isabelle: src/HOL/Hyperreal/Ln.thy@bc1c75855f3d (annotated)

16959 17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	1	(* Title: Ln.thy
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	2	Author: Jeremy Avigad
16963 32626fb8ae49 addedd ID line nipkow parents: 16959 diff changeset	3	ID: $Id$
16959 17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	4	*)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	5
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	6	header {* Properties of ln *}
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	7
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	8	theory Ln
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	9
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	10	imports Transcendental
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	11	begin
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	12
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	13	lemma exp_first_two_terms: "exp x = 1 + x + suminf (%n.
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	14	inverse(real (fact (n+2))) * (x ^ (n+2)))"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	15	proof -
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	16	have "exp x = suminf (%n. inverse(real (fact n)) * (x ^ n))"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	17	by (unfold exp_def, simp)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	18	also from summable_exp have "... = (SUM n : {0..<2}.
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	19	inverse(real (fact n)) * (x ^ n)) + suminf (%n.
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	20	inverse(real (fact (n+2))) * (x ^ (n+2)))" (is "_ = ?a + _")
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	21	by (rule suminf_split_initial_segment)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	22	also have "?a = 1 + x"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	23	by (simp add: numerals)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	24	finally show ?thesis .
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	25	qed
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	26
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	27	lemma exp_tail_after_first_two_terms_summable:
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	28	"summable (%n. inverse(real (fact (n+2))) * (x ^ (n+2)))"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	29	proof -
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	30	note summable_exp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	31	thus ?thesis
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	32	by (frule summable_ignore_initial_segment)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	33	qed
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	34
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	35	lemma aux1: assumes a: "0 <= x" and b: "x <= 1"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	36	shows "inverse (real (fact (n + 2))) * x ^ (n + 2) <= (x^2/2) * ((1/2)^n)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	37	proof (induct n)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	38	show "inverse (real (fact (0 + 2))) * x ^ (0 + 2) <=
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	39	x ^ 2 / 2 * (1 / 2) ^ 0"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	40	apply (simp add: power2_eq_square)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	41	apply (subgoal_tac "real (Suc (Suc 0)) = 2")
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	42	apply (erule ssubst)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	43	apply simp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	44	apply simp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	45	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	46	next
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	47	fix n
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	48	assume c: "inverse (real (fact (n + 2))) * x ^ (n + 2)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	49	<= x ^ 2 / 2 * (1 / 2) ^ n"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	50	show "inverse (real (fact (Suc n + 2))) * x ^ (Suc n + 2)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	51	<= x ^ 2 / 2 * (1 / 2) ^ Suc n"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	52	proof -
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	53	have "inverse(real (fact (Suc n + 2))) <=
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	54	(1 / 2) *inverse (real (fact (n+2)))"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	55	proof -
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	56	have "Suc n + 2 = Suc (n + 2)" by simp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	57	then have "fact (Suc n + 2) = Suc (n + 2) * fact (n + 2)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	58	by simp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	59	then have "real(fact (Suc n + 2)) = real(Suc (n + 2) * fact (n + 2))"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	60	apply (rule subst)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	61	apply (rule refl)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	62	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	63	also have "... = real(Suc (n + 2)) * real(fact (n + 2))"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	64	by (rule real_of_nat_mult)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	65	finally have "real (fact (Suc n + 2)) =
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	66	real (Suc (n + 2)) * real (fact (n + 2))" .
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	67	then have "inverse(real (fact (Suc n + 2))) =
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	68	inverse(real (Suc (n + 2))) * inverse(real (fact (n + 2)))"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	69	apply (rule ssubst)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	70	apply (rule inverse_mult_distrib)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	71	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	72	also have "... <= (1/2) * inverse(real (fact (n + 2)))"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	73	apply (rule mult_right_mono)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	74	apply (subst inverse_eq_divide)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	75	apply simp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	76	apply (rule inv_real_of_nat_fact_ge_zero)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	77	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	78	finally show ?thesis .
