isabelle: src/HOL/Hyperreal/MacLaurin.thy@cdfff0241c12 (annotated)

15944 9b00875e21f7 from simplesubst to new subst paulson parents: 15561 diff changeset	1	(* ID : $Id$
12224 02df7cbe7d25 even more theories from Jacques paulson parents: diff changeset	2	Author : Jacques D. Fleuriot
02df7cbe7d25 even more theories from Jacques paulson parents: diff changeset	3	Copyright : 2001 University of Edinburgh
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	4	Conversion to Isar and new proofs by Lawrence C Paulson, 2004
12224 02df7cbe7d25 even more theories from Jacques paulson parents: diff changeset	5	*)
02df7cbe7d25 even more theories from Jacques paulson parents: diff changeset	6
15944 9b00875e21f7 from simplesubst to new subst paulson parents: 15561 diff changeset	7	header{MacLaurin Series}
9b00875e21f7 from simplesubst to new subst paulson parents: 15561 diff changeset	8
15131 c69542757a4d New theory header syntax. nipkow parents: 15081 diff changeset	9	theory MacLaurin
22983 3314057c3b57 minimize imports huffman parents: 21782 diff changeset	10	imports Transcendental
15131 c69542757a4d New theory header syntax. nipkow parents: 15081 diff changeset	11	begin
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	12
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	13	subsection{Maclaurin's Theorem with Lagrange Form of Remainder}
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	14
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	15	text{*This is a very long, messy proof even now that it's been broken down
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	16	into lemmas.*}
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	17
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	18	lemma Maclaurin_lemma:
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	19	"0 < h ==>
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	20	\<exists>B. f h = (\<Sum>m=0..<n. (j m / real (fact m)) * (h^m)) +
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	21	(B * ((h^n) / real(fact n)))"
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	22	apply (rule_tac x = "(f h - (\<Sum>m=0..<n. (j m / real (fact m)) * h^m)) *
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	23	real(fact n) / (h^n)"
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	24	in exI)
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	25	apply (simp)
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	26	done
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	27
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	28	lemma eq_diff_eq': "(x = y - z) = (y = x + (z::real))"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	29	by arith
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	30
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	31	text{A crude tactic to differentiate by proof.}
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	32	ML
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	33	{*
19765 dfe940911617 misc cleanup; wenzelm parents: 16924 diff changeset	34	local
dfe940911617 misc cleanup; wenzelm parents: 16924 diff changeset	35	val deriv_rulesI =
23069 cdfff0241c12 rename lemmas LIM_ident, isCont_ident, DERIV_ident huffman parents: 22985 diff changeset	36	[thm "DERIV_ident", thm "DERIV_const", thm "DERIV_cos", thm "DERIV_cmult",
19765 dfe940911617 misc cleanup; wenzelm parents: 16924 diff changeset	37	thm "DERIV_sin", thm "DERIV_exp", thm "DERIV_inverse", thm "DERIV_pow",
dfe940911617 misc cleanup; wenzelm parents: 16924 diff changeset	38	thm "DERIV_add", thm "DERIV_diff", thm "DERIV_mult", thm "DERIV_minus",
dfe940911617 misc cleanup; wenzelm parents: 16924 diff changeset	39	thm "DERIV_inverse_fun", thm "DERIV_quotient", thm "DERIV_fun_pow",
dfe940911617 misc cleanup; wenzelm parents: 16924 diff changeset	40	thm "DERIV_fun_exp", thm "DERIV_fun_sin", thm "DERIV_fun_cos",
23069 cdfff0241c12 rename lemmas LIM_ident, isCont_ident, DERIV_ident huffman parents: 22985 diff changeset	41	thm "DERIV_ident", thm "DERIV_const", thm "DERIV_cos"];
19765 dfe940911617 misc cleanup; wenzelm parents: 16924 diff changeset	42
dfe940911617 misc cleanup; wenzelm parents: 16924 diff changeset	43	val DERIV_chain2 = thm "DERIV_chain2";
dfe940911617 misc cleanup; wenzelm parents: 16924 diff changeset	44
dfe940911617 misc cleanup; wenzelm parents: 16924 diff changeset	45	in
dfe940911617 misc cleanup; wenzelm parents: 16924 diff changeset	46
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	47	exception DERIV_name;
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	48	fun get_fun_name (_ $ (Const ("Lim.deriv",_) $ Abs(_,_, Const (f,_) $ _) $ _ $ _)) = f
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	49	\| get_fun_name (_ $ (_ $ (Const ("Lim.deriv",_) $ Abs(_,_, Const (f,_) $ _) $ _ $ _))) = f
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	50	\| get_fun_name _ = raise DERIV_name;
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	51
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	52	val deriv_tac =
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	53	SUBGOAL (fn (prem,i) =>
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	54	(resolve_tac deriv_rulesI i) ORELSE
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	55	((rtac (read_instantiate [("f",get_fun_name prem)]
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	56	DERIV_chain2) i) handle DERIV_name => no_tac));;
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	57
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	58	val DERIV_tac = ALLGOALS(fn i => REPEAT(deriv_tac i));
19765 dfe940911617 misc cleanup; wenzelm parents: 16924 diff changeset	59
dfe940911617 misc cleanup; wenzelm parents: 16924 diff changeset	60	end
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	61	*}
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	62
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	63	lemma Maclaurin_lemma2:
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	64	"[\| \<forall>m t. m < n \<and> 0\<le>t \<and> t\<le>h \<longrightarrow> DERIV (diff m) t :> diff (Suc m) t;
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	65	n = Suc k;
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	66	difg =
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	67	(\<lambda>m t. diff m t -
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	68	((\<Sum>p = 0..<n - m. diff (m + p) 0 / real (fact p) * t ^ p) +
