symmetric]
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	649	diff_minus add_assoc [symmetric] numeral_2_eq_2)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	650	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	651
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	652	lemma STAR_cos_Infinitesimal_approx2:
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	653	"x \<in> Infinitesimal ==> ( f cos) x @= 1 - (x ^ 2)/2"
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	654	apply (rule STAR_cos_Infinitesimal [THEN approx_trans])
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	655	apply (auto intro: Infinitesimal_SReal_divide
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	656	simp add: Infinitesimal_approx_minus [symmetric] numeral_2_eq_2)
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	657	done
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	658
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	659	ML
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	660	{*
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	661	val STAR_sqrt_zero = thm "STAR_sqrt_zero";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	662	val STAR_sqrt_one = thm "STAR_sqrt_one";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	663	val hypreal_sqrt_pow2_iff = thm "hypreal_sqrt_pow2_iff";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	664	val hypreal_sqrt_gt_zero_pow2 = thm "hypreal_sqrt_gt_zero_pow2";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	665	val hypreal_sqrt_pow2_gt_zero = thm "hypreal_sqrt_pow2_gt_zero";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	666	val hypreal_sqrt_not_zero = thm "hypreal_sqrt_not_zero";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	667	val hypreal_inverse_sqrt_pow2 = thm "hypreal_inverse_sqrt_pow2";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	668	val hypreal_sqrt_mult_distrib = thm "hypreal_sqrt_mult_distrib";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	669	val hypreal_sqrt_mult_distrib2 = thm "hypreal_sqrt_mult_distrib2";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	670	val hypreal_sqrt_approx_zero = thm "hypreal_sqrt_approx_zero";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	671	val hypreal_sqrt_approx_zero2 = thm "hypreal_sqrt_approx_zero2";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	672	val hypreal_sqrt_sum_squares = thm "hypreal_sqrt_sum_squares";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	673	val hypreal_sqrt_sum_squares2 = thm "hypreal_sqrt_sum_squares2";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	674	val hypreal_sqrt_gt_zero = thm "hypreal_sqrt_gt_zero";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	675	val hypreal_sqrt_ge_zero = thm "hypreal_sqrt_ge_zero";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	676	val hypreal_sqrt_hrabs = thm "hypreal_sqrt_hrabs";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	677	val hypreal_sqrt_hrabs2 = thm "hypreal_sqrt_hrabs2";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	678	val hypreal_sqrt_hyperpow_hrabs = thm "hypreal_sqrt_hyperpow_hrabs";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	679	val star_sqrt_HFinite = thm "star_sqrt_HFinite";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	680	val st_hypreal_sqrt = thm "st_hypreal_sqrt";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	681	val hypreal_sqrt_sum_squares_ge1 = thm "hypreal_sqrt_sum_squares_ge1";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	682	val HFinite_hypreal_sqrt = thm "HFinite_hypreal_sqrt";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	683	val HFinite_hypreal_sqrt_imp_HFinite = thm "HFinite_hypreal_sqrt_imp_HFinite";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	684	val HFinite_hypreal_sqrt_iff = thm "HFinite_hypreal_sqrt_iff";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	685	val HFinite_sqrt_sum_squares = thm "HFinite_sqrt_sum_squares";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	686	val Infinitesimal_hypreal_sqrt = thm "Infinitesimal_hypreal_sqrt";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	687	val Infinitesimal_hypreal_sqrt_imp_Infinitesimal = thm "Infinitesimal_hypreal_sqrt_imp_Infinitesimal";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	688	val Infinitesimal_hypreal_sqrt_iff = thm "Infinitesimal_hypreal_sqrt_iff";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	689	val Infinitesimal_sqrt_sum_squares = thm "Infinitesimal_sqrt_sum_squares";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	690	val HInfinite_hypreal_sqrt = thm "HInfinite_hypreal_sqrt";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	691	val HInfinite_hypreal_sqrt_imp_HInfinite = thm "HInfinite_hypreal_sqrt_imp_HInfinite";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	692	val HInfinite_hypreal_sqrt_iff = thm "HInfinite_hypreal_sqrt_iff";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	693	val HInfinite_sqrt_sum_squares = thm "HInfinite_sqrt_sum_squares";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	694	val HFinite_exp = thm "HFinite_exp";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	695	val exphr_zero = thm "exphr_zero";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	696	val coshr_zero = thm "coshr_zero";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	697	val STAR_exp_zero_approx_one = thm "STAR_exp_zero_approx_one";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	698	val STAR_exp_Infinitesimal = thm "STAR_exp_Infinitesimal";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	699	val STAR_exp_epsilon = thm "STAR_exp_epsilon";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	700	val STAR_exp_add = thm "STAR_exp_add";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	701	val exphr_hypreal_of_real_exp_eq = thm "exphr_hypreal_of_real_exp_eq";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	702	val starfun_exp_ge_add_one_self = thm "starfun_exp_ge_add_one_self";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	