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	79	qed
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	80	moreover have "x ^ (Suc n + 2) <= x ^ (n + 2)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	81	apply (simp add: mult_compare_simps)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	82	apply (simp add: prems)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	83	apply (subgoal_tac "0 <= x * (x * x^n)")
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	84	apply force
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	85	apply (rule mult_nonneg_nonneg, rule a)+
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	86	apply (rule zero_le_power, rule a)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	87	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	88	ultimately have "inverse (real (fact (Suc n + 2))) * x ^ (Suc n + 2) <=
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	89	(1 / 2 * inverse (real (fact (n + 2)))) * x ^ (n + 2)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	90	apply (rule mult_mono)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	91	apply (rule mult_nonneg_nonneg)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	92	apply simp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	93	apply (subst inverse_nonnegative_iff_nonnegative)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	94	apply (rule real_of_nat_fact_ge_zero)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	95	apply (rule zero_le_power)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	96	apply assumption
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	97	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	98	also have "... = 1 / 2 * (inverse (real (fact (n + 2))) * x ^ (n + 2))"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	99	by simp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	100	also have "... <= 1 / 2 * (x ^ 2 / 2 * (1 / 2) ^ n)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	101	apply (rule mult_left_mono)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	102	apply (rule prems)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	103	apply simp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	104	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	105	also have "... = x ^ 2 / 2 * (1 / 2 * (1 / 2) ^ n)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	106	by auto
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	107	also have "(1::real) / 2 * (1 / 2) ^ n = (1 / 2) ^ (Suc n)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	108	by (rule realpow_Suc [THEN sym])
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	109	finally show ?thesis .
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	110	qed
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	111	qed
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	112
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	113	lemma aux2: "(%n. x ^ 2 / 2 * (1 / 2) ^ n) sums x^2"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	114	proof -
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	115	have "(%n. (1 / 2)^n) sums (1 / (1 - (1/2)))"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	116	apply (rule geometric_sums)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	117	by (simp add: abs_interval_iff)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	118	also have "(1::real) / (1 - 1/2) = 2"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	119	by simp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	120	finally have "(%n. (1 / 2)^n) sums 2" .
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	121	then have "(%n. x ^ 2 / 2 * (1 / 2) ^ n) sums (x^2 / 2 * 2)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	122	by (rule sums_mult)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	123	also have "x^2 / 2 * 2 = x^2"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	124	by simp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	125	finally show ?thesis .
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	126	qed
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	127
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	128	lemma exp_bound: "0 <= x ==> x <= 1 ==> exp x <= 1 + x + x^2"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	129	proof -
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	130	assume a: "0 <= x"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	131	assume b: "x <= 1"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	132	have c: "exp x = 1 + x + suminf (%n. inverse(real (fact (n+2))) *
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	133	(x ^ (n+2)))"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	134	by (rule exp_first_two_terms)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	135	moreover have "suminf (%n. inverse(real (fact (n+2))) * (x ^ (n+2))) <= x^2"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	136	proof -
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	137	have "suminf (%n. inverse(real (fact (n+2))) * (x ^ (n+2))) <=
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	138	suminf (%n. (x^2/2) * ((1/2)^n))"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	139	apply (rule summable_le)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	140	apply (auto simp only: aux1 prems)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	141	apply (rule exp_tail_after_first_two_terms_summable)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	142	by (rule sums_summable, rule aux2)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	143	also have "... = x^2"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	144	by (rule sums_unique [THEN sym], rule aux2)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	145	finally show ?thesis .
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	146	qed
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	147	ultimately show ?thesis
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	148	by auto
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	149	qed
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	150
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	151	lemma aux3: "(0::real) <= x ==> (1 + x + x^2)/(1 + x^2) <= 1 + x"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	152	apply (subst pos_divide_le_eq)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	153	apply (simp add: zero_compare_simps)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	154	apply (simp add: ring_eq_simps zero_compare_simps)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	155	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	156
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	157	lemma aux4: "0 <= x ==> x <= 1 ==> exp (x - x^2) <= 1 + x"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	158	proof -
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	159	assume a: "0 <= x" and b: "x <= 1"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	160	have "exp (x - x^2) = exp x / exp (x^2)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	161	by (rule exp_diff)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	162	also have "... <= (1 + x + x^2) / exp (x ^2)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	163	apply (rule divide_right_mono)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	164	apply (rule exp_bound)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	165	apply (rule a, rule b)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	166	apply simp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	167	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	168	also have "... <= (1 + x + x^2) / (1 + x^2)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	169	apply (rule divide_left_mono)
17013 74bc935273ea renamed exp_ge_add_one_self2 to exp_ge_add_one_self avigad parents: 16963 diff changeset	170	apply (auto simp add: exp_ge_add_one_self_aux)
16959 17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	171	apply (rule add_nonneg_nonneg)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	172	apply (insert prems, auto)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	173	apply (rule mult_pos_pos)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	174	apply auto
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	175	apply (rule add_pos_nonneg)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	176	apply auto
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	177	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	178	also from a have "... <= 1 + x"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	179	by (rule aux3)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	180	finally show ?thesis .
