isabelle: src/HOL/Ring_and_Field.thy@838c66e760b5 (annotated)

14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	1	(* Title: HOL/Ring_and_Field.thy
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	2	ID: $Id$
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	3	Author: Gertrud Bauer, Steven Obua, Lawrence C Paulson, and Markus Wenzel,
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	4	with contributions by Jeremy Avigad
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	5	*)
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	6
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	7	header {* (Ordered) Rings and Fields *}
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	8
15229 1eb23f805c06 new simprules for abs and for things like a/b<1 paulson parents: 15228 diff changeset	9	theory Ring_and_Field
15140 322485b816ac import -> imports nipkow parents: 15131 diff changeset	10	imports OrderedGroup
15131 c69542757a4d New theory header syntax. nipkow parents: 15077 diff changeset	11	begin
14504 7a3d80e276d4 new type class abelian_group paulson parents: 14475 diff changeset	12
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	13	text {*
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	14	The theory of partially ordered rings is taken from the books:
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	15	\begin{itemize}
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	16	\item \emph{Lattice Theory} by Garret Birkhoff, American Mathematical Society 1979
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	17	\item \emph{Partially Ordered Algebraic Systems}, Pergamon Press 1963
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	18	\end{itemize}
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	19	Most of the used notions can also be looked up in
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	20	\begin{itemize}
14770 fe9504ba63d5 removed duplicate thms; wenzelm parents: 14754 diff changeset	21	\item \url{http://www.mathworld.com} by Eric Weisstein et. al.
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	22	\item \emph{Algebra I} by van der Waerden, Springer.
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	23	\end{itemize}
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	24	*}
14504 7a3d80e276d4 new type class abelian_group paulson parents: 14475 diff changeset	25
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	26	class semiring = ab_semigroup_add + semigroup_mult +
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	27	assumes left_distrib: "(a \<^loc>+ b) \<^loc>* c = a \<^loc>* c \<^loc>+ b \<^loc>* c"
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	28	assumes right_distrib: "a \<^loc>* (b \<^loc>+ c) = a \<^loc>* b \<^loc>+ a \<^loc>* c"
14504 7a3d80e276d4 new type class abelian_group paulson parents: 14475 diff changeset	29
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	30	class mult_zero = times + zero +
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	31	assumes mult_zero_left [simp]: "\<^loc>0 \<^loc>* a = \<^loc>0"
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	32	assumes mult_zero_right [simp]: "a \<^loc>* \<^loc>0 = \<^loc>0"
21199 2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	33
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	34	class semiring_0 = semiring + comm_monoid_add + mult_zero
21199 2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	35
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	36	class semiring_0_cancel = semiring + comm_monoid_add + cancel_ab_semigroup_add
14504 7a3d80e276d4 new type class abelian_group paulson parents: 14475 diff changeset	37
21199 2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	38	instance semiring_0_cancel \<subseteq> semiring_0
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	39	proof
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	40	fix a :: 'a
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	41	have "0 * a + 0 * a = 0 * a + 0"
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	42	by (simp add: left_distrib [symmetric])
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	43	thus "0 * a = 0"
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	44	by (simp only: add_left_cancel)
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	45
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	46	have "a * 0 + a * 0 = a * 0 + 0"
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	47	by (simp add: right_distrib [symmetric])
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	48	thus "a * 0 = 0"
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	49	by (simp only: add_left_cancel)
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	50	qed
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14770 diff changeset	51
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	52	class comm_semiring = ab_semigroup_add + ab_semigroup_mult +
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	53	assumes distrib: "(a \<^loc>+ b) \<^loc>* c = a \<^loc>* c \<^loc>+ b \<^loc>* c"
14504 7a3d80e276d4 new type class abelian_group paulson parents: 14475 diff changeset	54
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	55	instance comm_semiring \<subseteq> semiring
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	56	proof
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	57	fix a b c :: 'a
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	58	show "(a + b) * c = a * c + b * c" by (simp add: distrib)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	59	have "a * (b + c) = (b + c) * a" by (simp add: mult_ac)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	60	also have "... = b * a + c * a" by (simp only: distrib)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	61	also have "... = a * b + a * c" by (simp add: mult_ac)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	62	finally show "a * (b + c) = a * b + a * c" by blast
14504 7a3d80e276d4 new type class abelian_group paulson parents: 14475 diff changeset	63	qed
7a3d80e276d4 new type class abelian_group paulson parents: 14475 diff changeset	64
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	65	class comm_semiring_0 = comm_semiring + comm_monoid_add + mult_zero
14504 7a3d80e276d4 new type class abelian_group paulson parents: 14475 diff changeset	66
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	67	instance comm_semiring_0 \<subseteq> semiring_0 ..
14504 7a3d80e276d4 new type class abelian_group paulson parents: 14475 diff changeset	68
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	69	class comm_semiring_0_cancel = comm_semiring + comm_monoid_add + cancel_ab_semigroup_add
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14770 diff changeset	70
b9ab8babd8b3 Further development of matrix theory obua parents: 14770 diff changeset	71	instance comm_semiring_0_cancel \<subseteq> semiring_0_cancel ..
b9ab8babd8b3 Further development of matrix theory obua parents: 14770 diff changeset	72
21199 2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	73	instance comm_semiring_0_cancel \<subseteq> comm_semiring_0 ..
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	74
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	75	class zero_neq_one = zero + one +
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	76	assumes zero_neq_one [simp]: "\<^loc>0 \<noteq> \<^loc>1"
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	77
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	78	class semiring_1 = zero_neq_one + semiring_0 + monoid_mult
14504 7a3d80e276d4 new type class abelian_group paulson parents: 14475 diff changeset	79
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	80	class comm_semiring_1 = zero_neq_one + comm_semiring_0 + comm_monoid_mult
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	81	(previously almost_semiring)
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	82
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	83	instance comm_semiring_1 \<subseteq> semiring_1 ..
14421 ee97b6463cb4 new Ring_and_Field hierarchy, eliminating redundant axioms paulson parents: 14398 diff changeset	84
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	85	class no_zero_divisors = zero + times +
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	86	assumes no_zero_divisors: "a \<noteq> \<^loc>0 \<Longrightarrow> b \<noteq> \<^loc>0 \<Longrightarrow> a \<^loc>* b \<noteq> \<^loc>0"
14504 7a3d80e276d4 new type class abelian_group paulson parents: 14475 diff changeset	87
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	88	class semiring_1_cancel = semiring + comm_monoid_add + zero_neq_one
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	89	+ cancel_ab_semigroup_add + monoid_mult
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14770 diff changeset	90
b9ab8babd8b3 Further development of matrix theory obua parents: 14770 diff changeset	91	instance semiring_1_cancel \<subseteq> semiring_0_cancel ..
b9ab8babd8b3 Further development of matrix theory obua parents: 14770 diff changeset	92
21199 2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	93	instance semiring_1_cancel \<subseteq> semiring_1 ..
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	94
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	95	class comm_semiring_1_cancel = comm_semiring + comm_monoid_add + comm_monoid_mult
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	96	+ zero_neq_one + cancel_ab_semigroup_add
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	97
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14770 diff changeset	98	instance comm_semiring_1_cancel \<subseteq> semiring_1_cancel ..
b9ab8babd8b3 Further development of matrix theory obua parents: 14770 diff changeset	99
b9ab8babd8b3 Further development of matrix theory obua parents: 14770 diff changeset	100	instance comm_semiring_1_cancel \<subseteq> comm_semiring_0_cancel ..
b9ab8babd8b3 Further development of matrix theory obua parents: 14770 diff changeset	101
21199 2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	102	instance comm_semiring_1_cancel \<subseteq> comm_semiring_1 ..
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	103
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	104	class ring = semiring + ab_group_add
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	105
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14770 diff changeset	106	instance ring \<subseteq> semiring_0_cancel ..
14504 7a3d80e276d4 new type class abelian_group paulson parents: 14475 diff changeset	107
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	108	class comm_ring = comm_semiring + ab_group_add
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	109
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	110	instance comm_ring \<subseteq> ring ..
14504 7a3d80e276d4 new type class abelian_group paulson parents: 14475 diff changeset	111
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14770 diff changeset	112	instance comm_ring \<subseteq> comm_semiring_0_cancel ..
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	113
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	114	class ring_1 = ring + zero_neq_one + monoid_mult
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	115
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14770 diff changeset	116	instance ring_1 \<subseteq> semiring_1_cancel ..
b9ab8babd8b3 Further development of matrix theory obua parents: 14770 diff changeset	117
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	118	class comm_ring_1 = comm_ring + zero_neq_one + comm_monoid_mult
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	119	(previously ring)
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	120
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	121	instance comm_ring_1 \<subseteq> ring_1 ..
14421 ee97b6463cb4 new Ring_and_Field hierarchy, eliminating redundant axioms paulson parents: 14398 diff changeset	122
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	123	instance comm_ring_1 \<subseteq> comm_semiring_1_cancel ..
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	124
22990 775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	125	class ring_no_zero_divisors = ring + no_zero_divisors
775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	126
775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	127	class dom = ring_1 + ring_no_zero_divisors
775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	128
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	129	class idom = comm_ring_1 + no_zero_divisors
14421 ee97b6463cb4 new Ring_and_Field hierarchy, eliminating redundant axioms paulson parents: 14398 diff changeset	130
22990 775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	131	instance idom \<subseteq> dom ..
775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	132
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	133	class division_ring = ring_1 + inverse +
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	134	assumes left_inverse [simp]: "a \<noteq> \<^loc>0 \<Longrightarrow> inverse a \<^loc>* a = \<^loc>1"
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	135	assumes right_inverse [simp]: "a \<noteq> \<^loc>0 \<Longrightarrow> a \<^loc>* inverse a = \<^loc>1"
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	136
22990 775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	137	instance division_ring \<subseteq> dom
22987 550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	138	proof
550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	139	fix a b :: 'a
550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	140	assume a: "a \<noteq> 0" and b: "b \<noteq> 0"
550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	141	show "a * b \<noteq> 0"
550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	142	proof
550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	143	assume ab: "a * b = 0"
550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	144	hence "0 = inverse a * (a * b) * inverse b"
550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	145	by simp
550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	146	also have "\<dots> = (inverse a * a) * (b * inverse b)"
550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	147	by (simp only: mult_assoc)
550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	148	also have "\<dots> = 1"
550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	149	using a b by simp
550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	150	finally show False
550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	151	by simp
550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	152	qed
550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	153	qed
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	154
22987 550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	155	class field = comm_ring_1 + inverse +
550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	156	assumes field_inverse: "a \<noteq> 0 \<Longrightarrow> inverse a \<^loc>* a = \<^loc>1"
550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	157	assumes divide_inverse: "a \<^loc>/ b = a \<^loc>* inverse b"
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	158
23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	159	instance field \<subseteq> division_ring
22987 550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	160	proof
550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	161	fix a :: 'a
550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	162	assume "a \<noteq> 0"
550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	163	thus "inverse a * a = 1" by (rule field_inverse)
550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	164	thus "a * inverse a = 1" by (simp only: mult_commute)
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	165	qed
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	166
22987 550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	167	instance field \<subseteq> idom ..
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	168
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	169	class division_by_zero = zero + inverse +
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	170	assumes inverse_zero [simp]: "inverse \<^loc>0 = \<^loc>0"
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	171
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	172	subsection {* Distribution rules *}
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	173
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	174	theorems ring_distrib = right_distrib left_distrib
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	175
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	176	text{For the @{text combine_numerals} simproc}
14421 ee97b6463cb4 new Ring_and_Field hierarchy, eliminating redundant axioms paulson parents: 14398 diff changeset	177	lemma combine_common_factor:
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	178	"ae + (be + c) = (a+b)*e + (c::'a::semiring)"
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	179	by (simp add: left_distrib add_ac)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	180
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	181	lemma minus_mult_left: "- (a * b) = (-a) * (b::'a::ring)"
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	182	apply (rule equals_zero_I)
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	183	apply (simp add: left_distrib [symmetric])
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	184	done
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	185
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	186	lemma minus_mult_right: "- (a * b) = a * -(b::'a::ring)"
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	187	apply (rule equals_zero_I)
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	188	apply (simp add: right_distrib [symmetric])
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	189	done
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	190
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	191	lemma minus_mult_minus [simp]: "(- a) * (- b) = a * (b::'a::ring)"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	192	by (simp add: minus_mult_left [symmetric] minus_mult_right [symmetric])
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	193
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	194	lemma minus_mult_commute: "(- a) * b = a * (- b::'a::ring)"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	195	by (simp add: minus_mult_left [symmetric] minus_mult_right [symmetric])
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	196
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	197	lemma right_diff_distrib: "a * (b - c) = a * b - a * (c::'a::ring)"
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	198	by (simp add: right_distrib diff_minus
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	199	minus_mult_left [symmetric] minus_mult_right [symmetric])
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	200
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	201	lemma left_diff_distrib: "(a - b) * c = a * c - b * (c::'a::ring)"
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	202	by (simp add: left_distrib diff_minus
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	203	minus_mult_left [symmetric] minus_mult_right [symmetric])
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	204
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	205	class mult_mono = times + zero + ord +
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	206	assumes mult_left_mono: "a \<sqsubseteq> b \<Longrightarrow> \<^loc>0 \<sqsubseteq> c \<Longrightarrow> c \<^loc>* a \<sqsubseteq> c \<^loc>* b"
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	207	assumes mult_right_mono: "a \<sqsubseteq> b \<Longrightarrow> \<^loc>0 \<sqsubseteq> c \<Longrightarrow> a \<^loc>* c \<sqsubseteq> b \<^loc>* c"
14267 b963e9cee2a0 More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas paulson parents: 14266 diff changeset	208
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	209	class pordered_semiring = mult_mono + semiring_0 + pordered_ab_semigroup_add
21199 2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	210
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	211	class pordered_cancel_semiring = mult_mono + pordered_ab_semigroup_add
22987 550709aa8e66 instance division_ring < no_zero_divisors; clean up field instance proofs huffman parents: 22842 diff changeset	212	+ semiring + comm_monoid_add + cancel_ab_semigroup_add
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	213
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14770 diff changeset	214	instance pordered_cancel_semiring \<subseteq> semiring_0_cancel ..
b9ab8babd8b3 Further development of matrix theory obua parents: 14770 diff changeset	215
21199 2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	216	instance pordered_cancel_semiring \<subseteq> pordered_semiring ..
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	217
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	218	class ordered_semiring_strict = semiring + comm_monoid_add + ordered_cancel_ab_semigroup_add +
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	219	assumes mult_strict_left_mono: "a \<sqsubset> b \<Longrightarrow> \<^loc>0 \<sqsubset> c \<Longrightarrow> c \<^loc>* a \<sqsubset> c \<^loc>* b"
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	220	assumes mult_strict_right_mono: "a \<sqsubset> b \<Longrightarrow> \<^loc>0 \<sqsubset> c \<Longrightarrow> a \<^loc>* c \<sqsubset> b \<^loc>* c"
14341 a09441bd4f1e Ring_and_Field now requires axiom add_left_imp_eq for semirings. paulson parents: 14334 diff changeset	221
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14770 diff changeset	222	instance ordered_semiring_strict \<subseteq> semiring_0_cancel ..
b9ab8babd8b3 Further development of matrix theory obua parents: 14770 diff changeset	223
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	224	instance ordered_semiring_strict \<subseteq> pordered_cancel_semiring
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	225	apply intro_classes
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	226	apply (cases "a < b & 0 < c")
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	227	apply (auto simp add: mult_strict_left_mono order_less_le)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	228	apply (auto simp add: mult_strict_left_mono order_le_less)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	229	apply (simp add: mult_strict_right_mono)
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	230	done
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	231
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	232	class mult_mono1 = times + zero + ord +
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	233	assumes mult_mono: "a \<sqsubseteq> b \<Longrightarrow> \<^loc>0 \<sqsubseteq> c \<Longrightarrow> c \<^loc>* a \<sqsubseteq> c \<^loc>* b"
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	234
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	235	class pordered_comm_semiring = comm_semiring_0
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	236	+ pordered_ab_semigroup_add + mult_mono1
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	237
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	238	class pordered_cancel_comm_semiring = comm_semiring_0_cancel
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	239	+ pordered_ab_semigroup_add + mult_mono1
21199 2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	240
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	241	instance pordered_cancel_comm_semiring \<subseteq> pordered_comm_semiring ..