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	69	B * (t ^ (n - m) / real (fact (n - m)))))\|] ==>
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	70	\<forall>m t. m < n & 0 \<le> t & t \<le> h -->
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	71	DERIV (difg m) t :> difg (Suc m) t"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	72	apply clarify
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	73	apply (rule DERIV_diff)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	74	apply (simp (no_asm_simp))
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	75	apply (tactic DERIV_tac)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	76	apply (tactic DERIV_tac)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	77	apply (rule_tac [2] lemma_DERIV_subst)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	78	apply (rule_tac [2] DERIV_quotient)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	79	apply (rule_tac [3] DERIV_const)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	80	apply (rule_tac [2] DERIV_pow)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	81	prefer 3 apply (simp add: fact_diff_Suc)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	82	prefer 2 apply simp
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	83	apply (frule_tac m = m in less_add_one, clarify)
15561 045a07ac35a7 another reorganization of setsums and intervals nipkow parents: 15539 diff changeset	84	apply (simp del: setsum_op_ivl_Suc)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	85	apply (insert sumr_offset4 [of 1])
15561 045a07ac35a7 another reorganization of setsums and intervals nipkow parents: 15539 diff changeset	86	apply (simp del: setsum_op_ivl_Suc fact_Suc realpow_Suc)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	87	apply (rule lemma_DERIV_subst)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	88	apply (rule DERIV_add)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	89	apply (rule_tac [2] DERIV_const)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	90	apply (rule DERIV_sumr, clarify)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	91	prefer 2 apply simp
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	92	apply (simp (no_asm) add: divide_inverse mult_assoc del: fact_Suc realpow_Suc)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	93	apply (rule DERIV_cmult)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	94	apply (rule lemma_DERIV_subst)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	95	apply (best intro: DERIV_chain2 intro!: DERIV_intros)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	96	apply (subst fact_Suc)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	97	apply (subst real_of_nat_mult)
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	98	apply (simp add: mult_ac)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	99	done
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	100
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	101
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	102	lemma Maclaurin_lemma3:
20792 add17d26151b add type annotations for DERIV huffman parents: 20217 diff changeset	103	fixes difg :: "nat => real => real" shows
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	104	"[\|\<forall>k t. k < Suc m \<and> 0\<le>t & t\<le>h \<longrightarrow> DERIV (difg k) t :> difg (Suc k) t;
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	105	\<forall>k<Suc m. difg k 0 = 0; DERIV (difg n) t :> 0; n < m; 0 < t;
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	106	t < h\|]
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	107	==> \<exists>ta. 0 < ta & ta < t & DERIV (difg (Suc n)) ta :> 0"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	108	apply (rule Rolle, assumption, simp)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	109	apply (drule_tac x = n and P="%k. k<Suc m --> difg k 0 = 0" in spec)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	110	apply (rule DERIV_unique)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	111	prefer 2 apply assumption
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	112	apply force
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	113	apply (subgoal_tac "\<forall>ta. 0 \<le> ta & ta \<le> t --> (difg (Suc n)) differentiable ta")
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	114	apply (simp add: differentiable_def)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	115	apply (blast dest!: DERIV_isCont)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	116	apply (simp add: differentiable_def, clarify)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	117	apply (rule_tac x = "difg (Suc (Suc n)) ta" in exI)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	118	apply force
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	119	apply (simp add: differentiable_def, clarify)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	120	apply (rule_tac x = "difg (Suc (Suc n)) x" in exI)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	121	apply force
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	122	done
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 12224 diff changeset	123
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	124	lemma Maclaurin:
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	125	"[\| 0 < h; 0 < n; diff 0 = f;
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	126	\<forall>m t. m < n & 0 \<le> t & t \<le> h --> DERIV (diff m) t :> diff (Suc m) t \|]
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	127	==> \<exists>t. 0 < t &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	128	t < h &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	129	f h =
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	130	setsum (%m. (diff m 0 / real (fact m)) * h ^ m) {0..<n} +
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	131	(diff n t / real (fact n)) * h ^ n"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	132	apply (case_tac "n = 0", force)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	133	apply (drule not0_implies_Suc)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	134	apply (erule exE)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	135	apply (frule_tac f=f and n=n and j="%m. diff m 0" in Maclaurin_lemma)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	136	apply (erule exE)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	137	apply (subgoal_tac "\<exists>g.