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	181	qed
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	182
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	183	lemma ln_one_plus_pos_lower_bound: "0 <= x ==> x <= 1 ==>
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	184	x - x^2 <= ln (1 + x)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	185	proof -
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	186	assume a: "0 <= x" and b: "x <= 1"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	187	then have "exp (x - x^2) <= 1 + x"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	188	by (rule aux4)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	189	also have "... = exp (ln (1 + x))"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	190	proof -
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	191	from a have "0 < 1 + x" by auto
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	192	thus ?thesis
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	193	by (auto simp only: exp_ln_iff [THEN sym])
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	194	qed
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	195	finally have "exp (x - x ^ 2) <= exp (ln (1 + x))" .
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	196	thus ?thesis by (auto simp only: exp_le_cancel_iff)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	197	qed
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	198
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	199	lemma ln_one_minus_pos_upper_bound: "0 <= x ==> x < 1 ==> ln (1 - x) <= - x"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	200	proof -
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	201	assume a: "0 <= (x::real)" and b: "x < 1"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	202	have "(1 - x) * (1 + x + x^2) = (1 - x^3)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	203	by (simp add: ring_eq_simps power2_eq_square power3_eq_cube)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	204	also have "... <= 1"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	205	by (auto intro: zero_le_power simp add: a)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	206	finally have "(1 - x) * (1 + x + x ^ 2) <= 1" .
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	207	moreover have "0 < 1 + x + x^2"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	208	apply (rule add_pos_nonneg)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	209	apply (insert a, auto)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	210	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	211	ultimately have "1 - x <= 1 / (1 + x + x^2)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	212	by (elim mult_imp_le_div_pos)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	213	also have "... <= 1 / exp x"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	214	apply (rule divide_left_mono)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	215	apply (rule exp_bound, rule a)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	216	apply (insert prems, auto)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	217	apply (rule mult_pos_pos)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	218	apply (rule add_pos_nonneg)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	219	apply auto
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	220	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	221	also have "... = exp (-x)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	222	by (auto simp add: exp_minus real_divide_def)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	223	finally have "1 - x <= exp (- x)" .
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	224	also have "1 - x = exp (ln (1 - x))"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	225	proof -
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	226	have "0 < 1 - x"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	227	by (insert b, auto)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	228	thus ?thesis
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	229	by (auto simp only: exp_ln_iff [THEN sym])
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	230	qed
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	231	finally have "exp (ln (1 - x)) <= exp (- x)" .
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	232	thus ?thesis by (auto simp only: exp_le_cancel_iff)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	233	qed
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	234
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	235	lemma aux5: "x < 1 ==> ln(1 - x) = - ln(1 + x / (1 - x))"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	236	proof -
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	237	assume a: "x < 1"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	238	have "ln(1 - x) = - ln(1 / (1 - x))"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	239	proof -
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	240	have "ln(1 - x) = - (- ln (1 - x))"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	241	by auto
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	242	also have "- ln(1 - x) = ln 1 - ln(1 - x)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	243	by simp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	244	also have "... = ln(1 / (1 - x))"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	245	apply (rule ln_div [THEN sym])
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	246	by (insert a, auto)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	247	finally show ?thesis .
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	248	qed
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	249	also have " 1 / (1 - x) = 1 + x / (1 - x)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	250	proof -
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	251	have "1 / (1 - x) = (1 - x + x) / (1 - x)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	252	by auto
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	253	also have "... = (1 - x) / (1 - x) + x / (1 - x)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	254	by (rule add_divide_distrib)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	255	also have "... = 1 + x / (1-x)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	256	apply (subst add_right_cancel)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	257	apply (insert a, simp)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	258	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	259	finally show ?thesis .
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	260	qed
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	261	finally show ?thesis .
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	262	qed
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	263
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	264	lemma ln_one_minus_pos_lower_bound: "0 <= x ==> x <= (1 / 2) ==>
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	265	- x - 2 * x^2 <= ln (1 - x)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	266	proof -
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	267	assume a: "0 <= x" and b: "x <= (1 / 2)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	268	from b have c: "x < 1"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	269	by auto
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	270	then have "ln (1 - x) = - ln (1 + x / (1 - x))"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	271	by (rule aux5)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	272	also have "- (x / (1 - x)) <= ..."
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	273	proof -
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	274	have "ln (1 + x / (1 - x)) <= x / (1 - x)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	275	apply (rule ln_add_one_self_le_self)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	276	apply (rule divide_nonneg_pos)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	277	by (insert a c, auto)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	278	thus ?thesis
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	279	by auto
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	280	qed
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	281	also have "- (x / (1 - x)) = -x / (1 - x)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	282	by auto
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	283	finally have d: "- x / (1 - x) <= ln (1 - x)" .