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	242
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	243	class ordered_comm_semiring_strict = comm_semiring_0 + ordered_cancel_ab_semigroup_add +
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	244	assumes mult_strict_mono: "a \<sqsubset> b \<Longrightarrow> \<^loc>0 \<sqsubset> c \<Longrightarrow> c \<^loc>* a \<sqsubset> c \<^loc>* b"
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	245
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	246	instance pordered_comm_semiring \<subseteq> pordered_semiring
21199 2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	247	proof
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	248	fix a b c :: 'a
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	249	assume A: "a <= b" "0 <= c"
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	250	with mult_mono show "c * a <= c * b" .
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	251
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	252	from mult_commute have "a * c = c * a" ..
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	253	also from mult_mono A have "\<dots> <= c * b" .
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	254	also from mult_commute have "c * b = b * c" ..
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	255	finally show "a * c <= b * c" .
2d83f93c3580 * Added annihilation axioms ("x * 0 = 0") to axclass semiring_0. krauss parents: 20633 diff changeset	256	qed
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	257
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	258	instance pordered_cancel_comm_semiring \<subseteq> pordered_cancel_semiring ..
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	259
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	260	instance ordered_comm_semiring_strict \<subseteq> ordered_semiring_strict
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	261	by (intro_classes, insert mult_strict_mono, simp_all add: mult_commute, blast+)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	262
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	263	instance ordered_comm_semiring_strict \<subseteq> pordered_cancel_comm_semiring
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	264	apply (intro_classes)
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	265	apply (cases "a < b & 0 < c")
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	266	apply (auto simp add: mult_strict_left_mono order_less_le)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	267	apply (auto simp add: mult_strict_left_mono order_le_less)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	268	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	269
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	270	class pordered_ring = ring + pordered_cancel_semiring
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	271
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	272	instance pordered_ring \<subseteq> pordered_ab_group_add ..
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	273
22452 8a86fd2a1bf0 adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy haftmann parents: 22422 diff changeset	274	class lordered_ring = pordered_ring + lordered_ab_group_abs
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	275
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14770 diff changeset	276	instance lordered_ring \<subseteq> lordered_ab_group_meet ..
b9ab8babd8b3 Further development of matrix theory obua parents: 14770 diff changeset	277
b9ab8babd8b3 Further development of matrix theory obua parents: 14770 diff changeset	278	instance lordered_ring \<subseteq> lordered_ab_group_join ..
b9ab8babd8b3 Further development of matrix theory obua parents: 14770 diff changeset	279
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	280	class abs_if = minus + ord + zero +
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	281	assumes abs_if: "abs a = (if a \<sqsubset> 0 then (uminus a) else a)"
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	282
22452 8a86fd2a1bf0 adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy haftmann parents: 22422 diff changeset	283	class ordered_ring_strict = ring + ordered_semiring_strict + abs_if + lordered_ab_group
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	284
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	285	instance ordered_ring_strict \<subseteq> lordered_ring
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22390 diff changeset	286	by intro_classes (simp add: abs_if sup_eq_if)
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	287
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	288	class pordered_comm_ring = comm_ring + pordered_comm_semiring
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	289
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	290	class ordered_semidom = comm_semiring_1_cancel + ordered_comm_semiring_strict +
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	291	(previously ordered_semiring)
378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	292	assumes zero_less_one [simp]: "\<^loc>0 \<sqsubset> \<^loc>1"
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	293
22452 8a86fd2a1bf0 adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy haftmann parents: 22422 diff changeset	294	class ordered_idom = comm_ring_1 + ordered_comm_semiring_strict + abs_if + lordered_ab_group
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	295	(previously ordered_ring)
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	296
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	297	instance ordered_idom \<subseteq> ordered_ring_strict ..
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	298
22390 378f34b1e380 now using "class" haftmann parents: 21328 diff changeset	299	class ordered_field = field + ordered_idom
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	300
15923 01d5d0c1c078 fixed lin.arith nipkow parents: 15769 diff changeset	301	lemmas linorder_neqE_ordered_idom =
01d5d0c1c078 fixed lin.arith nipkow parents: 15769 diff changeset	302	linorder_neqE[where 'a = "?'b::ordered_idom"]
01d5d0c1c078 fixed lin.arith nipkow parents: 15769 diff changeset	303
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	304	lemma eq_add_iff1:
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	305	"(ae + c = be + d) = ((a-b)*e + c = (d::'a::ring))"
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	306	apply (simp add: diff_minus left_distrib)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	307	apply (simp add: diff_minus left_distrib add_ac)
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	308	apply (simp add: compare_rls minus_mult_left [symmetric])
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	309	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	310
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	311	lemma eq_add_iff2:
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	312	"(ae + c = be + d) = (c = (b-a)*e + (d::'a::ring))"
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	313	apply (simp add: diff_minus left_distrib add_ac)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	314	apply (simp add: compare_rls minus_mult_left [symmetric])
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	315	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	316
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	317	lemma less_add_iff1:
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	318	"(ae + c < be + d) = ((a-b)*e + c < (d::'a::pordered_ring))"
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	319	apply (simp add: diff_minus left_distrib add_ac)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	320	apply (simp add: compare_rls minus_mult_left [symmetric])
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	321	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	322
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	323	lemma less_add_iff2:
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	324	"(ae + c < be + d) = (c < (b-a)*e + (d::'a::pordered_ring))"
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	325	apply (simp add: diff_minus left_distrib add_ac)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	326	apply (simp add: compare_rls minus_mult_left [symmetric])
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	327	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	328
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	329	lemma le_add_iff1:
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	330	"(ae + c \<le> be + d) = ((a-b)*e + c \<le> (d::'a::pordered_ring))"
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	331	apply (simp add: diff_minus left_distrib add_ac)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	332	apply (simp add: compare_rls minus_mult_left [symmetric])
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	333	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	334
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	335	lemma le_add_iff2:
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	336	"(ae + c \<le> be + d) = (c \<le> (b-a)*e + (d::'a::pordered_ring))"
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	337	apply (simp add: diff_minus left_distrib add_ac)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	338	apply (simp add: compare_rls minus_mult_left [symmetric])
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	339	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14270 diff changeset	340
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	341	subsection {* Ordering Rules for Multiplication *}
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	342
14348 744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for paulson parents: 14341 diff changeset	343	lemma mult_left_le_imp_le:
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	344	"[\|ca \<le> cb; 0 < c\|] ==> a \<le> (b::'a::ordered_semiring_strict)"
14348 744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for paulson parents: 14341 diff changeset	345	by (force simp add: mult_strict_left_mono linorder_not_less [symmetric])
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for paulson parents: 14341 diff changeset	346
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for paulson parents: 14341 diff changeset	347	lemma mult_right_le_imp_le:
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	348	"[\|ac \<le> bc; 0 < c\|] ==> a \<le> (b::'a::ordered_semiring_strict)"
14348 744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for paulson parents: 14341 diff changeset	349	by (force simp add: mult_strict_right_mono linorder_not_less [symmetric])
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for paulson parents: 14341 diff changeset	350
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for paulson parents: 14341 diff changeset	351	lemma mult_left_less_imp_less:
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	352	"[\|ca < cb; 0 \<le> c\|] ==> a < (b::'a::ordered_semiring_strict)"
14348 744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for paulson parents: 14341 diff changeset	353	by (force simp add: mult_left_mono linorder_not_le [symmetric])
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for paulson parents: 14341 diff changeset	354
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for paulson parents: 14341 diff changeset	355	lemma mult_right_less_imp_less:
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	356	"[\|ac < bc; 0 \<le> c\|] ==> a < (b::'a::ordered_semiring_strict)"
14348 744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for paulson parents: 14341 diff changeset	357	by (force simp add: mult_right_mono linorder_not_le [symmetric])
744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for paulson parents: 14341 diff changeset	358
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	359	lemma mult_strict_left_mono_neg:
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	360	"[\|b < a; c < 0\|] ==> c * a < c * (b::'a::ordered_ring_strict)"
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	361	apply (drule mult_strict_left_mono [of _ _ "-c"])
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	362	apply (simp_all add: minus_mult_left [symmetric])
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	363	done
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	364
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	365	lemma mult_left_mono_neg:
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	366	"[\|b \<le> a; c \<le> 0\|] ==> c * a \<le> c * (b::'a::pordered_ring)"
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	367	apply (drule mult_left_mono [of _ _ "-c"])
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	368	apply (simp_all add: minus_mult_left [symmetric])
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	369	done
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	370
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	371	lemma mult_strict_right_mono_neg:
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	372	"[\|b < a; c < 0\|] ==> a * c < b * (c::'a::ordered_ring_strict)"
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	373	apply (drule mult_strict_right_mono [of _ _ "-c"])
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	374	apply (simp_all add: minus_mult_right [symmetric])
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	375	done
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	376
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	377	lemma mult_right_mono_neg:
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	378	"[\|b \<le> a; c \<le> 0\|] ==> a * c \<le> (b::'a::pordered_ring) * c"
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	379	apply (drule mult_right_mono [of _ _ "-c"])
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	380	apply (simp)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	381	apply (simp_all add: minus_mult_right [symmetric])
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	382	done
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	383
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	384	subsection{* Products of Signs *}
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	385
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	386	lemma mult_pos_pos: "[\| (0::'a::ordered_semiring_strict) < a; 0 < b \|] ==> 0 < a*b"
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	387	by (drule mult_strict_left_mono [of 0 b], auto)
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	388
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	389	lemma mult_nonneg_nonneg: "[\| (0::'a::pordered_cancel_semiring) \<le> a; 0 \<le> b \|] ==> 0 \<le> a*b"
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	390	by (drule mult_left_mono [of 0 b], auto)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	391
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	392	lemma mult_pos_neg: "[\| (0::'a::ordered_semiring_strict) < a; b < 0 \|] ==> a*b < 0"
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	393	by (drule mult_strict_left_mono [of b 0], auto)
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	394
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	395	lemma mult_nonneg_nonpos: "[\| (0::'a::pordered_cancel_semiring) \<le> a; b \<le> 0 \|] ==> a*b \<le> 0"
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	396	by (drule mult_left_mono [of b 0], auto)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	397
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	398	lemma mult_pos_neg2: "[\| (0::'a::ordered_semiring_strict) < a; b < 0 \|] ==> b*a < 0"
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	399	by (drule mult_strict_right_mono[of b 0], auto)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	400
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	401	lemma mult_nonneg_nonpos2: "[\| (0::'a::pordered_cancel_semiring) \<le> a; b \<le> 0 \|] ==> b*a \<le> 0"
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	402	by (drule mult_right_mono[of b 0], auto)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	403
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	404	lemma mult_neg_neg: "[\| a < (0::'a::ordered_ring_strict); b < 0 \|] ==> 0 < a*b"
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	405	by (drule mult_strict_right_mono_neg, auto)
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	406
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	407	lemma mult_nonpos_nonpos: "[\| a \<le> (0::'a::pordered_ring); b \<le> 0 \|] ==> 0 \<le> a*b"
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	408	by (drule mult_right_mono_neg[of a 0 b ], auto)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	409
14341 a09441bd4f1e Ring_and_Field now requires axiom add_left_imp_eq for semirings. paulson parents: 14334 diff changeset	410	lemma zero_less_mult_pos:
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	411	"[\| 0 < a*b; 0 < a\|] ==> 0 < (b::'a::ordered_semiring_strict)"
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	412	apply (cases "b\<le>0")
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	413	apply (auto simp add: order_le_less linorder_not_less)
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	414	apply (drule_tac mult_pos_neg [of a b])
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	415	apply (auto dest: order_less_not_sym)
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	416	done
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	417
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	418	lemma zero_less_mult_pos2:
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	419	"[\| 0 < b*a; 0 < a\|] ==> 0 < (b::'a::ordered_semiring_strict)"
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	420	apply (cases "b\<le>0")
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	421	apply (auto simp add: order_le_less linorder_not_less)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	422	apply (drule_tac mult_pos_neg2 [of a b])
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	423	apply (auto dest: order_less_not_sym)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	424	done
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	425
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	426	lemma zero_less_mult_iff:
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	427	"((0::'a::ordered_ring_strict) < a*b) = (0 < a & 0 < b \| a < 0 & b < 0)"
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	428	apply (auto simp add: order_le_less linorder_not_less mult_pos_pos
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	429	mult_neg_neg)
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	430	apply (blast dest: zero_less_mult_pos)
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	431	apply (blast dest: zero_less_mult_pos2)
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	432	done
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	433
22990 775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	434	lemma mult_eq_0_iff [simp]:
775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	435	fixes a b :: "'a::ring_no_zero_divisors"
775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	436	shows "(a * b = 0) = (a = 0 \<or> b = 0)"
775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	437	by (cases "a = 0 \<or> b = 0", auto dest: no_zero_divisors)
775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	438
775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	439	instance ordered_ring_strict \<subseteq> ring_no_zero_divisors
775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	440	apply intro_classes
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	441	apply (auto simp add: linorder_not_less order_le_less linorder_neq_iff)
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	442	apply (force dest: mult_strict_right_mono_neg mult_strict_right_mono)+
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	443	done
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	444
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	445	lemma zero_le_mult_iff:
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	446	"((0::'a::ordered_ring_strict) \<le> a*b) = (0 \<le> a & 0 \<le> b \| a \<le> 0 & b \<le> 0)"
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	447	by (auto simp add: eq_commute [of 0] order_le_less linorder_not_less
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	448	zero_less_mult_iff)
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	449
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	450	lemma mult_less_0_iff:
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	451	"(a*b < (0::'a::ordered_ring_strict)) = (0 < a & b < 0 \| a < 0 & 0 < b)"
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	452	apply (insert zero_less_mult_iff [of "-a" b])
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	453	apply (force simp add: minus_mult_left[symmetric])
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	454	done
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	455
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	456	lemma mult_le_0_iff:
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	457	"(a*b \<le> (0::'a::ordered_ring_strict)) = (0 \<le> a & b \<le> 0 \| a \<le> 0 & 0 \<le> b)"
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	458	apply (insert zero_le_mult_iff [of "-a" b])
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	459	apply (force simp add: minus_mult_left[symmetric])
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	460	done
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	461
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	462	lemma split_mult_pos_le: "(0 \<le> a & 0 \<le> b) \| (a \<le> 0 & b \<le> 0) \<Longrightarrow> 0 \<le> a * (b::_::pordered_ring)"
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	463	by (auto simp add: mult_nonneg_nonneg mult_nonpos_nonpos)
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	464
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	465	lemma split_mult_neg_le: "(0 \<le> a & b \<le> 0) \| (a \<le> 0 & 0 \<le> b) \<Longrightarrow> a * b \<le> (0::_::pordered_cancel_semiring)"
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	466	by (auto simp add: mult_nonneg_nonpos mult_nonneg_nonpos2)
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	467
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	468	lemma zero_le_square: "(0::'a::ordered_ring_strict) \<le> a*a"
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	469	by (simp add: zero_le_mult_iff linorder_linear)
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	470
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	471	text{*Proving axiom @{text zero_less_one} makes all @{text ordered_semidom}
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	472	theorems available to members of @{term ordered_idom} *}
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	473
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	474	instance ordered_idom \<subseteq> ordered_semidom
14421 ee97b6463cb4 new Ring_and_Field hierarchy, eliminating redundant axioms paulson parents: 14398 diff changeset	475	proof
ee97b6463cb4 new Ring_and_Field hierarchy, eliminating redundant axioms paulson parents: 14398 diff changeset	476	have "(0::'a) \<le> 1*1" by (rule zero_le_square)
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14421 diff changeset	477	thus "(0::'a) < 1" by (simp add: order_le_less)
14421 ee97b6463cb4 new Ring_and_Field hierarchy, eliminating redundant axioms paulson parents: 14398 diff changeset	478	qed
ee97b6463cb4 new Ring_and_Field hierarchy, eliminating redundant axioms paulson parents: 14398 diff changeset	479
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	480	instance ordered_idom \<subseteq> idom ..