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	138	g = (%t. f t - (setsum (%m. (diff m 0 / real(fact m)) * t^m) {0..<n} + (B * (t^n / real(fact n)))))")
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	139	prefer 2 apply blast
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	140	apply (erule exE)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	141	apply (subgoal_tac "g 0 = 0 & g h =0")
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	142	prefer 2
15561 045a07ac35a7 another reorganization of setsums and intervals nipkow parents: 15539 diff changeset	143	apply (simp del: setsum_op_ivl_Suc)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	144	apply (cut_tac n = m and k = 1 in sumr_offset2)
15561 045a07ac35a7 another reorganization of setsums and intervals nipkow parents: 15539 diff changeset	145	apply (simp add: eq_diff_eq' del: setsum_op_ivl_Suc)
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	146	apply (subgoal_tac "\<exists>difg. difg = (%m t. diff m t - (setsum (%p. (diff (m + p) 0 / real (fact p)) * (t ^ p)) {0..<n-m} + (B * ((t ^ (n - m)) / real (fact (n - m))))))")
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	147	prefer 2 apply blast
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	148	apply (erule exE)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	149	apply (subgoal_tac "difg 0 = g")
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	150	prefer 2 apply simp
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	151	apply (frule Maclaurin_lemma2, assumption+)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	152	apply (subgoal_tac "\<forall>ma. ma < n --> (\<exists>t. 0 < t & t < h & difg (Suc ma) t = 0) ")
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	153	apply (drule_tac x = m and P="%m. m<n --> (\<exists>t. ?QQ m t)" in spec)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	154	apply (erule impE)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	155	apply (simp (no_asm_simp))
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	156	apply (erule exE)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	157	apply (rule_tac x = t in exI)
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	158	apply (simp del: realpow_Suc fact_Suc)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	159	apply (subgoal_tac "\<forall>m. m < n --> difg m 0 = 0")
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	160	prefer 2
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	161	apply clarify
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	162	apply simp
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	163	apply (frule_tac m = ma in less_add_one, clarify)
15561 045a07ac35a7 another reorganization of setsums and intervals nipkow parents: 15539 diff changeset	164	apply (simp del: setsum_op_ivl_Suc)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	165	apply (insert sumr_offset4 [of 1])
15561 045a07ac35a7 another reorganization of setsums and intervals nipkow parents: 15539 diff changeset	166	apply (simp del: setsum_op_ivl_Suc fact_Suc realpow_Suc)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	167	apply (subgoal_tac "\<forall>m. m < n --> (\<exists>t. 0 < t & t < h & DERIV (difg m) t :> 0) ")
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	168	apply (rule allI, rule impI)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	169	apply (drule_tac x = ma and P="%m. m<n --> (\<exists>t. ?QQ m t)" in spec)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	170	apply (erule impE, assumption)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	171	apply (erule exE)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	172	apply (rule_tac x = t in exI)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	173	(* do some tidying up *)
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	174	apply (erule_tac [!] V= "difg = (%m t. diff m t - (setsum (%p. diff (m + p) 0 / real (fact p) * t ^ p) {0..<n-m} + B * (t ^ (n - m) / real (fact (n - m)))))"
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	175	in thin_rl)
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	176	apply (erule_tac [!] V="g = (%t. f t - (setsum (%m. diff m 0 / real (fact m) * t ^ m) {0..<n} + B * (t ^ n / real (fact n))))"
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	177	in thin_rl)
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	178	apply (erule_tac [!] V="f h = setsum (%m. diff m 0 / real (fact m) * h ^ m) {0..<n} + B * (h ^ n / real (fact n))"
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	179	in thin_rl)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	180	(* back to business *)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	181	apply (simp (no_asm_simp))
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	182	apply (rule DERIV_unique)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	183	prefer 2 apply blast
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	184	apply force
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	185	apply (rule allI, induct_tac "ma")
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	186	apply (rule impI, rule Rolle, assumption, simp, simp)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	187	apply (subgoal_tac "\<forall>t. 0 \<le> t & t \<le> h --> g differentiable t")
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	188	apply (simp add: differentiable_def)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	189	apply (blast dest: DERIV_isCont)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	190	apply (simp add: differentiable_def, clarify)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	191	apply (rule_tac x = "difg (Suc 0) t" in exI)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	192	apply force
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	193	apply (simp add: differentiable_def, clarify)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	194	apply (rule_tac x = "difg (Suc 0) x" in exI)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	195	apply force
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	196	apply safe
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	197	apply force
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	198	apply (frule Maclaurin_lemma3, assumption+, safe)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	199	apply (rule_tac x = ta in exI, force)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	200	done
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	201
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	202	lemma Maclaurin_objl:
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	203	"0 < h & 0 < n & diff 0 = f &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	204	(\<forall>m t. m < n & 0 \<le> t & t \<le> h --> DERIV (diff m) t :> diff (Suc m) t)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	205	--> (\<exists>t. 0 < t &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	206	t < h &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	207	f h =
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	208	(\<Sum>m=0..<n. diff m 0 / real (fact m) * h ^ m) +
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	209	diff n t / real (fact n) * h ^ n)"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	210	by (blast intro: Maclaurin)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	211
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	212
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	213	lemma Maclaurin2:
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	214	"[\| 0 < h; diff 0 = f;
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	215	\<forall>m t.
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	216	m < n & 0 \<le> t & t \<le> h --> DERIV (diff m) t :> diff (Suc m) t \|]
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	217	==> \<exists>t. 0 < t &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	218	t \<le> h &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	219	f h =
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	220	(\<Sum>m=0..<n. diff m 0 / real (fact m) * h ^ m) +
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	221	diff n t / real (fact n) * h ^ n"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	222	apply (case_tac "n", auto)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	223	apply (drule Maclaurin, auto)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	224	done
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	225
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	226	lemma Maclaurin2_objl:
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	227	"0 < h & diff 0 = f &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	228	(\<forall>m t.