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	284	have e: "-x - 2 * x^2 <= - x / (1 - x)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	285	apply (rule mult_imp_le_div_pos)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	286	apply (insert prems, force)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	287	apply (auto simp add: ring_eq_simps power2_eq_square)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	288	apply (subgoal_tac "- (x * x) + x * (x * (x * 2)) = x^2 * (2 * x - 1)")
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	289	apply (erule ssubst)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	290	apply (rule mult_nonneg_nonpos)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	291	apply auto
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	292	apply (auto simp add: ring_eq_simps power2_eq_square)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	293	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	294	from e d show "- x - 2 * x^2 <= ln (1 - x)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	295	by (rule order_trans)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	296	qed
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	297
17013 74bc935273ea renamed exp_ge_add_one_self2 to exp_ge_add_one_self avigad parents: 16963 diff changeset	298	lemma exp_ge_add_one_self [simp]: "1 + x <= exp x"
16959 17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	299	apply (case_tac "0 <= x")
17013 74bc935273ea renamed exp_ge_add_one_self2 to exp_ge_add_one_self avigad parents: 16963 diff changeset	300	apply (erule exp_ge_add_one_self_aux)
16959 17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	301	apply (case_tac "x <= -1")
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	302	apply (subgoal_tac "1 + x <= 0")
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	303	apply (erule order_trans)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	304	apply simp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	305	apply simp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	306	apply (subgoal_tac "1 + x = exp(ln (1 + x))")
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	307	apply (erule ssubst)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	308	apply (subst exp_le_cancel_iff)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	309	apply (subgoal_tac "ln (1 - (- x)) <= - (- x)")
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	310	apply simp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	311	apply (rule ln_one_minus_pos_upper_bound)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	312	apply auto
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	313	apply (rule sym)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	314	apply (subst exp_ln_iff)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	315	apply auto
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	316	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	317
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	318	lemma ln_add_one_self_le_self2: "-1 < x ==> ln(1 + x) <= x"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	319	apply (subgoal_tac "x = ln (exp x)")
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	320	apply (erule ssubst)back
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	321	apply (subst ln_le_cancel_iff)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	322	apply auto
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	323	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	324
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	325	lemma abs_ln_one_plus_x_minus_x_bound_nonneg:
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	326	"0 <= x ==> x <= 1 ==> abs(ln (1 + x) - x) <= x^2"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	327	proof -
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	328	assume "0 <= x"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	329	assume "x <= 1"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	330	have "ln (1 + x) <= x"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	331	by (rule ln_add_one_self_le_self)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	332	then have "ln (1 + x) - x <= 0"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	333	by simp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	334	then have "abs(ln(1 + x) - x) = - (ln(1 + x) - x)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	335	by (rule abs_of_nonpos)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	336	also have "... = x - ln (1 + x)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	337	by simp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	338	also have "... <= x^2"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	339	proof -
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	340	from prems have "x - x^2 <= ln (1 + x)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	341	by (intro ln_one_plus_pos_lower_bound)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	342	thus ?thesis
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	343	by simp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	344	qed
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	345	finally show ?thesis .
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	346	qed
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	347
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	348	lemma abs_ln_one_plus_x_minus_x_bound_nonpos:
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	349	"-(1 / 2) <= x ==> x <= 0 ==> abs(ln (1 + x) - x) <= 2 * x^2"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	350	proof -
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	351	assume "-(1 / 2) <= x"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	352	assume "x <= 0"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	353	have "abs(ln (1 + x) - x) = x - ln(1 - (-x))"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	354	apply (subst abs_of_nonpos)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	355	apply simp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	356	apply (rule ln_add_one_self_le_self2)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	357	apply (insert prems, auto)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	358	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	359	also have "... <= 2 * x^2"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	360	apply (subgoal_tac "- (-x) - 2 * (-x)^2 <= ln (1 - (-x))")
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	361	apply (simp add: compare_rls)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	362	apply (rule ln_one_minus_pos_lower_bound)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	363	apply (insert prems, auto)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	364	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	365	finally show ?thesis .