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	481
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14377 diff changeset	482	text{All three types of comparision involving 0 and 1 are covered.}
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14377 diff changeset	483
17085 5b57f995a179 more simprules now have names paulson parents: 16775 diff changeset	484	lemmas one_neq_zero = zero_neq_one [THEN not_sym]
5b57f995a179 more simprules now have names paulson parents: 16775 diff changeset	485	declare one_neq_zero [simp]
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14377 diff changeset	486
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	487	lemma zero_le_one [simp]: "(0::'a::ordered_semidom) \<le> 1"
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	488	by (rule zero_less_one [THEN order_less_imp_le])
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	489
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	490	lemma not_one_le_zero [simp]: "~ (1::'a::ordered_semidom) \<le> 0"
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	491	by (simp add: linorder_not_le)
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14377 diff changeset	492
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	493	lemma not_one_less_zero [simp]: "~ (1::'a::ordered_semidom) < 0"
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	494	by (simp add: linorder_not_less)
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	495
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	496	subsection{More Monotonicity}
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	497
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	498	text{Strict monotonicity in both arguments}
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	499	lemma mult_strict_mono:
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	500	"[\|a<b; c<d; 0<b; 0\<le>c\|] ==> a * c < b * (d::'a::ordered_semiring_strict)"
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	501	apply (cases "c=0")
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	502	apply (simp add: mult_pos_pos)
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	503	apply (erule mult_strict_right_mono [THEN order_less_trans])
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	504	apply (force simp add: order_le_less)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	505	apply (erule mult_strict_left_mono, assumption)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	506	done
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	507
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	508	text{This weaker variant has more natural premises}
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	509	lemma mult_strict_mono':
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	510	"[\| a<b; c<d; 0 \<le> a; 0 \<le> c\|] ==> a * c < b * (d::'a::ordered_semiring_strict)"
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	511	apply (rule mult_strict_mono)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	512	apply (blast intro: order_le_less_trans)+
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	513	done
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	514
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	515	lemma mult_mono:
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	516	"[\|a \<le> b; c \<le> d; 0 \<le> b; 0 \<le> c\|]
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	517	==> a * c \<le> b * (d::'a::pordered_semiring)"
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	518	apply (erule mult_right_mono [THEN order_trans], assumption)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	519	apply (erule mult_left_mono, assumption)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	520	done
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	521
21258 62f25a96f0c1 added lemma mult_mono' huffman parents: 21199 diff changeset	522	lemma mult_mono':
62f25a96f0c1 added lemma mult_mono' huffman parents: 21199 diff changeset	523	"[\|a \<le> b; c \<le> d; 0 \<le> a; 0 \<le> c\|]
62f25a96f0c1 added lemma mult_mono' huffman parents: 21199 diff changeset	524	==> a * c \<le> b * (d::'a::pordered_semiring)"
62f25a96f0c1 added lemma mult_mono' huffman parents: 21199 diff changeset	525	apply (rule mult_mono)
62f25a96f0c1 added lemma mult_mono' huffman parents: 21199 diff changeset	526	apply (fast intro: order_trans)+
62f25a96f0c1 added lemma mult_mono' huffman parents: 21199 diff changeset	527	done
62f25a96f0c1 added lemma mult_mono' huffman parents: 21199 diff changeset	528
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	529	lemma less_1_mult: "[\| 1 < m; 1 < n \|] ==> 1 < m*(n::'a::ordered_semidom)"
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14377 diff changeset	530	apply (insert mult_strict_mono [of 1 m 1 n])
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14421 diff changeset	531	apply (simp add: order_less_trans [OF zero_less_one])
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14377 diff changeset	532	done
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14377 diff changeset	533
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	534	lemma mult_less_le_imp_less: "(a::'a::ordered_semiring_strict) < b ==>
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	535	c <= d ==> 0 <= a ==> 0 < c ==> a * c < b * d"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	536	apply (subgoal_tac "a * c < b * c")
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	537	apply (erule order_less_le_trans)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	538	apply (erule mult_left_mono)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	539	apply simp
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	540	apply (erule mult_strict_right_mono)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	541	apply assumption
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	542	done
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	543
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	544	lemma mult_le_less_imp_less: "(a::'a::ordered_semiring_strict) <= b ==>
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	545	c < d ==> 0 < a ==> 0 <= c ==> a * c < b * d"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	546	apply (subgoal_tac "a * c <= b * c")
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	547	apply (erule order_le_less_trans)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	548	apply (erule mult_strict_left_mono)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	549	apply simp
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	550	apply (erule mult_right_mono)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	551	apply simp
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	552	done
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	553
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	554	subsection{Cancellation Laws for Relationships With a Common Factor}
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	555
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	556	text{Cancellation laws for @{term "ca < cb"} and @{term "ac < b*c"},
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	557	also with the relations @{text "\<le>"} and equality.*}
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	558
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	559	text{*These ``disjunction'' versions produce two cases when the comparison is
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	560	an assumption, but effectively four when the comparison is a goal.*}
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	561
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	562	lemma mult_less_cancel_right_disj:
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	563	"(ac < bc) = ((0 < c & a < b) \| (c < 0 & b < (a::'a::ordered_ring_strict)))"
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	564	apply (cases "c = 0")
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	565	apply (auto simp add: linorder_neq_iff mult_strict_right_mono
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	566	mult_strict_right_mono_neg)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	567	apply (auto simp add: linorder_not_less
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	568	linorder_not_le [symmetric, of "a*c"]
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	569	linorder_not_le [symmetric, of a])
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	570	apply (erule_tac [!] notE)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	571	apply (auto simp add: order_less_imp_le mult_right_mono
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	572	mult_right_mono_neg)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	573	done
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	574
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	575	lemma mult_less_cancel_left_disj:
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	576	"(ca < cb) = ((0 < c & a < b) \| (c < 0 & b < (a::'a::ordered_ring_strict)))"
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	577	apply (cases "c = 0")
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	578	apply (auto simp add: linorder_neq_iff mult_strict_left_mono
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	579	mult_strict_left_mono_neg)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	580	apply (auto simp add: linorder_not_less
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	581	linorder_not_le [symmetric, of "c*a"]
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	582	linorder_not_le [symmetric, of a])
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	583	apply (erule_tac [!] notE)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	584	apply (auto simp add: order_less_imp_le mult_left_mono
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	585	mult_left_mono_neg)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	586	done
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	587
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	588
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	589	text{*The ``conjunction of implication'' lemmas produce two cases when the
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	590	comparison is a goal, but give four when the comparison is an assumption.*}
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	591
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	592	lemma mult_less_cancel_right:
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	593	fixes c :: "'a :: ordered_ring_strict"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	594	shows "(ac < bc) = ((0 \<le> c --> a < b) & (c \<le> 0 --> b < a))"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	595	by (insert mult_less_cancel_right_disj [of a c b], auto)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	596
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	597	lemma mult_less_cancel_left:
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	598	fixes c :: "'a :: ordered_ring_strict"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	599	shows "(ca < cb) = ((0 \<le> c --> a < b) & (c \<le> 0 --> b < a))"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	600	by (insert mult_less_cancel_left_disj [of c a b], auto)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	601
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	602	lemma mult_le_cancel_right:
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	603	"(ac \<le> bc) = ((0<c --> a\<le>b) & (c<0 --> b \<le> (a::'a::ordered_ring_strict)))"
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	604	by (simp add: linorder_not_less [symmetric] mult_less_cancel_right_disj)
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	605
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	606	lemma mult_le_cancel_left:
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	607	"(ca \<le> cb) = ((0<c --> a\<le>b) & (c<0 --> b \<le> (a::'a::ordered_ring_strict)))"
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	608	by (simp add: linorder_not_less [symmetric] mult_less_cancel_left_disj)
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	609
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	610	lemma mult_less_imp_less_left:
14341 a09441bd4f1e Ring_and_Field now requires axiom add_left_imp_eq for semirings. paulson parents: 14334 diff changeset	611	assumes less: "ca < cb" and nonneg: "0 \<le> c"
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	612	shows "a < (b::'a::ordered_semiring_strict)"
14377 f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	613	proof (rule ccontr)
f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	614	assume "~ a < b"
f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	615	hence "b \<le> a" by (simp add: linorder_not_less)
f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	616	hence "cb \<le> ca" by (rule mult_left_mono)
f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	617	with this and less show False
f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	618	by (simp add: linorder_not_less [symmetric])
f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	619	qed
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	620
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	621	lemma mult_less_imp_less_right:
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	622	assumes less: "ac < bc" and nonneg: "0 <= c"
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	623	shows "a < (b::'a::ordered_semiring_strict)"
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	624	proof (rule ccontr)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	625	assume "~ a < b"
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	626	hence "b \<le> a" by (simp add: linorder_not_less)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	627	hence "bc \<le> ac" by (rule mult_right_mono)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	628	with this and less show False
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	629	by (simp add: linorder_not_less [symmetric])
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	630	qed
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	631
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	632	text{Cancellation of equalities with a common factor}
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	633	lemma mult_cancel_right [simp]:
22990 775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	634	fixes a b c :: "'a::ring_no_zero_divisors"
775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	635	shows "(a * c = b * c) = (c = 0 \<or> a = b)"
775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	636	proof -
775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	637	have "(a * c = b * c) = ((a - b) * c = 0)"
775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	638	by (simp add: left_diff_distrib)
775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	639	thus ?thesis
775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	640	by (simp add: disj_commute)
775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	641	qed
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	642
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	643	lemma mult_cancel_left [simp]:
22990 775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	644	fixes a b c :: "'a::ring_no_zero_divisors"
775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	645	shows "(c * a = c * b) = (c = 0 \<or> a = b)"
775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	646	proof -
775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	647	have "(c * a = c * b) = (c * (a - b) = 0)"
775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	648	by (simp add: right_diff_distrib)
775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	649	thus ?thesis
775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	650	by simp
775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	651	qed
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	652
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	653
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	654	subsubsection{Special Cancellation Simprules for Multiplication}
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	655
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	656	text{These also produce two cases when the comparison is a goal.}
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	657
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	658	lemma mult_le_cancel_right1:
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	659	fixes c :: "'a :: ordered_idom"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	660	shows "(c \<le> b*c) = ((0<c --> 1\<le>b) & (c<0 --> b \<le> 1))"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	661	by (insert mult_le_cancel_right [of 1 c b], simp)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	662
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	663	lemma mult_le_cancel_right2:
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	664	fixes c :: "'a :: ordered_idom"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	665	shows "(a*c \<le> c) = ((0<c --> a\<le>1) & (c<0 --> 1 \<le> a))"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	666	by (insert mult_le_cancel_right [of a c 1], simp)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	667
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	668	lemma mult_le_cancel_left1:
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	669	fixes c :: "'a :: ordered_idom"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	670	shows "(c \<le> c*b) = ((0<c --> 1\<le>b) & (c<0 --> b \<le> 1))"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	671	by (insert mult_le_cancel_left [of c 1 b], simp)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	672
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	673	lemma mult_le_cancel_left2:
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	674	fixes c :: "'a :: ordered_idom"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	675	shows "(c*a \<le> c) = ((0<c --> a\<le>1) & (c<0 --> 1 \<le> a))"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	676	by (insert mult_le_cancel_left [of c a 1], simp)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	677
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	678	lemma mult_less_cancel_right1:
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	679	fixes c :: "'a :: ordered_idom"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	680	shows "(c < b*c) = ((0 \<le> c --> 1<b) & (c \<le> 0 --> b < 1))"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	681	by (insert mult_less_cancel_right [of 1 c b], simp)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	682
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	683	lemma mult_less_cancel_right2:
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	684	fixes c :: "'a :: ordered_idom"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	685	shows "(a*c < c) = ((0 \<le> c --> a<1) & (c \<le> 0 --> 1 < a))"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	686	by (insert mult_less_cancel_right [of a c 1], simp)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	687
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	688	lemma mult_less_cancel_left1:
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	689	fixes c :: "'a :: ordered_idom"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	690	shows "(c < c*b) = ((0 \<le> c --> 1<b) & (c \<le> 0 --> b < 1))"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	691	by (insert mult_less_cancel_left [of c 1 b], simp)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	692
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	693	lemma mult_less_cancel_left2:
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	694	fixes c :: "'a :: ordered_idom"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	695	shows "(c*a < c) = ((0 \<le> c --> a<1) & (c \<le> 0 --> 1 < a))"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	696	by (insert mult_less_cancel_left [of c a 1], simp)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	697
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	698	lemma mult_cancel_right1 [simp]:
22990 775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	699	fixes c :: "'a :: dom"
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	700	shows "(c = b*c) = (c = 0 \| b=1)"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	701	by (insert mult_cancel_right [of 1 c b], force)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	702
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	703	lemma mult_cancel_right2 [simp]:
22990 775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	704	fixes c :: "'a :: dom"
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	705	shows "(a*c = c) = (c = 0 \| a=1)"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	706	by (insert mult_cancel_right [of a c 1], simp)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	707
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	708	lemma mult_cancel_left1 [simp]:
22990 775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	709	fixes c :: "'a :: dom"
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	710	shows "(c = c*b) = (c = 0 \| b=1)"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	711	by (insert mult_cancel_left [of c 1 b], force)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	712
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	713	lemma mult_cancel_left2 [simp]:
22990 775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	714	fixes c :: "'a :: dom"
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	715	shows "(c*a = c) = (c = 0 \| a=1)"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	716	by (insert mult_cancel_left [of c a 1], simp)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	717
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	718
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	719	text{Simprules for comparisons where common factors can be cancelled.}
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	720	lemmas mult_compare_simps =
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	721	mult_le_cancel_right mult_le_cancel_left
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	722	mult_le_cancel_right1 mult_le_cancel_right2
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	723	mult_le_cancel_left1 mult_le_cancel_left2
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	724	mult_less_cancel_right mult_less_cancel_left
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	725	mult_less_cancel_right1 mult_less_cancel_right2
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	726	mult_less_cancel_left1 mult_less_cancel_left2
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	727	mult_cancel_right mult_cancel_left
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	728	mult_cancel_right1 mult_cancel_right2
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	729	mult_cancel_left1 mult_cancel_left2
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	730
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	731
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	732	text{This list of rewrites decides ring equalities by ordered rewriting.}
15178 5f621aa35c25 Matrix theory, linear programming obua parents: 15140 diff changeset	733	lemmas ring_eq_simps =
5f621aa35c25 Matrix theory, linear programming obua parents: 15140 diff changeset	734	(* mult_ac*)
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	735	left_distrib right_distrib left_diff_distrib right_diff_distrib
15178 5f621aa35c25 Matrix theory, linear programming obua parents: 15140 diff changeset	736	group_eq_simps
5f621aa35c25 Matrix theory, linear programming obua parents: 15140 diff changeset	737	(* add_ac
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	738	add_diff_eq diff_add_eq diff_diff_eq diff_diff_eq2
15178 5f621aa35c25 Matrix theory, linear programming obua parents: 15140 diff changeset	739	diff_eq_eq eq_diff_eq *)
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	740
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	741	subsection {* Fields *}
95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	742
14288 d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	743	lemma right_inverse_eq: "b \<noteq> 0 ==> (a / b = 1) = (a = (b::'a::field))"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	744	proof
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	745	assume neq: "b \<noteq> 0"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	746	{
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	747	hence "a = (a / b) * b" by (simp add: divide_inverse mult_ac)
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	748	also assume "a / b = 1"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	749	finally show "a = b" by simp
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	750	next
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	751	assume "a = b"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	752	with neq show "a / b = 1" by (simp add: divide_inverse)
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	753	}
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	754	qed
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	755
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	756	lemma nonzero_inverse_eq_divide: "a \<noteq> 0 ==> inverse (a::'a::field) = 1/a"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	757	by (simp add: divide_inverse)
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	758
15228 4d332d10fa3d revised simprules for division paulson parents: 15197 diff changeset	759	lemma divide_self: "a \<noteq> 0 ==> a / (a::'a::field) = 1"
14288 d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	760	by (simp add: divide_inverse)
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	761
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14421 diff changeset	762	lemma divide_zero [simp]: "a / 0 = (0::'a::{field,division_by_zero})"
5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14421 diff changeset	763	by (simp add: divide_inverse)
14277 ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	764
15228 4d332d10fa3d revised simprules for division paulson parents: 15197 diff changeset	765	lemma divide_self_if [simp]:
4d332d10fa3d revised simprules for division paulson parents: 15197 diff changeset	766	"a / (a::'a::{field,division_by_zero}) = (if a=0 then 0 else 1)"
4d332d10fa3d revised simprules for division paulson parents: 15197 diff changeset	767	by (simp add: divide_self)
4d332d10fa3d revised simprules for division paulson parents: 15197 diff changeset	768
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14421 diff changeset	769	lemma divide_zero_left [simp]: "0/a = (0::'a::field)"
5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14421 diff changeset	770	by (simp add: divide_inverse)
14277 ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	771
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14421 diff changeset	772	lemma inverse_eq_divide: "inverse (a::'a::field) = 1/a"
5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14421 diff changeset	773	by (simp add: divide_inverse)
14277 ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	774
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14421 diff changeset	775	lemma add_divide_distrib: "(a+b)/(c::'a::field) = a/c + b/c"
14293 22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	776	by (simp add: divide_inverse left_distrib)
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	777
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	778
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	779	text{*Compared with @{text mult_eq_0_iff}, this version removes the requirement
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	780	of an ordering.*}
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	781	lemma field_mult_eq_0_iff [simp]:
23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	782	"(a*b = (0::'a::division_ring)) = (a = 0 \| b = 0)"
22990 775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	783	by simp
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	784
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	785	text{Cancellation of equalities with a common factor}
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	786	lemma field_mult_cancel_right_lemma:
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	787	assumes cnz: "c \<noteq> (0::'a::division_ring)"
23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	788	and eq: "ac = bc"
23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	789	shows "a=b"
14377 f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	790	proof -
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	791	have "(a * c) * inverse c = (b * c) * inverse c"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	792	by (simp add: eq)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	793	thus "a=b"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	794	by (simp add: mult_assoc cnz)
14377 f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	795	qed
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	796
14348 744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for paulson parents: 14341 diff changeset	797	lemma field_mult_cancel_right [simp]:
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	798	"(ac = bc) = (c = (0::'a::division_ring) \| a=b)"
22990 775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	799	by simp
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	800
14348 744c868ee0b7 Defining the type class "ringpower" and deleting superseded theorems for paulson parents: 14341 diff changeset	801	lemma field_mult_cancel_left [simp]:
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	802	"(ca = cb) = (c = (0::'a::division_ring) \| a=b)"
22990 775e9de3db48 added classes ring_no_zero_divisors and dom (non-commutative version of idom); huffman parents: 22987 diff changeset	803	by simp
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	804
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	805	lemma nonzero_imp_inverse_nonzero:
23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	806	"a \<noteq> 0 ==> inverse a \<noteq> (0::'a::division_ring)"
14377 f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	807	proof
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	808	assume ianz: "inverse a = 0"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	809	assume "a \<noteq> 0"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	810	hence "1 = a * inverse a" by simp
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	811	also have "... = 0" by (simp add: ianz)
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	812	finally have "1 = (0::'a::division_ring)" .