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	229	m < n & 0 \<le> t & t \<le> h --> DERIV (diff m) t :> diff (Suc m) t)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	230	--> (\<exists>t. 0 < t &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	231	t \<le> h &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	232	f h =
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	233	(\<Sum>m=0..<n. diff m 0 / real (fact m) * h ^ m) +
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	234	diff n t / real (fact n) * h ^ n)"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	235	by (blast intro: Maclaurin2)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	236
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	237	lemma Maclaurin_minus:
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	238	"[\| h < 0; 0 < n; diff 0 = f;
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	239	\<forall>m t. m < n & h \<le> t & t \<le> 0 --> DERIV (diff m) t :> diff (Suc m) t \|]
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	240	==> \<exists>t. h < t &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	241	t < 0 &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	242	f h =
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	243	(\<Sum>m=0..<n. diff m 0 / real (fact m) * h ^ m) +
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	244	diff n t / real (fact n) * h ^ n"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	245	apply (cut_tac f = "%x. f (-x)"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	246	and diff = "%n x. ((- 1) ^ n) * diff n (-x)"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	247	and h = "-h" and n = n in Maclaurin_objl)
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	248	apply (simp)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	249	apply safe
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	250	apply (subst minus_mult_right)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	251	apply (rule DERIV_cmult)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	252	apply (rule lemma_DERIV_subst)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	253	apply (rule DERIV_chain2 [where g=uminus])
23069 cdfff0241c12 rename lemmas LIM_ident, isCont_ident, DERIV_ident huffman parents: 22985 diff changeset	254	apply (rule_tac [2] DERIV_minus, rule_tac [2] DERIV_ident)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	255	prefer 2 apply force
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	256	apply force
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	257	apply (rule_tac x = "-t" in exI, auto)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	258	apply (subgoal_tac "(\<Sum>m = 0..<n. -1 ^ m * diff m 0 * (-h)^m / real(fact m)) =
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	259	(\<Sum>m = 0..<n. diff m 0 * h ^ m / real(fact m))")
15536 3ce1cb7a24f0 starting to get rid of sumr nipkow parents: 15481 diff changeset	260	apply (rule_tac [2] setsum_cong[OF refl])
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	261	apply (auto simp add: divide_inverse power_mult_distrib [symmetric])
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	262	done
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	263
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	264	lemma Maclaurin_minus_objl:
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	265	"(h < 0 & 0 < n & diff 0 = f &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	266	(\<forall>m t.
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	267	m < n & h \<le> t & t \<le> 0 --> DERIV (diff m) t :> diff (Suc m) t))
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	268	--> (\<exists>t. h < t &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	269	t < 0 &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	270	f h =
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	271	(\<Sum>m=0..<n. diff m 0 / real (fact m) * h ^ m) +
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	272	diff n t / real (fact n) * h ^ n)"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	273	by (blast intro: Maclaurin_minus)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	274
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	275
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	276	subsection{More Convenient "Bidirectional" Version.}
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	277
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	278	(* not good for PVS sin_approx, cos_approx *)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	279
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	280	lemma Maclaurin_bi_le_lemma [rule_format]:
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	281	"0 < n \<longrightarrow>
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	282	diff 0 0 =
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	283	(\<Sum>m = 0..<n. diff m 0 * 0 ^ m / real (fact m)) +
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	284	diff n 0 * 0 ^ n / real (fact n)"
15251 bb6f072c8d10 converted some induct_tac to induct paulson parents: 15234 diff changeset	285	by (induct "n", auto)
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 12224 diff changeset	286
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	287	lemma Maclaurin_bi_le:
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	288	"[\| diff 0 = f;
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	289	\<forall>m t. m < n & abs t \<le> abs x --> DERIV (diff m) t :> diff (Suc m) t \|]
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	290	==> \<exists>t. abs t \<le> abs x &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	291	f x =
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	292	(\<Sum>m=0..<n. diff m 0 / real (fact m) * x ^ m) +
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	293	diff n t / real (fact n) * x ^ n"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	294	apply (case_tac "n = 0", force)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	295	apply (case_tac "x = 0")
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	296	apply (rule_tac x = 0 in exI)
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	297	apply (force simp add: Maclaurin_bi_le_lemma)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	298	apply (cut_tac x = x and y = 0 in linorder_less_linear, auto)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	299	txt{Case 1, where @{term "x < 0"}}
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	300	apply (cut_tac f = "diff 0" and diff = diff and h = x and n = n in Maclaurin_minus_objl, safe)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	301	apply (simp add: abs_if)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	302	apply (rule_tac x = t in exI)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	303	apply (simp add: abs_if)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	304	txt{Case 2, where @{term "0 < x"}}
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	305	apply (cut_tac f = "diff 0" and diff = diff and h = x and n = n in Maclaurin_objl, safe)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	306	apply (simp add: abs_if)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	307	apply (rule_tac x = t in exI)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	308	apply (simp add: abs_if)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	309	done
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	310
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	311	lemma Maclaurin_all_lt:
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	312	"[\| diff 0 = f;
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	313	\<forall>m x. DERIV (diff m) x :> diff(Suc m) x;