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	366	qed
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	367
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	368	lemma abs_ln_one_plus_x_minus_x_bound:
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	369	"abs x <= 1 / 2 ==> abs(ln (1 + x) - x) <= 2 * x^2"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	370	apply (case_tac "0 <= x")
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	371	apply (rule order_trans)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	372	apply (rule abs_ln_one_plus_x_minus_x_bound_nonneg)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	373	apply auto
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	374	apply (rule abs_ln_one_plus_x_minus_x_bound_nonpos)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	375	apply auto
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	376	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	377
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	378	lemma DERIV_ln: "0 < x ==> DERIV ln x :> 1 / x"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	379	apply (unfold deriv_def, unfold LIM_def, clarsimp)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	380	apply (rule exI)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	381	apply (rule conjI)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	382	prefer 2
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	383	apply clarsimp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	384	apply (subgoal_tac "(ln (x + xa) + - ln x) / xa + - (1 / x) =
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	385	(ln (1 + xa / x) - xa / x) / xa")
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	386	apply (erule ssubst)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	387	apply (subst abs_divide)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	388	apply (rule mult_imp_div_pos_less)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	389	apply force
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	390	apply (rule order_le_less_trans)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	391	apply (rule abs_ln_one_plus_x_minus_x_bound)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	392	apply (subst abs_divide)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	393	apply (subst abs_of_pos, assumption)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	394	apply (erule mult_imp_div_pos_le)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	395	apply (subgoal_tac "abs xa < min (x / 2) (r * x^2 / 2)")
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	396	apply force
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	397	apply assumption
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	398	apply (simp add: power2_eq_square mult_compare_simps)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	399	apply (rule mult_imp_div_pos_less)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	400	apply (rule mult_pos_pos, assumption, assumption)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	401	apply (subgoal_tac "xa * xa = abs xa * abs xa")
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	402	apply (erule ssubst)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	403	apply (subgoal_tac "abs xa * (abs xa * 2) < abs xa * (r * (x * x))")
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	404	apply (simp only: mult_ac)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	405	apply (rule mult_strict_left_mono)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	406	apply (erule conjE, assumption)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	407	apply force
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	408	apply simp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	409	apply (subst diff_minus [THEN sym])+
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	410	apply (subst ln_div [THEN sym])
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	411	apply arith
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	412	apply (auto simp add: ring_eq_simps add_frac_eq frac_eq_eq
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	413	add_divide_distrib power2_eq_square)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	414	apply (rule mult_pos_pos, assumption)+
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	415	apply assumption
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	416	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	417
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	418	lemma ln_x_over_x_mono: "exp 1 <= x ==> x <= y ==> (ln y / y) <= (ln x / x)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	419	proof -
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	420	assume "exp 1 <= x" and "x <= y"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	421	have a: "0 < x" and b: "0 < y"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	422	apply (insert prems)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	423	apply (subgoal_tac "0 < exp 1")
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	424	apply arith
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	425	apply auto
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	426	apply (subgoal_tac "0 < exp 1")
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	427	apply arith
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	428	apply auto
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	429	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	430	have "x * ln y - x * ln x = x * (ln y - ln x)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	431	by (simp add: ring_eq_simps)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	432	also have "... = x * ln(y / x)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	433	apply (subst ln_div)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	434	apply (rule b, rule a, rule refl)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	435	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	436	also have "y / x = (x + (y - x)) / x"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	437	by simp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	438	also have "... = 1 + (y - x) / x"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	439	apply (simp only: add_divide_distrib)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	440	apply (simp add: prems)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	441	apply (insert a, arith)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	442	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	443	also have "x * ln(1 + (y - x) / x) <= x * ((y - x) / x)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	444	apply (rule mult_left_mono)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	445	apply (rule ln_add_one_self_le_self)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	446	apply (rule divide_nonneg_pos)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	447	apply (insert prems a, simp_all)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	448	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	449	also have "... = y - x"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	450	by (insert a, simp)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	451	also have "... = (y - x) * ln (exp 1)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	452	by simp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	453	also have "... <= (y - x) * ln x"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	454	apply (rule mult_left_mono)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	455	apply (subst ln_le_cancel_iff)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	456	apply force
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	457	apply (rule a)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	458	apply (rule prems)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	459	apply (insert prems, simp)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	460	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	461	also have "... = y * ln x - x * ln x"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	462	by (rule left_diff_distrib)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	463	finally have "x * ln y <= y * ln x"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	464	by arith
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	465	then have "ln y <= (y * ln x) / x"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	466	apply (subst pos_le_divide_eq)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	467	apply (rule a)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	468	apply (simp add: mult_ac)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	469	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	470	also have "... = y * (ln x / x)"
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	471	by simp
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	472	finally show ?thesis
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	473	apply (subst pos_divide_le_eq)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	474	apply (rule b)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	475	apply (simp add: mult_ac)
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	476	done
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	477	qed
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	478
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	479	end
17a0c4d79b4c added a new theory; properties of ln avigad parents: diff changeset	480

author	huffman
	Fri, 09 Sep 2005 19:34:22 +0200
changeset 17318	bc1c75855f3d
parent 17013	74bc935273ea
child 19765	dfe940911617
permissions	-rwxr-xr-x