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	813	thus False by (simp add: eq_commute)
14377 f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	814	qed
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	815
14277 ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	816
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	817	subsection{Basic Properties of @{term inverse}}
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	818
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	819	lemma inverse_zero_imp_zero: "inverse a = 0 ==> a = (0::'a::division_ring)"
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	820	apply (rule ccontr)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	821	apply (blast dest: nonzero_imp_inverse_nonzero)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	822	done
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	823
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	824	lemma inverse_nonzero_imp_nonzero:
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	825	"inverse a = 0 ==> a = (0::'a::division_ring)"
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	826	apply (rule ccontr)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	827	apply (blast dest: nonzero_imp_inverse_nonzero)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	828	done
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	829
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	830	lemma inverse_nonzero_iff_nonzero [simp]:
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	831	"(inverse a = 0) = (a = (0::'a::{division_ring,division_by_zero}))"
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	832	by (force dest: inverse_nonzero_imp_nonzero)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	833
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	834	lemma nonzero_inverse_minus_eq:
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	835	assumes [simp]: "a\<noteq>0"
23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	836	shows "inverse(-a) = -inverse(a::'a::division_ring)"
14377 f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	837	proof -
f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	838	have "-a * inverse (- a) = -a * - inverse a"
f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	839	by simp
f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	840	thus ?thesis
f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	841	by (simp only: field_mult_cancel_left, simp)
f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	842	qed
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	843
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	844	lemma inverse_minus_eq [simp]:
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	845	"inverse(-a) = -inverse(a::'a::{division_ring,division_by_zero})"
14377 f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	846	proof cases
f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	847	assume "a=0" thus ?thesis by (simp add: inverse_zero)
f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	848	next
f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	849	assume "a\<noteq>0"
f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	850	thus ?thesis by (simp add: nonzero_inverse_minus_eq)
f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	851	qed
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	852
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	853	lemma nonzero_inverse_eq_imp_eq:
14269 502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 14268 diff changeset	854	assumes inveq: "inverse a = inverse b"
502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 14268 diff changeset	855	and anz: "a \<noteq> 0"
502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 14268 diff changeset	856	and bnz: "b \<noteq> 0"
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	857	shows "a = (b::'a::division_ring)"
14377 f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	858	proof -
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	859	have "a * inverse b = a * inverse a"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	860	by (simp add: inveq)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	861	hence "(a * inverse b) * b = (a * inverse a) * b"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	862	by simp
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	863	thus "a = b"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	864	by (simp add: mult_assoc anz bnz)
14377 f454b3004f8f tidying up, especially the Complex numbers paulson parents: 14370 diff changeset	865	qed
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	866
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	867	lemma inverse_eq_imp_eq:
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	868	"inverse a = inverse b ==> a = (b::'a::{division_ring,division_by_zero})"
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	869	apply (cases "a=0 \| b=0")
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	870	apply (force dest!: inverse_zero_imp_zero
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	871	simp add: eq_commute [of "0::'a"])
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	872	apply (force dest!: nonzero_inverse_eq_imp_eq)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	873	done
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	874
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	875	lemma inverse_eq_iff_eq [simp]:
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	876	"(inverse a = inverse b) = (a = (b::'a::{division_ring,division_by_zero}))"
23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	877	by (force dest!: inverse_eq_imp_eq)
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	878
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	879	lemma nonzero_inverse_inverse_eq:
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	880	assumes [simp]: "a \<noteq> 0"
23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	881	shows "inverse(inverse (a::'a::division_ring)) = a"
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	882	proof -
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	883	have "(inverse (inverse a) * inverse a) * a = a"
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	884	by (simp add: nonzero_imp_inverse_nonzero)
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	885	thus ?thesis
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	886	by (simp add: mult_assoc)
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	887	qed
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	888
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	889	lemma inverse_inverse_eq [simp]:
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	890	"inverse(inverse (a::'a::{division_ring,division_by_zero})) = a"
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	891	proof cases
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	892	assume "a=0" thus ?thesis by simp
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	893	next
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	894	assume "a\<noteq>0"
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	895	thus ?thesis by (simp add: nonzero_inverse_inverse_eq)
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	896	qed
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	897
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	898	lemma inverse_1 [simp]: "inverse 1 = (1::'a::division_ring)"
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	899	proof -
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	900	have "inverse 1 * 1 = (1::'a::division_ring)"
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	901	by (rule left_inverse [OF zero_neq_one [symmetric]])
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	902	thus ?thesis by simp
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	903	qed
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	904
15077 89840837108e converting Hyperreal/Transcendental to Isar script paulson parents: 15010 diff changeset	905	lemma inverse_unique:
89840837108e converting Hyperreal/Transcendental to Isar script paulson parents: 15010 diff changeset	906	assumes ab: "a*b = 1"
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	907	shows "inverse a = (b::'a::division_ring)"
15077 89840837108e converting Hyperreal/Transcendental to Isar script paulson parents: 15010 diff changeset	908	proof -
89840837108e converting Hyperreal/Transcendental to Isar script paulson parents: 15010 diff changeset	909	have "a \<noteq> 0" using ab by auto
89840837108e converting Hyperreal/Transcendental to Isar script paulson parents: 15010 diff changeset	910	moreover have "inverse a * (a * b) = inverse a" by (simp add: ab)
89840837108e converting Hyperreal/Transcendental to Isar script paulson parents: 15010 diff changeset	911	ultimately show ?thesis by (simp add: mult_assoc [symmetric])
89840837108e converting Hyperreal/Transcendental to Isar script paulson parents: 15010 diff changeset	912	qed
89840837108e converting Hyperreal/Transcendental to Isar script paulson parents: 15010 diff changeset	913
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	914	lemma nonzero_inverse_mult_distrib:
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	915	assumes anz: "a \<noteq> 0"
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	916	and bnz: "b \<noteq> 0"
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	917	shows "inverse(ab) = inverse(b) inverse(a::'a::division_ring)"
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	918	proof -
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	919	have "inverse(ab) (a * b) * inverse(b) = inverse(b)"
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	920	by (simp add: field_mult_eq_0_iff anz bnz)
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	921	hence "inverse(ab) a = inverse(b)"
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	922	by (simp add: mult_assoc bnz)
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	923	hence "inverse(ab) a * inverse(a) = inverse(b) * inverse(a)"
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	924	by simp
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	925	thus ?thesis
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	926	by (simp add: mult_assoc anz)
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	927	qed
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	928
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	929	text{*This version builds in division by zero while also re-orienting
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	930	the right-hand side.*}
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	931	lemma inverse_mult_distrib [simp]:
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	932	"inverse(ab) = inverse(a) inverse(b::'a::{field,division_by_zero})"
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	933	proof cases
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	934	assume "a \<noteq> 0 & b \<noteq> 0"
22993 838c66e760b5 tuned haftmann parents: 22990 diff changeset	935	thus ?thesis
838c66e760b5 tuned haftmann parents: 22990 diff changeset	936	by (simp add: nonzero_inverse_mult_distrib mult_commute)
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	937	next
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	938	assume "~ (a \<noteq> 0 & b \<noteq> 0)"
22993 838c66e760b5 tuned haftmann parents: 22990 diff changeset	939	thus ?thesis
838c66e760b5 tuned haftmann parents: 22990 diff changeset	940	by force
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	941	qed
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	942
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	943	lemma division_ring_inverse_add:
23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	944	"[\|(a::'a::division_ring) \<noteq> 0; b \<noteq> 0\|]
23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	945	==> inverse a + inverse b = inverse a * (a+b) * inverse b"
22993 838c66e760b5 tuned haftmann parents: 22990 diff changeset	946	by (simp add: right_distrib left_distrib mult_assoc)
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	947
23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	948	lemma division_ring_inverse_diff:
23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	949	"[\|(a::'a::division_ring) \<noteq> 0; b \<noteq> 0\|]
23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	950	==> inverse a - inverse b = inverse a * (b-a) * inverse b"
23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	951	by (simp add: right_diff_distrib left_diff_distrib mult_assoc)
23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	952
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	953	text{There is no slick version using division by zero.}
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	954	lemma inverse_add:
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	955	"[\|a \<noteq> 0; b \<noteq> 0\|]
342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	956	==> inverse a + inverse b = (a+b) * inverse a * inverse (b::'a::field)"
20496 23eb6034c06d added axclass division_ring (like field without commutativity; includes e.g. quaternions) and generalized some theorems from field to division_ring huffman parents: 19404 diff changeset	957	by (simp add: division_ring_inverse_add mult_ac)
14270 342451d763f9 More re-organising of numerical theorems paulson parents: 14269 diff changeset	958
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	959	lemma inverse_divide [simp]:
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	960	"inverse (a/b) = b / (a::'a::{field,division_by_zero})"
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14421 diff changeset	961	by (simp add: divide_inverse mult_commute)
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	962
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	963	subsection {* Calculations with fractions *}
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	964
14277 ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	965	lemma nonzero_mult_divide_cancel_left:
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	966	assumes [simp]: "b\<noteq>0" and [simp]: "c\<noteq>0"
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	967	shows "(ca)/(cb) = a/(b::'a::field)"
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	968	proof -
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	969	have "(ca)/(cb) = c * a * (inverse b * inverse c)"
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	970	by (simp add: field_mult_eq_0_iff divide_inverse
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	971	nonzero_inverse_mult_distrib)
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	972	also have "... = a * inverse b * (inverse c * c)"
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	973	by (simp only: mult_ac)
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	974	also have "... = a * inverse b"
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	975	by simp
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	976	finally show ?thesis
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	977	by (simp add: divide_inverse)
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	978	qed
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	979
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	980	lemma mult_divide_cancel_left:
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	981	"c\<noteq>0 ==> (ca) / (cb) = a / (b::'a::{field,division_by_zero})"
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	982	apply (cases "b = 0")
14277 ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	983	apply (simp_all add: nonzero_mult_divide_cancel_left)
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	984	done
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	985
14321 55c688d2eefa new theorems paulson parents: 14305 diff changeset	986	lemma nonzero_mult_divide_cancel_right:
55c688d2eefa new theorems paulson parents: 14305 diff changeset	987	"[\|b\<noteq>0; c\<noteq>0\|] ==> (ac) / (bc) = a/(b::'a::field)"
55c688d2eefa new theorems paulson parents: 14305 diff changeset	988	by (simp add: mult_commute [of _ c] nonzero_mult_divide_cancel_left)
55c688d2eefa new theorems paulson parents: 14305 diff changeset	989
55c688d2eefa new theorems paulson parents: 14305 diff changeset	990	lemma mult_divide_cancel_right:
55c688d2eefa new theorems paulson parents: 14305 diff changeset	991	"c\<noteq>0 ==> (ac) / (bc) = a / (b::'a::{field,division_by_zero})"
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	992	apply (cases "b = 0")
14321 55c688d2eefa new theorems paulson parents: 14305 diff changeset	993	apply (simp_all add: nonzero_mult_divide_cancel_right)
55c688d2eefa new theorems paulson parents: 14305 diff changeset	994	done
55c688d2eefa new theorems paulson parents: 14305 diff changeset	995
14277 ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	996	(For ExtractCommonTerm)
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	997	lemma mult_divide_cancel_eq_if:
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	998	"(ca) / (cb) =
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	999	(if c=0 then 0 else a / (b::'a::{field,division_by_zero}))"
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1000	by (simp add: mult_divide_cancel_left)
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1001
14284 f1abe67c448a re-organisation of Real/RealArith0.ML; more `Isar scripts paulson parents: 14277 diff changeset	1002	lemma divide_1 [simp]: "a/1 = (a::'a::field)"
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14421 diff changeset	1003	by (simp add: divide_inverse)
14284 f1abe67c448a re-organisation of Real/RealArith0.ML; more `Isar scripts paulson parents: 14277 diff changeset	1004
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1005	lemma times_divide_eq_right: "a * (b/c) = (a*b) / (c::'a::field)"
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14421 diff changeset	1006	by (simp add: divide_inverse mult_assoc)
14288 d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1007
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14421 diff changeset	1008	lemma times_divide_eq_left: "(b/c) * a = (b*a) / (c::'a::field)"
5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14421 diff changeset	1009	by (simp add: divide_inverse mult_ac)
14288 d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1010
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1011	lemma divide_divide_eq_right [simp]:
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1012	"a / (b/c) = (a*c) / (b::'a::{field,division_by_zero})"
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14421 diff changeset	1013	by (simp add: divide_inverse mult_ac)
14288 d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1014
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1015	lemma divide_divide_eq_left [simp]:
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1016	"(a / b) / (c::'a::{field,division_by_zero}) = a / (b*c)"
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14421 diff changeset	1017	by (simp add: divide_inverse mult_assoc)
14288 d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1018
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1019	lemma add_frac_eq: "(y::'a::field) ~= 0 ==> z ~= 0 ==>
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1020	x / y + w / z = (x * z + w * y) / (y * z)"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1021	apply (subgoal_tac "x / y = (x * z) / (y * z)")
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1022	apply (erule ssubst)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1023	apply (subgoal_tac "w / z = (w * y) / (y * z)")
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1024	apply (erule ssubst)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1025	apply (rule add_divide_distrib [THEN sym])
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1026	apply (subst mult_commute)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1027	apply (erule nonzero_mult_divide_cancel_left [THEN sym])
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1028	apply assumption
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1029	apply (erule nonzero_mult_divide_cancel_right [THEN sym])
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1030	apply assumption
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1031	done
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1032
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1033	subsubsection{Special Cancellation Simprules for Division}
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1034
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1035	lemma mult_divide_cancel_left_if [simp]:
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1036	fixes c :: "'a :: {field,division_by_zero}"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1037	shows "(ca) / (cb) = (if c=0 then 0 else a/b)"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1038	by (simp add: mult_divide_cancel_left)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1039
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1040	lemma mult_divide_cancel_right_if [simp]:
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1041	fixes c :: "'a :: {field,division_by_zero}"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1042	shows "(ac) / (bc) = (if c=0 then 0 else a/b)"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1043	by (simp add: mult_divide_cancel_right)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1044
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1045	lemma mult_divide_cancel_left_if1 [simp]:
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1046	fixes c :: "'a :: {field,division_by_zero}"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1047	shows "c / (c*b) = (if c=0 then 0 else 1/b)"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1048	apply (insert mult_divide_cancel_left_if [of c 1 b])
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1049	apply (simp del: mult_divide_cancel_left_if)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1050	done
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1051
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1052	lemma mult_divide_cancel_left_if2 [simp]:
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1053	fixes c :: "'a :: {field,division_by_zero}"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1054	shows "(c*a) / c = (if c=0 then 0 else a)"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1055	apply (insert mult_divide_cancel_left_if [of c a 1])
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1056	apply (simp del: mult_divide_cancel_left_if)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1057	done
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1058
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1059	lemma mult_divide_cancel_right_if1 [simp]:
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1060	fixes c :: "'a :: {field,division_by_zero}"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1061	shows "c / (b*c) = (if c=0 then 0 else 1/b)"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1062	apply (insert mult_divide_cancel_right_if [of 1 c b])
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1063	apply (simp del: mult_divide_cancel_right_if)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1064	done
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1065
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1066	lemma mult_divide_cancel_right_if2 [simp]:
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1067	fixes c :: "'a :: {field,division_by_zero}"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1068	shows "(a*c) / c = (if c=0 then 0 else a)"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1069	apply (insert mult_divide_cancel_right_if [of a c 1])
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1070	apply (simp del: mult_divide_cancel_right_if)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1071	done
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1072
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1073	text{Two lemmas for cancelling the denominator}
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1074
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1075	lemma times_divide_self_right [simp]:
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1076	fixes a :: "'a :: {field,division_by_zero}"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1077	shows "a * (b/a) = (if a=0 then 0 else b)"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1078	by (simp add: times_divide_eq_right)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1079