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	314	x ~= 0; 0 < n
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	315	\|] ==> \<exists>t. 0 < abs t & abs t < abs x &
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	316	f x = (\<Sum>m=0..<n. (diff m 0 / real (fact m)) * x ^ m) +
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	317	(diff n t / real (fact n)) * x ^ n"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	318	apply (rule_tac x = x and y = 0 in linorder_cases)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	319	prefer 2 apply blast
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	320	apply (drule_tac [2] diff=diff in Maclaurin)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	321	apply (drule_tac diff=diff in Maclaurin_minus, simp_all, safe)
15229 1eb23f805c06 new simprules for abs and for things like a/b<1 paulson parents: 15140 diff changeset	322	apply (rule_tac [!] x = t in exI, auto)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	323	done
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	324
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	325	lemma Maclaurin_all_lt_objl:
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	326	"diff 0 = f &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	327	(\<forall>m x. DERIV (diff m) x :> diff(Suc m) x) &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	328	x ~= 0 & 0 < n
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	329	--> (\<exists>t. 0 < abs t & abs t < abs x &
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	330	f x = (\<Sum>m=0..<n. (diff m 0 / real (fact m)) * x ^ m) +
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	331	(diff n t / real (fact n)) * x ^ n)"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	332	by (blast intro: Maclaurin_all_lt)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	333
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	334	lemma Maclaurin_zero [rule_format]:
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	335	"x = (0::real)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	336	==> 0 < n -->
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	337	(\<Sum>m=0..<n. (diff m (0::real) / real (fact m)) * x ^ m) =
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	338	diff 0 0"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	339	by (induct n, auto)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	340
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	341	lemma Maclaurin_all_le: "[\| diff 0 = f;
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	342	\<forall>m x. DERIV (diff m) x :> diff (Suc m) x
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	343	\|] ==> \<exists>t. abs t \<le> abs x &
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	344	f x = (\<Sum>m=0..<n. (diff m 0 / real (fact m)) * x ^ m) +
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	345	(diff n t / real (fact n)) * x ^ n"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	346	apply (insert linorder_le_less_linear [of n 0])
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	347	apply (erule disjE, force)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	348	apply (case_tac "x = 0")
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	349	apply (frule_tac diff = diff and n = n in Maclaurin_zero, assumption)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	350	apply (drule gr_implies_not0 [THEN not0_implies_Suc])
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	351	apply (rule_tac x = 0 in exI, force)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	352	apply (frule_tac diff = diff and n = n in Maclaurin_all_lt, auto)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	353	apply (rule_tac x = t in exI, auto)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	354	done
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	355
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	356	lemma Maclaurin_all_le_objl: "diff 0 = f &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	357	(\<forall>m x. DERIV (diff m) x :> diff (Suc m) x)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	358	--> (\<exists>t. abs t \<le> abs x &
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	359	f x = (\<Sum>m=0..<n. (diff m 0 / real (fact m)) * x ^ m) +
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	360	(diff n t / real (fact n)) * x ^ n)"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	361	by (blast intro: Maclaurin_all_le)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	362
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	363
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	364	subsection{Version for Exponential Function}
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	365
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	366	lemma Maclaurin_exp_lt: "[\| x ~= 0; 0 < n \|]
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	367	==> (\<exists>t. 0 < abs t &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	368	abs t < abs x &
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	369	exp x = (\<Sum>m=0..<n. (x ^ m) / real (fact m)) +
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	370	(exp t / real (fact n)) * x ^ n)"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	371	by (cut_tac diff = "%n. exp" and f = exp and x = x and n = n in Maclaurin_all_lt_objl, auto)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	372
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	373
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	374	lemma Maclaurin_exp_le:
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	375	"\<exists>t. abs t \<le> abs x &
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	376	exp x = (\<Sum>m=0..<n. (x ^ m) / real (fact m)) +
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	377	(exp t / real (fact n)) * x ^ n"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	378	by (cut_tac diff = "%n. exp" and f = exp and x = x and n = n in Maclaurin_all_le_objl, auto)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	379
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	380
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	381	subsection{Version for Sine Function}
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	382
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	383	lemma MVT2:
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	384	"[\| a < b; \<forall>x. a \<le> x & x \<le> b --> DERIV f x :> f'(x) \|]
21782 bf055d30d3ad add type annotation huffman parents: 20792 diff changeset	385	==> \<exists>z::real. a < z & z < b & (f b - f a = (b - a) * f'(z))"
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	386	apply (drule MVT)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	387	apply (blast intro: DERIV_isCont)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	388	apply (force dest: order_less_imp_le simp add: differentiable_def)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	389	apply (blast dest: DERIV_unique order_less_imp_le)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	390	done
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	391
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	392	lemma mod_exhaust_less_4:
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	393	"m mod 4 = 0 \| m mod 4 = 1 \| m mod 4 = 2 \| m mod 4 = (3::nat)"
20217 25b068a99d2b linear arithmetic splits certain operators (e.g. min, max, abs) webertj parents: 19765 diff changeset	394	by auto
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	395
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	396	lemma Suc_Suc_mult_two_diff_two [rule_format, simp]:
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	397	"0 < n --> Suc (Suc (2 * n - 2)) = 2*n"
15251 bb6f072c8d10 converted some induct_tac to induct paulson parents: 15234 diff changeset	398	by (induct "n", auto)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	399
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	400	lemma lemma_Suc_Suc_4n_diff_2 [rule_format, simp]:
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	401	"0 < n --> Suc (Suc (4n - 2)) = 4n"
15251 bb6f072c8d10 converted some induct_tac to induct paulson parents: 15234 diff changeset	402	by (induct "n", auto)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	403
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	404	lemma Suc_mult_two_diff_one [rule_format, simp]:
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	405	"0 < n --> Suc (2 * n - 1) = 2*n"
15251 bb6f072c8d10 converted some induct_tac to induct paulson parents: 15234 diff changeset	406	by (induct "n", auto)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	407
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	408
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	409	text{It is unclear why so many variant results are needed.}
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	410
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	411	lemma Maclaurin_sin_expansion2:
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	412	"\<exists>t. abs t \<le> abs x &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	413	sin x =
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	414	(\<Sum>m=0..<n. (if even m then 0
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	415	else ((- 1) ^ ((m - (Suc 0)) div 2)) / real (fact m)) *
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	416	x ^ m)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	417	+ ((sin(t + 1/2 * real (n) pi) / real (fact n)) x ^ n)"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	418	apply (cut_tac f = sin and n = n and x = x
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	419	and diff = "%n x. sin (x + 1/2real n pi)" in Maclaurin_all_lt_objl)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	420	apply safe
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	421	apply (simp (no_asm))
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	422	apply (simp (no_asm))
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	423	apply (case_tac "n", clarify, simp, simp)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	424	apply (rule ccontr, simp)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	425	apply (drule_tac x = x in spec, simp)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	426	apply (erule ssubst)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	427	apply (rule_tac x = t in exI, simp)
15536 3ce1cb7a24f0 starting to get rid of sumr nipkow parents: 15481 diff changeset	428	apply (rule setsum_cong[OF refl])
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	429	apply (auto simp add: sin_zero_iff odd_Suc_mult_two_ex)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	430	done
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	431
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	432	lemma Maclaurin_sin_expansion:
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	433	"\<exists>t. sin x =
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	434	(\<Sum>m=0..<n. (if even m then 0
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	435	else ((- 1) ^ ((m - (Suc 0)) div 2)) / real (fact m)) *
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	436	x ^ m)
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	437	+ ((sin(t + 1/2 * real (n) pi) / real (fact n)) x ^ n)"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	438	apply (insert Maclaurin_sin_expansion2 [of x n])
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	439	apply (blast intro: elim:);
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	440	done
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	441
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	442
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	443
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	444	lemma Maclaurin_sin_expansion3:
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	445	"[\| 0 < n; 0 < x \|] ==>
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	446	\<exists>t. 0 < t & t < x &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	447	sin x =
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	448	(\<Sum>m=0..<n. (if even m then 0
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	449	else ((- 1) ^ ((m - (Suc 0)) div 2)) / real (fact m)) *
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	450	x ^ m)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	451	+ ((sin(t + 1/2 * real(n) pi) / real (fact n)) x ^ n)"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	452	apply (cut_tac f = sin and n = n and h = x and diff = "%n x. sin (x + 1/2real (n) pi)" in Maclaurin_objl)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	453	apply safe
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	454	apply simp
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	455	apply (simp (no_asm))
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	456	apply (erule ssubst)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	457	apply (rule_tac x = t in exI, simp)
15536 3ce1cb7a24f0 starting to get rid of sumr nipkow parents: 15481 diff changeset	458	apply (rule setsum_cong[OF refl])
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	459	apply (auto simp add: sin_zero_iff odd_Suc_mult_two_ex)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	460	done
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	461
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	462	lemma Maclaurin_sin_expansion4:
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	463	"0 < x ==>
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	464	\<exists>t. 0 < t & t \<le> x &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	465	sin x =
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	466	(\<Sum>m=0..<n. (if even m then 0
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	467	else ((- 1) ^ ((m - (Suc 0)) div 2)) / real (fact m)) *
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	468	x ^ m)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	469	+ ((sin(t + 1/2 * real (n) pi) / real (fact n)) x ^ n)"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	470	apply (cut_tac f = sin and n = n and h = x and diff = "%n x. sin (x + 1/2real (n) pi)" in Maclaurin2_objl)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	471	apply safe
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	472	apply simp
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	473	apply (simp (no_asm))
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	474	apply (erule ssubst)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	475	apply (rule_tac x = t in exI, simp)
15536 3ce1cb7a24f0 starting to get rid of sumr nipkow parents: 15481 diff changeset	476	apply (rule setsum_cong[OF refl])
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	477	apply (auto simp add: sin_zero_iff odd_Suc_mult_two_ex)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	478	done
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	479
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	480
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	481	subsection{Maclaurin Expansion for Cosine Function}
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	482
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	483	lemma sumr_cos_zero_one [simp]:
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	484	"(\<Sum>m=0..<(Suc n).