703	val starfun_exp_HInfinite = thm "starfun_exp_HInfinite";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	704	val starfun_exp_minus = thm "starfun_exp_minus";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	705	val starfun_exp_Infinitesimal = thm "starfun_exp_Infinitesimal";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	706	val starfun_exp_gt_one = thm "starfun_exp_gt_one";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	707	val starfun_ln_exp = thm "starfun_ln_exp";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	708	val starfun_exp_ln_iff = thm "starfun_exp_ln_iff";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	709	val starfun_exp_ln_eq = thm "starfun_exp_ln_eq";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	710	val starfun_ln_less_self = thm "starfun_ln_less_self";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	711	val starfun_ln_ge_zero = thm "starfun_ln_ge_zero";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	712	val starfun_ln_gt_zero = thm "starfun_ln_gt_zero";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	713	val starfun_ln_not_eq_zero = thm "starfun_ln_not_eq_zero";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	714	val starfun_ln_HFinite = thm "starfun_ln_HFinite";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	715	val starfun_ln_inverse = thm "starfun_ln_inverse";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	716	val starfun_exp_HFinite = thm "starfun_exp_HFinite";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	717	val starfun_exp_add_HFinite_Infinitesimal_approx = thm "starfun_exp_add_HFinite_Infinitesimal_approx";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	718	val starfun_ln_HInfinite = thm "starfun_ln_HInfinite";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	719	val starfun_exp_HInfinite_Infinitesimal_disj = thm "starfun_exp_HInfinite_Infinitesimal_disj";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	720	val starfun_ln_HFinite_not_Infinitesimal = thm "starfun_ln_HFinite_not_Infinitesimal";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	721	val starfun_ln_Infinitesimal_HInfinite = thm "starfun_ln_Infinitesimal_HInfinite";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	722	val starfun_ln_less_zero = thm "starfun_ln_less_zero";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	723	val starfun_ln_Infinitesimal_less_zero = thm "starfun_ln_Infinitesimal_less_zero";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	724	val starfun_ln_HInfinite_gt_zero = thm "starfun_ln_HInfinite_gt_zero";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	725	val HFinite_sin = thm "HFinite_sin";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	726	val STAR_sin_zero = thm "STAR_sin_zero";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	727	val STAR_sin_Infinitesimal = thm "STAR_sin_Infinitesimal";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	728	val HFinite_cos = thm "HFinite_cos";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	729	val STAR_cos_zero = thm "STAR_cos_zero";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	730	val STAR_cos_Infinitesimal = thm "STAR_cos_Infinitesimal";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	731	val STAR_tan_zero = thm "STAR_tan_zero";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	732	val STAR_tan_Infinitesimal = thm "STAR_tan_Infinitesimal";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	733	val STAR_sin_cos_Infinitesimal_mult = thm "STAR_sin_cos_Infinitesimal_mult";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	734	val HFinite_pi = thm "HFinite_pi";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	735	val lemma_split_hypreal_of_real = thm "lemma_split_hypreal_of_real";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	736	val STAR_sin_Infinitesimal_divide = thm "STAR_sin_Infinitesimal_divide";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	737	val lemma_sin_pi = thm "lemma_sin_pi";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	738	val STAR_sin_inverse_HNatInfinite = thm "STAR_sin_inverse_HNatInfinite";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	739	val Infinitesimal_pi_divide_HNatInfinite = thm "Infinitesimal_pi_divide_HNatInfinite";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	740	val pi_divide_HNatInfinite_not_zero = thm "pi_divide_HNatInfinite_not_zero";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	741	val STAR_sin_pi_divide_HNatInfinite_approx_pi = thm "STAR_sin_pi_divide_HNatInfinite_approx_pi";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	742	val STAR_sin_pi_divide_HNatInfinite_approx_pi2 = thm "STAR_sin_pi_divide_HNatInfinite_approx_pi2";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	743	val starfunNat_pi_divide_n_Infinitesimal = thm "starfunNat_pi_divide_n_Infinitesimal";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	744	val STAR_sin_pi_divide_n_approx = thm "STAR_sin_pi_divide_n_approx";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	745	val NSLIMSEQ_sin_pi = thm "NSLIMSEQ_sin_pi";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	746	val NSLIMSEQ_cos_one = thm "NSLIMSEQ_cos_one";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	747	val NSLIMSEQ_sin_cos_pi = thm "NSLIMSEQ_sin_cos_pi";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	748	val STAR_cos_Infinitesimal_approx = thm "STAR_cos_Infinitesimal_approx";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	749	val STAR_cos_Infinitesimal_approx2 = thm "STAR_cos_Infinitesimal_approx2";
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	750	*}
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	751
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	752
4e72cd222e0b converted Hyperreal/HTranscendental to Isar script paulson parents: 13958 diff changeset	753	end

author	paulson
	Tue, 05 Oct 2004 15:30:50 +0200
changeset 15229	1eb23f805c06
parent 15140	322485b816ac
child 15234	ec91a90c604e
permissions	-rw-r--r--