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1080	lemma times_divide_self_left [simp]:
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1081	fixes a :: "'a :: {field,division_by_zero}"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1082	shows "(b/a) * a = (if a=0 then 0 else b)"
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1083	by (simp add: times_divide_eq_left)
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1084
ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1085
14293 22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1086	subsection {* Division and Unary Minus *}
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1087
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1088	lemma nonzero_minus_divide_left: "b \<noteq> 0 ==> - (a/b) = (-a) / (b::'a::field)"
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1089	by (simp add: divide_inverse minus_mult_left)
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1090
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1091	lemma nonzero_minus_divide_right: "b \<noteq> 0 ==> - (a/b) = a / -(b::'a::field)"
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1092	by (simp add: divide_inverse nonzero_inverse_minus_eq minus_mult_right)
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1093
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1094	lemma nonzero_minus_divide_divide: "b \<noteq> 0 ==> (-a)/(-b) = a / (b::'a::field)"
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1095	by (simp add: divide_inverse nonzero_inverse_minus_eq)
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1096
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14421 diff changeset	1097	lemma minus_divide_left: "- (a/b) = (-a) / (b::'a::field)"
5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14421 diff changeset	1098	by (simp add: divide_inverse minus_mult_left [symmetric])
14293 22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1099
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1100	lemma minus_divide_right: "- (a/b) = a / -(b::'a::{field,division_by_zero})"
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14421 diff changeset	1101	by (simp add: divide_inverse minus_mult_right [symmetric])
5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14421 diff changeset	1102
14293 22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1103
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1104	text{The effect is to extract signs from divisions}
17085 5b57f995a179 more simprules now have names paulson parents: 16775 diff changeset	1105	lemmas divide_minus_left = minus_divide_left [symmetric]
5b57f995a179 more simprules now have names paulson parents: 16775 diff changeset	1106	lemmas divide_minus_right = minus_divide_right [symmetric]
5b57f995a179 more simprules now have names paulson parents: 16775 diff changeset	1107	declare divide_minus_left [simp] divide_minus_right [simp]
14293 22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1108
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14377 diff changeset	1109	text{Also, extract signs from products}
17085 5b57f995a179 more simprules now have names paulson parents: 16775 diff changeset	1110	lemmas mult_minus_left = minus_mult_left [symmetric]
5b57f995a179 more simprules now have names paulson parents: 16775 diff changeset	1111	lemmas mult_minus_right = minus_mult_right [symmetric]
5b57f995a179 more simprules now have names paulson parents: 16775 diff changeset	1112	declare mult_minus_left [simp] mult_minus_right [simp]
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14377 diff changeset	1113
14293 22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1114	lemma minus_divide_divide [simp]:
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1115	"(-a)/(-b) = a / (b::'a::{field,division_by_zero})"
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	1116	apply (cases "b=0", simp)
14293 22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1117	apply (simp add: nonzero_minus_divide_divide)
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1118	done
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1119
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14421 diff changeset	1120	lemma diff_divide_distrib: "(a-b)/(c::'a::field) = a/c - b/c"
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14377 diff changeset	1121	by (simp add: diff_minus add_divide_distrib)
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14377 diff changeset	1122
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1123	lemma diff_frac_eq: "(y::'a::field) ~= 0 ==> z ~= 0 ==>
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1124	x / y - w / z = (x * z - w * y) / (y * z)"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1125	apply (subst diff_def)+
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1126	apply (subst minus_divide_left)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1127	apply (subst add_frac_eq)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1128	apply simp_all
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1129	done
14293 22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1130
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1131	subsection {* Ordered Fields *}
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1132
14277 ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1133	lemma positive_imp_inverse_positive:
14269 502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 14268 diff changeset	1134	assumes a_gt_0: "0 < a" shows "0 < inverse (a::'a::ordered_field)"
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1135	proof -
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1136	have "0 < a * inverse a"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1137	by (simp add: a_gt_0 [THEN order_less_imp_not_eq2] zero_less_one)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1138	thus "0 < inverse a"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1139	by (simp add: a_gt_0 [THEN order_less_not_sym] zero_less_mult_iff)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1140	qed
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1141
14277 ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1142	lemma negative_imp_inverse_negative:
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1143	"a < 0 ==> inverse a < (0::'a::ordered_field)"
14277 ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1144	by (insert positive_imp_inverse_positive [of "-a"],
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1145	simp add: nonzero_inverse_minus_eq order_less_imp_not_eq)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1146
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1147	lemma inverse_le_imp_le:
14269 502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 14268 diff changeset	1148	assumes invle: "inverse a \<le> inverse b"
502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 14268 diff changeset	1149	and apos: "0 < a"
502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 14268 diff changeset	1150	shows "b \<le> (a::'a::ordered_field)"
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1151	proof (rule classical)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1152	assume "~ b \<le> a"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1153	hence "a < b"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1154	by (simp add: linorder_not_le)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1155	hence bpos: "0 < b"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1156	by (blast intro: apos order_less_trans)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1157	hence "a * inverse a \<le> a * inverse b"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1158	by (simp add: apos invle order_less_imp_le mult_left_mono)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1159	hence "(a * inverse a) * b \<le> (a * inverse b) * b"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1160	by (simp add: bpos order_less_imp_le mult_right_mono)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1161	thus "b \<le> a"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1162	by (simp add: mult_assoc apos bpos order_less_imp_not_eq2)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1163	qed
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1164
14277 ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1165	lemma inverse_positive_imp_positive:
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1166	assumes inv_gt_0: "0 < inverse a"
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1167	and [simp]: "a \<noteq> 0"
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1168	shows "0 < (a::'a::ordered_field)"
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1169	proof -
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1170	have "0 < inverse (inverse a)"
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1171	by (rule positive_imp_inverse_positive)
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1172	thus "0 < a"
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1173	by (simp add: nonzero_inverse_inverse_eq)
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1174	qed
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1175
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1176	lemma inverse_positive_iff_positive [simp]:
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1177	"(0 < inverse a) = (0 < (a::'a::{ordered_field,division_by_zero}))"
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	1178	apply (cases "a = 0", simp)
14277 ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1179	apply (blast intro: inverse_positive_imp_positive positive_imp_inverse_positive)
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1180	done
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1181
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1182	lemma inverse_negative_imp_negative:
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1183	assumes inv_less_0: "inverse a < 0"
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1184	and [simp]: "a \<noteq> 0"
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1185	shows "a < (0::'a::ordered_field)"
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1186	proof -
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1187	have "inverse (inverse a) < 0"
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1188	by (rule negative_imp_inverse_negative)
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1189	thus "a < 0"
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1190	by (simp add: nonzero_inverse_inverse_eq)
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1191	qed
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1192
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1193	lemma inverse_negative_iff_negative [simp]:
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1194	"(inverse a < 0) = (a < (0::'a::{ordered_field,division_by_zero}))"
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	1195	apply (cases "a = 0", simp)
14277 ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1196	apply (blast intro: inverse_negative_imp_negative negative_imp_inverse_negative)
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1197	done
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1198
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1199	lemma inverse_nonnegative_iff_nonnegative [simp]:
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1200	"(0 \<le> inverse a) = (0 \<le> (a::'a::{ordered_field,division_by_zero}))"
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1201	by (simp add: linorder_not_less [symmetric])
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1202
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1203	lemma inverse_nonpositive_iff_nonpositive [simp]:
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1204	"(inverse a \<le> 0) = (a \<le> (0::'a::{ordered_field,division_by_zero}))"
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1205	by (simp add: linorder_not_less [symmetric])
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1206
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1207
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1208	subsection{Anti-Monotonicity of @{term inverse}}
ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1209
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1210	lemma less_imp_inverse_less:
14269 502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 14268 diff changeset	1211	assumes less: "a < b"
502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 14268 diff changeset	1212	and apos: "0 < a"
502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 14268 diff changeset	1213	shows "inverse b < inverse (a::'a::ordered_field)"
14268 5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1214	proof (rule ccontr)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1215	assume "~ inverse b < inverse a"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1216	hence "inverse a \<le> inverse b"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1217	by (simp add: linorder_not_less)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1218	hence "~ (a < b)"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1219	by (simp add: linorder_not_less inverse_le_imp_le [OF _ apos])
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1220	thus False
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1221	by (rule notE [OF _ less])
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1222	qed
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1223
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1224	lemma inverse_less_imp_less:
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1225	"[\|inverse a < inverse b; 0 < a\|] ==> b < (a::'a::ordered_field)"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1226	apply (simp add: order_less_le [of "inverse a"] order_less_le [of "b"])
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1227	apply (force dest!: inverse_le_imp_le nonzero_inverse_eq_imp_eq)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1228	done
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1229
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1230	text{Both premises are essential. Consider -1 and 1.}
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1231	lemma inverse_less_iff_less [simp]:
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1232	"[\|0 < a; 0 < b\|]
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1233	==> (inverse a < inverse b) = (b < (a::'a::ordered_field))"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1234	by (blast intro: less_imp_inverse_less dest: inverse_less_imp_less)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1235
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1236	lemma le_imp_inverse_le:
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1237	"[\|a \<le> b; 0 < a\|] ==> inverse b \<le> inverse (a::'a::ordered_field)"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1238	by (force simp add: order_le_less less_imp_inverse_less)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1239
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1240	lemma inverse_le_iff_le [simp]:
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1241	"[\|0 < a; 0 < b\|]
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1242	==> (inverse a \<le> inverse b) = (b \<le> (a::'a::ordered_field))"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1243	by (blast intro: le_imp_inverse_le dest: inverse_le_imp_le)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1244
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1245
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1246	text{*These results refer to both operands being negative. The opposite-sign
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1247	case is trivial, since inverse preserves signs.*}
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1248	lemma inverse_le_imp_le_neg:
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1249	"[\|inverse a \<le> inverse b; b < 0\|] ==> b \<le> (a::'a::ordered_field)"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1250	apply (rule classical)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1251	apply (subgoal_tac "a < 0")
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1252	prefer 2 apply (force simp add: linorder_not_le intro: order_less_trans)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1253	apply (insert inverse_le_imp_le [of "-b" "-a"])
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1254	apply (simp add: order_less_imp_not_eq nonzero_inverse_minus_eq)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1255	done
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1256
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1257	lemma less_imp_inverse_less_neg:
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1258	"[\|a < b; b < 0\|] ==> inverse b < inverse (a::'a::ordered_field)"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1259	apply (subgoal_tac "a < 0")
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1260	prefer 2 apply (blast intro: order_less_trans)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1261	apply (insert less_imp_inverse_less [of "-b" "-a"])
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1262	apply (simp add: order_less_imp_not_eq nonzero_inverse_minus_eq)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1263	done
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1264
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1265	lemma inverse_less_imp_less_neg:
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1266	"[\|inverse a < inverse b; b < 0\|] ==> b < (a::'a::ordered_field)"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1267	apply (rule classical)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1268	apply (subgoal_tac "a < 0")
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1269	prefer 2
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1270	apply (force simp add: linorder_not_less intro: order_le_less_trans)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1271	apply (insert inverse_less_imp_less [of "-b" "-a"])
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1272	apply (simp add: order_less_imp_not_eq nonzero_inverse_minus_eq)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1273	done
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1274
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1275	lemma inverse_less_iff_less_neg [simp]:
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1276	"[\|a < 0; b < 0\|]
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1277	==> (inverse a < inverse b) = (b < (a::'a::ordered_field))"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1278	apply (insert inverse_less_iff_less [of "-b" "-a"])
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1279	apply (simp del: inverse_less_iff_less
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1280	add: order_less_imp_not_eq nonzero_inverse_minus_eq)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1281	done
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1282
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1283	lemma le_imp_inverse_le_neg:
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1284	"[\|a \<le> b; b < 0\|] ==> inverse b \<le> inverse (a::'a::ordered_field)"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1285	by (force simp add: order_le_less less_imp_inverse_less_neg)
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1286
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1287	lemma inverse_le_iff_le_neg [simp]:
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1288	"[\|a < 0; b < 0\|]
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1289	==> (inverse a \<le> inverse b) = (b \<le> (a::'a::ordered_field))"
5cf13e80be0e Removal of Hyperreal/ExtraThms2.ML, sending the material to the correct files. paulson parents: 14267 diff changeset	1290	by (blast intro: le_imp_inverse_le_neg dest: inverse_le_imp_le_neg)
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	1291
14277 ad66687ece6e more field division lemmas transferred from Real to Ring_and_Field paulson parents: 14272 diff changeset	1292
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1293	subsection{Inverses and the Number One}
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1294
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1295	lemma one_less_inverse_iff:
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1296	"(1 < inverse x) = (0 < x & x < (1::'a::{ordered_field,division_by_zero}))"proof cases
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1297	assume "0 < x"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1298	with inverse_less_iff_less [OF zero_less_one, of x]
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1299	show ?thesis by simp
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1300	next
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1301	assume notless: "~ (0 < x)"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1302	have "~ (1 < inverse x)"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1303	proof
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1304	assume "1 < inverse x"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1305	also with notless have "... \<le> 0" by (simp add: linorder_not_less)
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1306	also have "... < 1" by (rule zero_less_one)
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1307	finally show False by auto
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1308	qed
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1309	with notless show ?thesis by simp
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1310	qed
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1311
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1312	lemma inverse_eq_1_iff [simp]:
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1313	"(inverse x = 1) = (x = (1::'a::{field,division_by_zero}))"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1314	by (insert inverse_eq_iff_eq [of x 1], simp)
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1315
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1316	lemma one_le_inverse_iff:
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1317	"(1 \<le> inverse x) = (0 < x & x \<le> (1::'a::{ordered_field,division_by_zero}))"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1318	by (force simp add: order_le_less one_less_inverse_iff zero_less_one
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1319	eq_commute [of 1])
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1320
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1321	lemma inverse_less_1_iff:
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1322	"(inverse x < 1) = (x \<le> 0 \| 1 < (x::'a::{ordered_field,division_by_zero}))"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1323	by (simp add: linorder_not_le [symmetric] one_le_inverse_iff)
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1324
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1325	lemma inverse_le_1_iff:
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1326	"(inverse x \<le> 1) = (x \<le> 0 \| 1 \<le> (x::'a::{ordered_field,division_by_zero}))"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1327	by (simp add: linorder_not_less [symmetric] one_less_inverse_iff)
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1328
14288 d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1329	subsection{Simplification of Inequalities Involving Literal Divisors}
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1330
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1331	lemma pos_le_divide_eq: "0 < (c::'a::ordered_field) ==> (a \<le> b/c) = (a*c \<le> b)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1332	proof -
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1333	assume less: "0<c"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1334	hence "(a \<le> b/c) = (ac \<le> (b/c)c)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1335	by (simp add: mult_le_cancel_right order_less_not_sym [OF less])
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1336	also have "... = (a*c \<le> b)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1337	by (simp add: order_less_imp_not_eq2 [OF less] divide_inverse mult_assoc)
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1338	finally show ?thesis .