333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	485	(if even m then (- 1) ^ (m div 2)/(real (fact m)) else 0) * 0 ^ m) = 1"
15251 bb6f072c8d10 converted some induct_tac to induct paulson parents: 15234 diff changeset	486	by (induct "n", auto)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	487
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	488	lemma Maclaurin_cos_expansion:
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	489	"\<exists>t. abs t \<le> abs x &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	490	cos x =
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	491	(\<Sum>m=0..<n. (if even m
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	492	then (- 1) ^ (m div 2)/(real (fact m))
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	493	else 0) *
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	494	x ^ m)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	495	+ ((cos(t + 1/2 * real (n) pi) / real (fact n)) x ^ n)"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	496	apply (cut_tac f = cos and n = n and x = x and diff = "%n x. cos (x + 1/2real (n) pi)" in Maclaurin_all_lt_objl)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	497	apply safe
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	498	apply (simp (no_asm))
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	499	apply (simp (no_asm))
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	500	apply (case_tac "n", simp)
15561 045a07ac35a7 another reorganization of setsums and intervals nipkow parents: 15539 diff changeset	501	apply (simp del: setsum_op_ivl_Suc)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	502	apply (rule ccontr, simp)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	503	apply (drule_tac x = x in spec, simp)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	504	apply (erule ssubst)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	505	apply (rule_tac x = t in exI, simp)
15536 3ce1cb7a24f0 starting to get rid of sumr nipkow parents: 15481 diff changeset	506	apply (rule setsum_cong[OF refl])
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	507	apply (auto simp add: cos_zero_iff even_mult_two_ex)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	508	done
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	509
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	510	lemma Maclaurin_cos_expansion2:
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	511	"[\| 0 < x; 0 < n \|] ==>
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	512	\<exists>t. 0 < t & t < x &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	513	cos x =
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	514	(\<Sum>m=0..<n. (if even m
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	515	then (- 1) ^ (m div 2)/(real (fact m))
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	516	else 0) *
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	517	x ^ m)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	518	+ ((cos(t + 1/2 * real (n) pi) / real (fact n)) x ^ n)"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	519	apply (cut_tac f = cos and n = n and h = x and diff = "%n x. cos (x + 1/2real (n) pi)" in Maclaurin_objl)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	520	apply safe
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	521	apply simp
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	522	apply (simp (no_asm))
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	523	apply (erule ssubst)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	524	apply (rule_tac x = t in exI, simp)
15536 3ce1cb7a24f0 starting to get rid of sumr nipkow parents: 15481 diff changeset	525	apply (rule setsum_cong[OF refl])
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	526	apply (auto simp add: cos_zero_iff even_mult_two_ex)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	527	done
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	528
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	529	lemma Maclaurin_minus_cos_expansion:
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	530	"[\| x < 0; 0 < n \|] ==>
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	531	\<exists>t. x < t & t < 0 &
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	532	cos x =
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	533	(\<Sum>m=0..<n. (if even m
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	534	then (- 1) ^ (m div 2)/(real (fact m))
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	535	else 0) *
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	536	x ^ m)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	537	+ ((cos(t + 1/2 * real (n) pi) / real (fact n)) x ^ n)"
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	538	apply (cut_tac f = cos and n = n and h = x and diff = "%n x. cos (x + 1/2real (n) pi)" in Maclaurin_minus_objl)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	539	apply safe
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	540	apply simp
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	541	apply (simp (no_asm))
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	542	apply (erule ssubst)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	543	apply (rule_tac x = t in exI, simp)
15536 3ce1cb7a24f0 starting to get rid of sumr nipkow parents: 15481 diff changeset	544	apply (rule setsum_cong[OF refl])
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	545	apply (auto simp add: cos_zero_iff even_mult_two_ex)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	546	done
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	547
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	548	(* ------------------------------------------------------------------------- *)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	549	(* Version for ln(1 +/- x). Where is it?? *)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	550	(* ------------------------------------------------------------------------- *)