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1339	qed
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1340
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1341	lemma neg_le_divide_eq: "c < (0::'a::ordered_field) ==> (a \<le> b/c) = (b \<le> a*c)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1342	proof -
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1343	assume less: "c<0"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1344	hence "(a \<le> b/c) = ((b/c)c \<le> ac)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1345	by (simp add: mult_le_cancel_right order_less_not_sym [OF less])
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1346	also have "... = (b \<le> a*c)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1347	by (simp add: order_less_imp_not_eq [OF less] divide_inverse mult_assoc)
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1348	finally show ?thesis .
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1349	qed
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1350
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1351	lemma le_divide_eq:
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1352	"(a \<le> b/c) =
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1353	(if 0 < c then a*c \<le> b
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1354	else if c < 0 then b \<le> a*c
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1355	else a \<le> (0::'a::{ordered_field,division_by_zero}))"
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	1356	apply (cases "c=0", simp)
14288 d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1357	apply (force simp add: pos_le_divide_eq neg_le_divide_eq linorder_neq_iff)
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1358	done
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1359
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1360	lemma pos_divide_le_eq: "0 < (c::'a::ordered_field) ==> (b/c \<le> a) = (b \<le> a*c)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1361	proof -
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1362	assume less: "0<c"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1363	hence "(b/c \<le> a) = ((b/c)c \<le> ac)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1364	by (simp add: mult_le_cancel_right order_less_not_sym [OF less])
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1365	also have "... = (b \<le> a*c)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1366	by (simp add: order_less_imp_not_eq2 [OF less] divide_inverse mult_assoc)
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1367	finally show ?thesis .
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1368	qed
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1369
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1370	lemma neg_divide_le_eq: "c < (0::'a::ordered_field) ==> (b/c \<le> a) = (a*c \<le> b)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1371	proof -
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1372	assume less: "c<0"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1373	hence "(b/c \<le> a) = (ac \<le> (b/c)c)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1374	by (simp add: mult_le_cancel_right order_less_not_sym [OF less])
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1375	also have "... = (a*c \<le> b)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1376	by (simp add: order_less_imp_not_eq [OF less] divide_inverse mult_assoc)
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1377	finally show ?thesis .
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1378	qed
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1379
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1380	lemma divide_le_eq:
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1381	"(b/c \<le> a) =
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1382	(if 0 < c then b \<le> a*c
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1383	else if c < 0 then a*c \<le> b
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1384	else 0 \<le> (a::'a::{ordered_field,division_by_zero}))"
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	1385	apply (cases "c=0", simp)
14288 d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1386	apply (force simp add: pos_divide_le_eq neg_divide_le_eq linorder_neq_iff)
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1387	done
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1388
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1389	lemma pos_less_divide_eq:
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1390	"0 < (c::'a::ordered_field) ==> (a < b/c) = (a*c < b)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1391	proof -
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1392	assume less: "0<c"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1393	hence "(a < b/c) = (ac < (b/c)c)"
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1394	by (simp add: mult_less_cancel_right_disj order_less_not_sym [OF less])
14288 d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1395	also have "... = (a*c < b)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1396	by (simp add: order_less_imp_not_eq2 [OF less] divide_inverse mult_assoc)
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1397	finally show ?thesis .
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1398	qed
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1399
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1400	lemma neg_less_divide_eq:
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1401	"c < (0::'a::ordered_field) ==> (a < b/c) = (b < a*c)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1402	proof -
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1403	assume less: "c<0"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1404	hence "(a < b/c) = ((b/c)c < ac)"
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1405	by (simp add: mult_less_cancel_right_disj order_less_not_sym [OF less])
14288 d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1406	also have "... = (b < a*c)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1407	by (simp add: order_less_imp_not_eq [OF less] divide_inverse mult_assoc)
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1408	finally show ?thesis .
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1409	qed
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1410
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1411	lemma less_divide_eq:
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1412	"(a < b/c) =
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1413	(if 0 < c then a*c < b
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1414	else if c < 0 then b < a*c
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1415	else a < (0::'a::{ordered_field,division_by_zero}))"
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	1416	apply (cases "c=0", simp)
14288 d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1417	apply (force simp add: pos_less_divide_eq neg_less_divide_eq linorder_neq_iff)
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1418	done
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1419
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1420	lemma pos_divide_less_eq:
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1421	"0 < (c::'a::ordered_field) ==> (b/c < a) = (b < a*c)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1422	proof -
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1423	assume less: "0<c"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1424	hence "(b/c < a) = ((b/c)c < ac)"
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1425	by (simp add: mult_less_cancel_right_disj order_less_not_sym [OF less])
14288 d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1426	also have "... = (b < a*c)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1427	by (simp add: order_less_imp_not_eq2 [OF less] divide_inverse mult_assoc)
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1428	finally show ?thesis .
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1429	qed
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1430
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1431	lemma neg_divide_less_eq:
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1432	"c < (0::'a::ordered_field) ==> (b/c < a) = (a*c < b)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1433	proof -
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1434	assume less: "c<0"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1435	hence "(b/c < a) = (ac < (b/c)c)"
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1436	by (simp add: mult_less_cancel_right_disj order_less_not_sym [OF less])
14288 d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1437	also have "... = (a*c < b)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1438	by (simp add: order_less_imp_not_eq [OF less] divide_inverse mult_assoc)
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1439	finally show ?thesis .
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1440	qed
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1441
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1442	lemma divide_less_eq:
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1443	"(b/c < a) =
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1444	(if 0 < c then b < a*c
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1445	else if c < 0 then a*c < b
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1446	else 0 < (a::'a::{ordered_field,division_by_zero}))"
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	1447	apply (cases "c=0", simp)
14288 d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1448	apply (force simp add: pos_divide_less_eq neg_divide_less_eq linorder_neq_iff)
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1449	done
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1450
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1451	lemma nonzero_eq_divide_eq: "c\<noteq>0 ==> ((a::'a::field) = b/c) = (a*c = b)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1452	proof -
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1453	assume [simp]: "c\<noteq>0"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1454	have "(a = b/c) = (ac = (b/c)c)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1455	by (simp add: field_mult_cancel_right)
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1456	also have "... = (a*c = b)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1457	by (simp add: divide_inverse mult_assoc)
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1458	finally show ?thesis .
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1459	qed
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1460
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1461	lemma eq_divide_eq:
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1462	"((a::'a::{field,division_by_zero}) = b/c) = (if c\<noteq>0 then a*c = b else a=0)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1463	by (simp add: nonzero_eq_divide_eq)
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1464
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1465	lemma nonzero_divide_eq_eq: "c\<noteq>0 ==> (b/c = (a::'a::field)) = (b = a*c)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1466	proof -
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1467	assume [simp]: "c\<noteq>0"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1468	have "(b/c = a) = ((b/c)c = ac)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1469	by (simp add: field_mult_cancel_right)
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1470	also have "... = (b = a*c)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1471	by (simp add: divide_inverse mult_assoc)
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1472	finally show ?thesis .
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1473	qed
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1474
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1475	lemma divide_eq_eq:
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1476	"(b/c = (a::'a::{field,division_by_zero})) = (if c\<noteq>0 then b = a*c else a=0)"
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1477	by (force simp add: nonzero_divide_eq_eq)
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1478
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1479	lemma divide_eq_imp: "(c::'a::{division_by_zero,field}) ~= 0 ==>
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1480	b = a * c ==> b / c = a"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1481	by (subst divide_eq_eq, simp)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1482
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1483	lemma eq_divide_imp: "(c::'a::{division_by_zero,field}) ~= 0 ==>
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1484	a * c = b ==> a = b / c"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1485	by (subst eq_divide_eq, simp)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1486
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1487	lemma frac_eq_eq: "(y::'a::field) ~= 0 ==> z ~= 0 ==>
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1488	(x / y = w / z) = (x * z = w * y)"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1489	apply (subst nonzero_eq_divide_eq)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1490	apply assumption
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1491	apply (subst times_divide_eq_left)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1492	apply (erule nonzero_divide_eq_eq)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1493	done
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1494
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1495	subsection{Division and Signs}
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1496
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1497	lemma zero_less_divide_iff:
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1498	"((0::'a::{ordered_field,division_by_zero}) < a/b) = (0 < a & 0 < b \| a < 0 & b < 0)"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1499	by (simp add: divide_inverse zero_less_mult_iff)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1500
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1501	lemma divide_less_0_iff:
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1502	"(a/b < (0::'a::{ordered_field,division_by_zero})) =
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1503	(0 < a & b < 0 \| a < 0 & 0 < b)"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1504	by (simp add: divide_inverse mult_less_0_iff)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1505
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1506	lemma zero_le_divide_iff:
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1507	"((0::'a::{ordered_field,division_by_zero}) \<le> a/b) =
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1508	(0 \<le> a & 0 \<le> b \| a \<le> 0 & b \<le> 0)"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1509	by (simp add: divide_inverse zero_le_mult_iff)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1510
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1511	lemma divide_le_0_iff:
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1512	"(a/b \<le> (0::'a::{ordered_field,division_by_zero})) =
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1513	(0 \<le> a & b \<le> 0 \| a \<le> 0 & 0 \<le> b)"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1514	by (simp add: divide_inverse mult_le_0_iff)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1515
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1516	lemma divide_eq_0_iff [simp]:
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1517	"(a/b = 0) = (a=0 \| b=(0::'a::{field,division_by_zero}))"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1518	by (simp add: divide_inverse field_mult_eq_0_iff)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1519
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1520	lemma divide_pos_pos: "0 < (x::'a::ordered_field) ==>
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1521	0 < y ==> 0 < x / y"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1522	apply (subst pos_less_divide_eq)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1523	apply assumption
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1524	apply simp
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1525	done
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1526
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1527	lemma divide_nonneg_pos: "0 <= (x::'a::ordered_field) ==> 0 < y ==>
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1528	0 <= x / y"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1529	apply (subst pos_le_divide_eq)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1530	apply assumption
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1531	apply simp
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1532	done
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1533
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1534	lemma divide_neg_pos: "(x::'a::ordered_field) < 0 ==> 0 < y ==> x / y < 0"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1535	apply (subst pos_divide_less_eq)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1536	apply assumption
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1537	apply simp
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1538	done
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1539
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1540	lemma divide_nonpos_pos: "(x::'a::ordered_field) <= 0 ==>
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1541	0 < y ==> x / y <= 0"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1542	apply (subst pos_divide_le_eq)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1543	apply assumption
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1544	apply simp
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1545	done
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1546
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1547	lemma divide_pos_neg: "0 < (x::'a::ordered_field) ==> y < 0 ==> x / y < 0"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1548	apply (subst neg_divide_less_eq)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1549	apply assumption
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1550	apply simp
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1551	done
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1552
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1553	lemma divide_nonneg_neg: "0 <= (x::'a::ordered_field) ==>
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1554	y < 0 ==> x / y <= 0"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1555	apply (subst neg_divide_le_eq)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1556	apply assumption
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1557	apply simp
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1558	done
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1559
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1560	lemma divide_neg_neg: "(x::'a::ordered_field) < 0 ==> y < 0 ==> 0 < x / y"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1561	apply (subst neg_less_divide_eq)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1562	apply assumption
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1563	apply simp
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1564	done
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1565
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1566	lemma divide_nonpos_neg: "(x::'a::ordered_field) <= 0 ==> y < 0 ==>
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1567	0 <= x / y"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1568	apply (subst neg_le_divide_eq)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1569	apply assumption
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1570	apply simp
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1571	done
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1572
14288 d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1573	subsection{Cancellation Laws for Division}
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1574
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1575	lemma divide_cancel_right [simp]:
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1576	"(a/c = b/c) = (c = 0 \| a = (b::'a::{field,division_by_zero}))"
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	1577	apply (cases "c=0", simp)
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14421 diff changeset	1578	apply (simp add: divide_inverse field_mult_cancel_right)
14288 d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1579	done
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1580
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1581	lemma divide_cancel_left [simp]:
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1582	"(c/a = c/b) = (c = 0 \| a = (b::'a::{field,division_by_zero}))"
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	1583	apply (cases "c=0", simp)
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14421 diff changeset	1584	apply (simp add: divide_inverse field_mult_cancel_left)
14288 d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1585	done
d149e3cbdb39 Moving some theorems from Real/RealArith0.ML paulson parents: 14284 diff changeset	1586
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1587	subsection {* Division and the Number One *}
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1588
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1589	text{Simplify expressions equated with 1}
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1590	lemma divide_eq_1_iff [simp]:
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1591	"(a/b = 1) = (b \<noteq> 0 & a = (b::'a::{field,division_by_zero}))"
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	1592	apply (cases "b=0", simp)
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1593	apply (simp add: right_inverse_eq)
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1594	done
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1595
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1596	lemma one_eq_divide_iff [simp]:
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1597	"(1 = a/b) = (b \<noteq> 0 & a = (b::'a::{field,division_by_zero}))"
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1598	by (simp add: eq_commute [of 1])
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1599
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1600	lemma zero_eq_1_divide_iff [simp]:
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1601	"((0::'a::{ordered_field,division_by_zero}) = 1/a) = (a = 0)"
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	1602	apply (cases "a=0", simp)
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1603	apply (auto simp add: nonzero_eq_divide_eq)
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1604	done
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1605
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1606	lemma one_divide_eq_0_iff [simp]:
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1607	"(1/a = (0::'a::{ordered_field,division_by_zero})) = (a = 0)"
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	1608	apply (cases "a=0", simp)
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1609	apply (insert zero_neq_one [THEN not_sym])
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1610	apply (auto simp add: nonzero_divide_eq_eq)
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1611	done
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1612
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1613	text{Simplify expressions such as @{text "0 < 1/x"} to @{text "0 < x"}}
18623 9a5419d5ca01 simplified the special-case simprules paulson parents: 17085 diff changeset	1614	lemmas zero_less_divide_1_iff = zero_less_divide_iff [of 1, simplified]
9a5419d5ca01 simplified the special-case simprules paulson parents: 17085 diff changeset	1615	lemmas divide_less_0_1_iff = divide_less_0_iff [of 1, simplified]
9a5419d5ca01 simplified the special-case simprules paulson parents: 17085 diff changeset	1616	lemmas zero_le_divide_1_iff = zero_le_divide_iff [of 1, simplified]
9a5419d5ca01 simplified the special-case simprules paulson parents: 17085 diff changeset	1617	lemmas divide_le_0_1_iff = divide_le_0_iff [of 1, simplified]
17085 5b57f995a179 more simprules now have names paulson parents: 16775 diff changeset	1618
5b57f995a179 more simprules now have names paulson parents: 16775 diff changeset	1619	declare zero_less_divide_1_iff [simp]
5b57f995a179 more simprules now have names paulson parents: 16775 diff changeset	1620	declare divide_less_0_1_iff [simp]
5b57f995a179 more simprules now have names paulson parents: 16775 diff changeset	1621	declare zero_le_divide_1_iff [simp]
5b57f995a179 more simprules now have names paulson parents: 16775 diff changeset	1622	declare divide_le_0_1_iff [simp]
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14348 diff changeset	1623
14293 22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1624	subsection {* Ordering Rules for Division *}
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1625
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1626	lemma divide_strict_right_mono:
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1627	"[\|a < b; 0 < c\|] ==> a / c < b / (c::'a::ordered_field)"
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1628	by (simp add: order_less_imp_not_eq2 divide_inverse mult_strict_right_mono
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1629	positive_imp_inverse_positive)
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1630
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1631	lemma divide_right_mono:
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1632	"[\|a \<le> b; 0 \<le> c\|] ==> a/c \<le> b/(c::'a::{ordered_field,division_by_zero})"
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1633	by (force simp add: divide_strict_right_mono order_le_less)
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1634
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1635	lemma divide_right_mono_neg: "(a::'a::{division_by_zero,ordered_field}) <= b
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1636	==> c <= 0 ==> b / c <= a / c"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1637	apply (drule divide_right_mono [of _ _ "- c"])
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1638	apply auto
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1639	done
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1640
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1641	lemma divide_strict_right_mono_neg:
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1642	"[\|b < a; c < 0\|] ==> a / c < b / (c::'a::ordered_field)"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1643	apply (drule divide_strict_right_mono [of _ _ "-c"], simp)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1644	apply (simp add: order_less_imp_not_eq nonzero_minus_divide_right [symmetric])
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1645	done
14293 22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1646
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1647	text{*The last premise ensures that @{term a} and @{term b}
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1648	have the same sign*}
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1649	lemma divide_strict_left_mono:
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1650	"[\|b < a; 0 < c; 0 < a*b\|] ==> c / a < c / (b::'a::ordered_field)"
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1651	by (force simp add: zero_less_mult_iff divide_inverse mult_strict_left_mono
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1652	order_less_imp_not_eq order_less_imp_not_eq2
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1653	less_imp_inverse_less less_imp_inverse_less_neg)
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1654
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1655	lemma divide_left_mono:
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1656	"[\|b \<le> a; 0 \<le> c; 0 < a*b\|] ==> c / a \<le> c / (b::'a::ordered_field)"
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1657	apply (subgoal_tac "a \<noteq> 0 & b \<noteq> 0")
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1658	prefer 2
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1659	apply (force simp add: zero_less_mult_iff order_less_imp_not_eq)
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	1660	apply (cases "c=0", simp add: divide_inverse)
14293 22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1661	apply (force simp add: divide_strict_left_mono order_le_less)
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1662	done
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1663
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1664	lemma divide_left_mono_neg: "(a::'a::{division_by_zero,ordered_field}) <= b
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1665	==> c <= 0 ==> 0 < a * b ==> c / a <= c / b"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1666	apply (drule divide_left_mono [of _ _ "- c"])
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1667	apply (auto simp add: mult_commute)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1668	done
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1669
14293 22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1670	lemma divide_strict_left_mono_neg:
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1671	"[\|a < b; c < 0; 0 < a*b\|] ==> c / a < c / (b::'a::ordered_field)"
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1672	apply (subgoal_tac "a \<noteq> 0 & b \<noteq> 0")
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1673	prefer 2
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1674	apply (force simp add: zero_less_mult_iff order_less_imp_not_eq)
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1675	apply (drule divide_strict_left_mono [of _ _ "-c"])
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1676	apply (simp_all add: mult_commute nonzero_minus_divide_left [symmetric])
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1677	done
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1678
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1679	text{Simplify quotients that are compared with the value 1.}
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1680
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1681	lemma le_divide_eq_1:
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1682	fixes a :: "'a :: {ordered_field,division_by_zero}"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1683	shows "(1 \<le> b / a) = ((0 < a & a \<le> b) \| (a < 0 & b \<le> a))"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1684	by (auto simp add: le_divide_eq)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1685
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1686	lemma divide_le_eq_1:
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1687	fixes a :: "'a :: {ordered_field,division_by_zero}"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1688	shows "(b / a \<le> 1) = ((0 < a & b \<le> a) \| (a < 0 & a \<le> b) \| a=0)"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1689	by (auto simp add: divide_le_eq)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1690
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1691	lemma less_divide_eq_1:
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1692	fixes a :: "'a :: {ordered_field,division_by_zero}"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1693	shows "(1 < b / a) = ((0 < a & a < b) \| (a < 0 & b < a))"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1694	by (auto simp add: less_divide_eq)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1695
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1696	lemma divide_less_eq_1:
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1697	fixes a :: "'a :: {ordered_field,division_by_zero}"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1698	shows "(b / a < 1) = ((0 < a & b < a) \| (a < 0 & a < b) \| a=0)"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1699	by (auto simp add: divide_less_eq)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1700
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1701	subsection{Conditional Simplification Rules: No Case Splits}
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1702
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1703	lemma le_divide_eq_1_pos [simp]:
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1704	fixes a :: "'a :: {ordered_field,division_by_zero}"
18649 bb99c2e705ca tidied, and added missing thm divide_less_eq_1_neg paulson parents: 18623 diff changeset	1705	shows "0 < a \<Longrightarrow> (1 \<le> b/a) = (a \<le> b)"
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1706	by (auto simp add: le_divide_eq)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1707
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1708	lemma le_divide_eq_1_neg [simp]:
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1709	fixes a :: "'a :: {ordered_field,division_by_zero}"
18649 bb99c2e705ca tidied, and added missing thm divide_less_eq_1_neg paulson parents: 18623 diff changeset	1710	shows "a < 0 \<Longrightarrow> (1 \<le> b/a) = (b \<le> a)"
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1711	by (auto simp add: le_divide_eq)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1712
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1713	lemma divide_le_eq_1_pos [simp]:
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1714	fixes a :: "'a :: {ordered_field,division_by_zero}"
18649 bb99c2e705ca tidied, and added missing thm divide_less_eq_1_neg paulson parents: 18623 diff changeset	1715	shows "0 < a \<Longrightarrow> (b/a \<le> 1) = (b \<le> a)"
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1716	by (auto simp add: divide_le_eq)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1717
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1718	lemma divide_le_eq_1_neg [simp]:
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1719	fixes a :: "'a :: {ordered_field,division_by_zero}"
18649 bb99c2e705ca tidied, and added missing thm divide_less_eq_1_neg paulson parents: 18623 diff changeset	1720	shows "a < 0 \<Longrightarrow> (b/a \<le> 1) = (a \<le> b)"
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1721	by (auto simp add: divide_le_eq)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1722
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1723	lemma less_divide_eq_1_pos [simp]:
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1724	fixes a :: "'a :: {ordered_field,division_by_zero}"
18649 bb99c2e705ca tidied, and added missing thm divide_less_eq_1_neg paulson parents: 18623 diff changeset	1725	shows "0 < a \<Longrightarrow> (1 < b/a) = (a < b)"
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1726	by (auto simp add: less_divide_eq)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1727
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1728	lemma less_divide_eq_1_neg [simp]:
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1729	fixes a :: "'a :: {ordered_field,division_by_zero}"
18649 bb99c2e705ca tidied, and added missing thm divide_less_eq_1_neg paulson parents: 18623 diff changeset	1730	shows "a < 0 \<Longrightarrow> (1 < b/a) = (b < a)"
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1731	by (auto simp add: less_divide_eq)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1732
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1733	lemma divide_less_eq_1_pos [simp]:
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1734	fixes a :: "'a :: {ordered_field,division_by_zero}"
18649 bb99c2e705ca tidied, and added missing thm divide_less_eq_1_neg paulson parents: 18623 diff changeset	1735	shows "0 < a \<Longrightarrow> (b/a < 1) = (b < a)"
bb99c2e705ca tidied, and added missing thm divide_less_eq_1_neg paulson parents: 18623 diff changeset	1736	by (auto simp add: divide_less_eq)
bb99c2e705ca tidied, and added missing thm divide_less_eq_1_neg paulson parents: 18623 diff changeset	1737
bb99c2e705ca tidied, and added missing thm divide_less_eq_1_neg paulson parents: 18623 diff changeset	1738	lemma divide_less_eq_1_neg [simp]:
bb99c2e705ca tidied, and added missing thm divide_less_eq_1_neg paulson parents: 18623 diff changeset	1739	fixes a :: "'a :: {ordered_field,division_by_zero}"
bb99c2e705ca tidied, and added missing thm divide_less_eq_1_neg paulson parents: 18623 diff changeset	1740	shows "a < 0 \<Longrightarrow> b/a < 1 <-> a < b"
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1741	by (auto simp add: divide_less_eq)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1742
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1743	lemma eq_divide_eq_1 [simp]:
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1744	fixes a :: "'a :: {ordered_field,division_by_zero}"
18649 bb99c2e705ca tidied, and added missing thm divide_less_eq_1_neg paulson parents: 18623 diff changeset	1745	shows "(1 = b/a) = ((a \<noteq> 0 & a = b))"
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1746	by (auto simp add: eq_divide_eq)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1747
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1748	lemma divide_eq_eq_1 [simp]:
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1749	fixes a :: "'a :: {ordered_field,division_by_zero}"
18649 bb99c2e705ca tidied, and added missing thm divide_less_eq_1_neg paulson parents: 18623 diff changeset	1750	shows "(b/a = 1) = ((a \<noteq> 0 & a = b))"
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1751	by (auto simp add: divide_eq_eq)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1752
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1753	subsection {* Reasoning about inequalities with division *}
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1754
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1755	lemma mult_right_le_one_le: "0 <= (x::'a::ordered_idom) ==> 0 <= y ==> y <= 1
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1756	==> x * y <= x"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1757	by (auto simp add: mult_compare_simps);
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1758
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1759	lemma mult_left_le_one_le: "0 <= (x::'a::ordered_idom) ==> 0 <= y ==> y <= 1
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1760	==> y * x <= x"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1761	by (auto simp add: mult_compare_simps);
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1762
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1763	lemma mult_imp_div_pos_le: "0 < (y::'a::ordered_field) ==> x <= z * y ==>
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1764	x / y <= z";
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1765	by (subst pos_divide_le_eq, assumption+);
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1766
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1767	lemma mult_imp_le_div_pos: "0 < (y::'a::ordered_field) ==> z * y <= x ==>
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1768	z <= x / y";
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1769	by (subst pos_le_divide_eq, assumption+)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1770
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1771	lemma mult_imp_div_pos_less: "0 < (y::'a::ordered_field) ==> x < z * y ==>
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1772	x / y < z"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1773	by (subst pos_divide_less_eq, assumption+)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1774
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1775	lemma mult_imp_less_div_pos: "0 < (y::'a::ordered_field) ==> z * y < x ==>
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1776	z < x / y"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1777	by (subst pos_less_divide_eq, assumption+)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1778
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1779	lemma frac_le: "(0::'a::ordered_field) <= x ==>
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1780	x <= y ==> 0 < w ==> w <= z ==> x / z <= y / w"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1781	apply (rule mult_imp_div_pos_le)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1782	apply simp;
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1783	apply (subst times_divide_eq_left);
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1784	apply (rule mult_imp_le_div_pos, assumption)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1785	apply (rule mult_mono)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1786	apply simp_all
14293 22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1787	done
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1788
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1789	lemma frac_less: "(0::'a::ordered_field) <= x ==>
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1790	x < y ==> 0 < w ==> w <= z ==> x / z < y / w"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1791	apply (rule mult_imp_div_pos_less)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1792	apply simp;
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1793	apply (subst times_divide_eq_left);
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1794	apply (rule mult_imp_less_div_pos, assumption)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1795	apply (erule mult_less_le_imp_less)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1796	apply simp_all
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1797	done
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1798
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1799	lemma frac_less2: "(0::'a::ordered_field) < x ==>
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1800	x <= y ==> 0 < w ==> w < z ==> x / z < y / w"
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1801	apply (rule mult_imp_div_pos_less)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1802	apply simp_all
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1803	apply (subst times_divide_eq_left);
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1804	apply (rule mult_imp_less_div_pos, assumption)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1805	apply (erule mult_le_less_imp_less)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1806	apply simp_all
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1807	done
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1808
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1809	lemmas times_divide_eq = times_divide_eq_right times_divide_eq_left
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1810
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1811	text{*It's not obvious whether these should be simprules or not.