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	551
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	552	lemma sin_bound_lemma:
15081 32402f5624d1 abs notation paulson parents: 15079 diff changeset	553	"[\|x = y; abs u \<le> (v::real) \|] ==> \<bar>(x + u) - y\<bar> \<le> v"
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	554	by auto
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	555
2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	556	lemma Maclaurin_sin_bound:
15539 333a88244569 comprehensive cleanup, replacing sumr by setsum nipkow parents: 15536 diff changeset	557	"abs(sin x - (\<Sum>m=0..<n. (if even m then 0 else ((- 1) ^ ((m - (Suc 0)) div 2)) / real (fact m)) *
15081 32402f5624d1 abs notation paulson parents: 15079 diff changeset	558	x ^ m)) \<le> inverse(real (fact n)) * \<bar>x\<bar> ^ n"
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 12224 diff changeset	559	proof -
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	560	have "!! x (y::real). x \<le> 1 \<Longrightarrow> 0 \<le> y \<Longrightarrow> x * y \<le> 1 * y"
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 12224 diff changeset	561	by (rule_tac mult_right_mono,simp_all)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 12224 diff changeset	562	note est = this[simplified]
22985 501e6dfe4e5a cleaned up proof of Maclaurin_sin_bound huffman parents: 22983 diff changeset	563	let ?diff = "\<lambda>(n::nat) x. if n mod 4 = 0 then sin(x) else if n mod 4 = 1 then cos(x) else if n mod 4 = 2 then -sin(x) else -cos(x)"
501e6dfe4e5a cleaned up proof of Maclaurin_sin_bound huffman parents: 22983 diff changeset	564	have diff_0: "?diff 0 = sin" by simp
501e6dfe4e5a cleaned up proof of Maclaurin_sin_bound huffman parents: 22983 diff changeset	565	have DERIV_diff: "\<forall>m x. DERIV (?diff m) x :> ?diff (Suc m) x"
501e6dfe4e5a cleaned up proof of Maclaurin_sin_bound huffman parents: 22983 diff changeset	566	apply (clarify)
501e6dfe4e5a cleaned up proof of Maclaurin_sin_bound huffman parents: 22983 diff changeset	567	apply (subst (1 2 3) mod_Suc_eq_Suc_mod)
501e6dfe4e5a cleaned up proof of Maclaurin_sin_bound huffman parents: 22983 diff changeset	568	apply (cut_tac m=m in mod_exhaust_less_4)
501e6dfe4e5a cleaned up proof of Maclaurin_sin_bound huffman parents: 22983 diff changeset	569	apply (safe, simp_all)
501e6dfe4e5a cleaned up proof of Maclaurin_sin_bound huffman parents: 22983 diff changeset	570	apply (rule DERIV_minus, simp)
501e6dfe4e5a cleaned up proof of Maclaurin_sin_bound huffman parents: 22983 diff changeset	571	apply (rule lemma_DERIV_subst, rule DERIV_minus, rule DERIV_cos, simp)
501e6dfe4e5a cleaned up proof of Maclaurin_sin_bound huffman parents: 22983 diff changeset	572	done
501e6dfe4e5a cleaned up proof of Maclaurin_sin_bound huffman parents: 22983 diff changeset	573	from Maclaurin_all_le [OF diff_0 DERIV_diff]
501e6dfe4e5a cleaned up proof of Maclaurin_sin_bound huffman parents: 22983 diff changeset	574	obtain t where t1: "\<bar>t\<bar> \<le> \<bar>x\<bar>" and
501e6dfe4e5a cleaned up proof of Maclaurin_sin_bound huffman parents: 22983 diff changeset	575	t2: "sin x = (\<Sum>m = 0..<n. ?diff m 0 / real (fact m) * x ^ m) +
501e6dfe4e5a cleaned up proof of Maclaurin_sin_bound huffman parents: 22983 diff changeset	576	?diff n t / real (fact n) * x ^ n" by fast
501e6dfe4e5a cleaned up proof of Maclaurin_sin_bound huffman parents: 22983 diff changeset	577	have diff_m_0:
501e6dfe4e5a cleaned up proof of Maclaurin_sin_bound huffman parents: 22983 diff changeset	578	"\<And>m. ?diff m 0 = (if even m then 0
501e6dfe4e5a cleaned up proof of Maclaurin_sin_bound huffman parents: 22983 diff changeset	579	else (- 1) ^ ((m - Suc 0) div 2))"
501e6dfe4e5a cleaned up proof of Maclaurin_sin_bound huffman parents: 22983 diff changeset	580	apply (subst even_even_mod_4_iff)
501e6dfe4e5a cleaned up proof of Maclaurin_sin_bound huffman parents: 22983 diff changeset	581	apply (cut_tac m=m in mod_exhaust_less_4)
501e6dfe4e5a cleaned up proof of Maclaurin_sin_bound huffman parents: 22983 diff changeset	582	apply (elim disjE, simp_all)
501e6dfe4e5a cleaned up proof of Maclaurin_sin_bound huffman parents: 22983 diff changeset	583	apply (safe dest!: mod_eqD, simp_all)
501e6dfe4e5a cleaned up proof of Maclaurin_sin_bound huffman parents: 22983 diff changeset	584	done
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 12224 diff changeset	585	show ?thesis
22985 501e6dfe4e5a cleaned up proof of Maclaurin_sin_bound huffman parents: 22983 diff changeset	586	apply (subst t2)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	587	apply (rule sin_bound_lemma)
15536 3ce1cb7a24f0 starting to get rid of sumr nipkow parents: 15481 diff changeset	588	apply (rule setsum_cong[OF refl])
22985 501e6dfe4e5a cleaned up proof of Maclaurin_sin_bound huffman parents: 22983 diff changeset	589	apply (subst diff_m_0, simp)
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	590	apply (auto intro: mult_right_mono [where b=1, simplified] mult_right_mono
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 15944 diff changeset	591	simp add: est mult_nonneg_nonneg mult_ac divide_inverse
16924 04246269386e removed the dependence on abs_mult paulson parents: 16819 diff changeset	592	power_abs [symmetric] abs_mult)
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 12224 diff changeset	593	done
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 12224 diff changeset	594	qed
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 12224 diff changeset	595
15079 2ef899e4526d conversion of Hyperreal/MacLaurin_lemmas to Isar script paulson parents: 14738 diff changeset	596	end

author	huffman
	Tue, 22 May 2007 07:29:49 +0200
changeset 23069	cdfff0241c12
parent 22985	501e6dfe4e5a
child 23177	3004310c95b1
permissions	-rw-r--r--