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1812	Their effect is to gather terms into one big fraction, like
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1813	abc / xyz. The rationale for that is unclear, but many proofs
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1814	seem to need them.*}
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1815
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1816	declare times_divide_eq [simp]
14293 22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1817
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1818	subsection {* Ordered Fields are Dense *}
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1819
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1820	lemma less_add_one: "a < (a+1::'a::ordered_semidom)"
14293 22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1821	proof -
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1822	have "a+0 < (a+1::'a::ordered_semidom)"
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1823	by (blast intro: zero_less_one add_strict_left_mono)
14293 22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1824	thus ?thesis by simp
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1825	qed
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1826
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1827	lemma zero_less_two: "0 < (1+1::'a::ordered_semidom)"
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1828	by (blast intro: order_less_trans zero_less_one less_add_one)
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14353 diff changeset	1829
14293 22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1830	lemma less_half_sum: "a < b ==> a < (a+b) / (1+1::'a::ordered_field)"
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1831	by (simp add: zero_less_two pos_less_divide_eq right_distrib)
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1832
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1833	lemma gt_half_sum: "a < b ==> (a+b)/(1+1::'a::ordered_field) < b"
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1834	by (simp add: zero_less_two pos_divide_less_eq right_distrib)
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1835
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1836	lemma dense: "a < b ==> \<exists>r::'a::ordered_field. a < r & r < b"
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1837	by (blast intro!: less_half_sum gt_half_sum)
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1838
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1839
14293 22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1840	subsection {* Absolute Value *}
22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1841
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1842	lemma abs_one [simp]: "abs 1 = (1::'a::ordered_idom)"
14294 f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1843	by (simp add: abs_if zero_less_one [THEN order_less_not_sym])
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1844
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1845	lemma abs_le_mult: "abs (a * b) \<le> (abs a) * (abs (b::'a::lordered_ring))"
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1846	proof -
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1847	let ?x = "pprt a * pprt b - pprt a * nprt b - nprt a * pprt b + nprt a * nprt b"
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1848	let ?y = "pprt a * pprt b + pprt a * nprt b + nprt a * pprt b + nprt a * nprt b"
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1849	have a: "(abs a) * (abs b) = ?x"
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1850	by (simp only: abs_prts[of a] abs_prts[of b] ring_eq_simps)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1851	{
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1852	fix u v :: 'a
15481 fc075ae929e4 the new subst tactic, by Lucas Dixon paulson parents: 15234 diff changeset	1853	have bh: "\<lbrakk>u = a; v = b\<rbrakk> \<Longrightarrow>
fc075ae929e4 the new subst tactic, by Lucas Dixon paulson parents: 15234 diff changeset	1854	u * v = pprt a * pprt b + pprt a * nprt b +
fc075ae929e4 the new subst tactic, by Lucas Dixon paulson parents: 15234 diff changeset	1855	nprt a * pprt b + nprt a * nprt b"
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1856	apply (subst prts[of u], subst prts[of v])
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1857	apply (simp add: left_distrib right_distrib add_ac)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1858	done
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1859	}
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1860	note b = this[OF refl[of a] refl[of b]]
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1861	note addm = add_mono[of "0::'a" _ "0::'a", simplified]
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1862	note addm2 = add_mono[of _ "0::'a" _ "0::'a", simplified]
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1863	have xy: "- ?x <= ?y"
14754 a080eeeaec14 Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy obua parents: 14738 diff changeset	1864	apply (simp)
a080eeeaec14 Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy obua parents: 14738 diff changeset	1865	apply (rule_tac y="0::'a" in order_trans)
16568 e02fe7ae212b Changes due to new abel_cancel.ML nipkow parents: 15923 diff changeset	1866	apply (rule addm2)
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1867	apply (simp_all add: mult_nonneg_nonneg mult_nonpos_nonpos)
16568 e02fe7ae212b Changes due to new abel_cancel.ML nipkow parents: 15923 diff changeset	1868	apply (rule addm)
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1869	apply (simp_all add: mult_nonneg_nonneg mult_nonpos_nonpos)
14754 a080eeeaec14 Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy obua parents: 14738 diff changeset	1870	done
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1871	have yx: "?y <= ?x"
16568 e02fe7ae212b Changes due to new abel_cancel.ML nipkow parents: 15923 diff changeset	1872	apply (simp add:diff_def)
14754 a080eeeaec14 Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy obua parents: 14738 diff changeset	1873	apply (rule_tac y=0 in order_trans)
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1874	apply (rule addm2, (simp add: mult_nonneg_nonpos mult_nonneg_nonpos2)+)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1875	apply (rule addm, (simp add: mult_nonneg_nonpos mult_nonneg_nonpos2)+)
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1876	done
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1877	have i1: "ab <= abs a abs b" by (simp only: a b yx)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1878	have i2: "- (abs a * abs b) <= a*b" by (simp only: a b xy)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1879	show ?thesis
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1880	apply (rule abs_leI)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1881	apply (simp add: i1)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1882	apply (simp add: i2[simplified minus_le_iff])
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1883	done
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1884	qed
14294 f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1885
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1886	lemma abs_eq_mult:
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1887	assumes "(0 \<le> a \<or> a \<le> 0) \<and> (0 \<le> b \<or> b \<le> 0)"
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1888	shows "abs (ab) = abs a abs (b::'a::lordered_ring)"
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1889	proof -
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1890	have s: "(0 <= ab) \| (ab <= 0)"
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1891	apply (auto)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1892	apply (rule_tac split_mult_pos_le)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1893	apply (rule_tac contrapos_np[of "a*b <= 0"])
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1894	apply (simp)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1895	apply (rule_tac split_mult_neg_le)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1896	apply (insert prems)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1897	apply (blast)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1898	done
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1899	have mulprts: "a * b = (pprt a + nprt a) * (pprt b + nprt b)"
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1900	by (simp add: prts[symmetric])
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1901	show ?thesis
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1902	proof cases
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1903	assume "0 <= a * b"
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1904	then show ?thesis
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1905	apply (simp_all add: mulprts abs_prts)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1906	apply (insert prems)
14754 a080eeeaec14 Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy obua parents: 14738 diff changeset	1907	apply (auto simp add:
a080eeeaec14 Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy obua parents: 14738 diff changeset	1908	ring_eq_simps
a080eeeaec14 Modification / Installation of Provers/Arith/abel_cancel.ML for OrderedGroup.thy obua parents: 14738 diff changeset	1909	iff2imp[OF zero_le_iff_zero_nprt] iff2imp[OF le_zero_iff_zero_pprt]
15197 19e735596e51 Added antisymmetry simproc nipkow parents: 15178 diff changeset	1910	iff2imp[OF le_zero_iff_pprt_id] iff2imp[OF zero_le_iff_nprt_id])
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1911	apply(drule (1) mult_nonneg_nonpos[of a b], simp)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1912	apply(drule (1) mult_nonneg_nonpos2[of b a], simp)
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1913	done
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1914	next
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1915	assume "~(0 <= a*b)"
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1916	with s have "a*b <= 0" by simp
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1917	then show ?thesis
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1918	apply (simp_all add: mulprts abs_prts)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1919	apply (insert prems)
15580 900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	1920	apply (auto simp add: ring_eq_simps)
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1921	apply(drule (1) mult_nonneg_nonneg[of a b],simp)
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1922	apply(drule (1) mult_nonpos_nonpos[of a b],simp)
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1923	done
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1924	qed
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1925	qed
14294 f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1926
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1927	lemma abs_mult: "abs (a * b) = abs a * abs (b::'a::ordered_idom)"
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1928	by (simp add: abs_eq_mult linorder_linear)
14293 22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1929
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1930	lemma abs_mult_self: "abs a * abs a = a * (a::'a::ordered_idom)"
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1931	by (simp add: abs_if)
14294 f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1932
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1933	lemma nonzero_abs_inverse:
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1934	"a \<noteq> 0 ==> abs (inverse (a::'a::ordered_field)) = inverse (abs a)"
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1935	apply (auto simp add: linorder_neq_iff abs_if nonzero_inverse_minus_eq
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1936	negative_imp_inverse_negative)
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1937	apply (blast intro: positive_imp_inverse_positive elim: order_less_asym)
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1938	done
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1939
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1940	lemma abs_inverse [simp]:
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1941	"abs (inverse (a::'a::{ordered_field,division_by_zero})) =
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1942	inverse (abs a)"
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	1943	apply (cases "a=0", simp)
14294 f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1944	apply (simp add: nonzero_abs_inverse)
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1945	done
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1946
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1947	lemma nonzero_abs_divide:
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1948	"b \<noteq> 0 ==> abs (a / (b::'a::ordered_field)) = abs a / abs b"
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1949	by (simp add: divide_inverse abs_mult nonzero_abs_inverse)
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1950
15234 ec91a90c604e simplification tweaks for better arithmetic reasoning paulson parents: 15229 diff changeset	1951	lemma abs_divide [simp]:
14294 f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1952	"abs (a / (b::'a::{ordered_field,division_by_zero})) = abs a / abs b"
21328 73bb86d0f483 dropped Inductive dependency haftmann parents: 21258 diff changeset	1953	apply (cases "b=0", simp)
14294 f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1954	apply (simp add: nonzero_abs_divide)
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1955	done
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1956
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1957	lemma abs_mult_less:
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1958	"[\| abs a < c; abs b < d \|] ==> abs a * abs b < c*(d::'a::ordered_idom)"
14294 f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1959	proof -
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1960	assume ac: "abs a < c"
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1961	hence cpos: "0<c" by (blast intro: order_le_less_trans abs_ge_zero)
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1962	assume "abs b < d"
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1963	thus ?thesis by (simp add: ac cpos mult_strict_mono)
f4d806fd72ce absolute value theorems moved to HOL/Ring_and_Field paulson parents: 14293 diff changeset	1964	qed
14293 22542982bffd moving some division theorems to Ring_and_Field paulson parents: 14288 diff changeset	1965
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1966	lemma eq_minus_self_iff: "(a = -a) = (a = (0::'a::ordered_idom))"
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1967	by (force simp add: order_eq_iff le_minus_self_iff minus_le_self_iff)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1968
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1969	lemma less_minus_self_iff: "(a < -a) = (a < (0::'a::ordered_idom))"
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1970	by (simp add: order_less_le le_minus_self_iff eq_minus_self_iff)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1971
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1972	lemma abs_less_iff: "(abs a < b) = (a < b & -a < (b::'a::ordered_idom))"
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1973	apply (simp add: order_less_le abs_le_iff)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1974	apply (auto simp add: abs_if minus_le_self_iff eq_minus_self_iff)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1975	apply (simp add: le_minus_self_iff linorder_neq_iff)
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1976	done
83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14603 diff changeset	1977
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1978	lemma abs_mult_pos: "(0::'a::ordered_idom) <= x ==>
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1979	(abs y) * x = abs (y * x)";
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1980	apply (subst abs_mult);
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1981	apply simp;
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1982	done;
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1983
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1984	lemma abs_div_pos: "(0::'a::{division_by_zero,ordered_field}) < y ==>
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1985	abs x / y = abs (x / y)";
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1986	apply (subst abs_divide);
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1987	apply (simp add: order_less_imp_le);
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1988	done;
c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16568 diff changeset	1989
19404 9bf2cdc9e8e8 Moved stuff from Ring_and_Field to Matrix obua parents: 18649 diff changeset	1990	subsection {* Bounds of products via negative and positive Part *}
15178 5f621aa35c25 Matrix theory, linear programming obua parents: 15140 diff changeset	1991
15580 900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	1992	lemma mult_le_prts:
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	1993	assumes
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	1994	"a1 <= (a::'a::lordered_ring)"
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	1995	"a <= a2"
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	1996	"b1 <= b"
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	1997	"b <= b2"
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	1998	shows
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	1999	"a * b <= pprt a2 * pprt b2 + pprt a1 * nprt b2 + nprt a2 * pprt b1 + nprt a1 * nprt b1"
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2000	proof -
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2001	have "a * b = (pprt a + nprt a) * (pprt b + nprt b)"
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2002	apply (subst prts[symmetric])+
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2003	apply simp
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2004	done
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2005	then have "a * b = pprt a * pprt b + pprt a * nprt b + nprt a * pprt b + nprt a * nprt b"
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2006	by (simp add: ring_eq_simps)
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2007	moreover have "pprt a * pprt b <= pprt a2 * pprt b2"
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2008	by (simp_all add: prems mult_mono)
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2009	moreover have "pprt a * nprt b <= pprt a1 * nprt b2"
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2010	proof -
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2011	have "pprt a * nprt b <= pprt a * nprt b2"
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2012	by (simp add: mult_left_mono prems)
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2013	moreover have "pprt a * nprt b2 <= pprt a1 * nprt b2"
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2014	by (simp add: mult_right_mono_neg prems)
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2015	ultimately show ?thesis
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2016	by simp
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2017	qed
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2018	moreover have "nprt a * pprt b <= nprt a2 * pprt b1"
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2019	proof -
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2020	have "nprt a * pprt b <= nprt a2 * pprt b"
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2021	by (simp add: mult_right_mono prems)
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2022	moreover have "nprt a2 * pprt b <= nprt a2 * pprt b1"
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2023	by (simp add: mult_left_mono_neg prems)
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2024	ultimately show ?thesis
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2025	by simp
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2026	qed
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2027	moreover have "nprt a * nprt b <= nprt a1 * nprt b1"
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2028	proof -
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2029	have "nprt a * nprt b <= nprt a * nprt b1"
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2030	by (simp add: mult_left_mono_neg prems)
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2031	moreover have "nprt a * nprt b1 <= nprt a1 * nprt b1"
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2032	by (simp add: mult_right_mono_neg prems)
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2033	ultimately show ?thesis
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2034	by simp
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2035	qed
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2036	ultimately show ?thesis
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2037	by - (rule add_mono \| simp)+
900291ee0af8 Cleaning up HOL/Matrix obua parents: 15481 diff changeset	2038	qed
19404 9bf2cdc9e8e8 Moved stuff from Ring_and_Field to Matrix obua parents: 18649 diff changeset	2039
9bf2cdc9e8e8 Moved stuff from Ring_and_Field to Matrix obua parents: 18649 diff changeset	2040	lemma mult_ge_prts:
15178 5f621aa35c25 Matrix theory, linear programming obua parents: 15140 diff changeset	2041	assumes
19404 9bf2cdc9e8e8 Moved stuff from Ring_and_Field to Matrix obua parents: 18649 diff changeset	2042	"a1 <= (a::'a::lordered_ring)"
9bf2cdc9e8e8 Moved stuff from Ring_and_Field to Matrix obua parents: 18649 diff changeset	2043	"a <= a2"
9bf2cdc9e8e8 Moved stuff from Ring_and_Field to Matrix obua parents: 18649 diff changeset	2044	"b1 <= b"
9bf2cdc9e8e8 Moved stuff from Ring_and_Field to Matrix obua parents: 18649 diff changeset	2045	"b <= b2"
15178 5f621aa35c25 Matrix theory, linear programming obua parents: 15140 diff changeset	2046	shows
19404 9bf2cdc9e8e8 Moved stuff from Ring_and_Field to Matrix obua parents: 18649 diff changeset	2047	"a * b >= nprt a1 * pprt b2 + nprt a2 * nprt b2 + pprt a1 * pprt b1 + pprt a2 * nprt b1"
9bf2cdc9e8e8 Moved stuff from Ring_and_Field to Matrix obua parents: 18649 diff changeset	2048	proof -
9bf2cdc9e8e8 Moved stuff from Ring_and_Field to Matrix obua parents: 18649 diff changeset	2049	from prems have a1:"- a2 <= -a" by auto
9bf2cdc9e8e8 Moved stuff from Ring_and_Field to Matrix obua parents: 18649 diff changeset	2050	from prems have a2: "-a <= -a1" by auto
9bf2cdc9e8e8 Moved stuff from Ring_and_Field to Matrix obua parents: 18649 diff changeset	2051	from mult_le_prts[of "-a2" "-a" "-a1" "b1" b "b2", OF a1 a2 prems(3) prems(4), simplified nprt_neg pprt_neg]
9bf2cdc9e8e8 Moved stuff from Ring_and_Field to Matrix obua parents: 18649 diff changeset	2052	have le: "- (a * b) <= - nprt a1 * pprt b2 + - nprt a2 * nprt b2 + - pprt a1 * pprt b1 + - pprt a2 * nprt b1" by simp
9bf2cdc9e8e8 Moved stuff from Ring_and_Field to Matrix obua parents: 18649 diff changeset	2053	then have "-(- nprt a1 * pprt b2 + - nprt a2 * nprt b2 + - pprt a1 * pprt b1 + - pprt a2 * nprt b1) <= a * b"
9bf2cdc9e8e8 Moved stuff from Ring_and_Field to Matrix obua parents: 18649 diff changeset	2054	by (simp only: minus_le_iff)
9bf2cdc9e8e8 Moved stuff from Ring_and_Field to Matrix obua parents: 18649 diff changeset	2055	then show ?thesis by simp
15178 5f621aa35c25 Matrix theory, linear programming obua parents: 15140 diff changeset	2056	qed
5f621aa35c25 Matrix theory, linear programming obua parents: 15140 diff changeset	2057
22842 6d2fd4e0f984 added auxiliary lemmas for proof tools haftmann parents: 22548 diff changeset	2058	subsection {* Theorems for proof tools *}
6d2fd4e0f984 added auxiliary lemmas for proof tools haftmann parents: 22548 diff changeset	2059
6d2fd4e0f984 added auxiliary lemmas for proof tools haftmann parents: 22548 diff changeset	2060	lemma add_mono_thms_ordered_semiring:
6d2fd4e0f984 added auxiliary lemmas for proof tools haftmann parents: 22548 diff changeset	2061	fixes i j k :: "'a\<Colon>pordered_ab_semigroup_add"
6d2fd4e0f984 added auxiliary lemmas for proof tools haftmann parents: 22548 diff changeset	2062	shows "i \<le> j \<and> k \<le> l \<Longrightarrow> i + k \<le> j + l"
6d2fd4e0f984 added auxiliary lemmas for proof tools haftmann parents: 22548 diff changeset	2063	and "i = j \<and> k \<le> l \<Longrightarrow> i + k \<le> j + l"
6d2fd4e0f984 added auxiliary lemmas for proof tools haftmann parents: 22548 diff changeset	2064	and "i \<le> j \<and> k = l \<Longrightarrow> i + k \<le> j + l"
6d2fd4e0f984 added auxiliary lemmas for proof tools haftmann parents: 22548 diff changeset	2065	and "i = j \<and> k = l \<Longrightarrow> i + k = j + l"
6d2fd4e0f984 added auxiliary lemmas for proof tools haftmann parents: 22548 diff changeset	2066	by (rule add_mono, clarify+)+
6d2fd4e0f984 added auxiliary lemmas for proof tools haftmann parents: 22548 diff changeset	2067
6d2fd4e0f984 added auxiliary lemmas for proof tools haftmann parents: 22548 diff changeset	2068	lemma add_mono_thms_ordered_field:
6d2fd4e0f984 added auxiliary lemmas for proof tools haftmann parents: 22548 diff changeset	2069	fixes i j k :: "'a\<Colon>pordered_cancel_ab_semigroup_add"
6d2fd4e0f984 added auxiliary lemmas for proof tools haftmann parents: 22548 diff changeset	2070	shows "i < j \<and> k = l \<Longrightarrow> i + k < j + l"
6d2fd4e0f984 added auxiliary lemmas for proof tools haftmann parents: 22548 diff changeset	2071	and "i = j \<and> k < l \<Longrightarrow> i + k < j + l"
6d2fd4e0f984 added auxiliary lemmas for proof tools haftmann parents: 22548 diff changeset	2072	and "i < j \<and> k \<le> l \<Longrightarrow> i + k < j + l"
6d2fd4e0f984 added auxiliary lemmas for proof tools haftmann parents: 22548 diff changeset	2073	and "i \<le> j \<and> k < l \<Longrightarrow> i + k < j + l"
6d2fd4e0f984 added auxiliary lemmas for proof tools haftmann parents: 22548 diff changeset	2074	and "i < j \<and> k < l \<Longrightarrow> i + k < j + l"
6d2fd4e0f984 added auxiliary lemmas for proof tools haftmann parents: 22548 diff changeset	2075	by (auto intro: add_strict_right_mono add_strict_left_mono
6d2fd4e0f984 added auxiliary lemmas for proof tools haftmann parents: 22548 diff changeset	2076	add_less_le_mono add_le_less_mono add_strict_mono)
6d2fd4e0f984 added auxiliary lemmas for proof tools haftmann parents: 22548 diff changeset	2077
14265 95b42e69436c HOL: installation of Ring_and_Field as the basis for Naturals and Reals paulson parents: diff changeset	2078	end

author	haftmann
	Thu, 17 May 2007 19:49:16 +0200
changeset 22993	838c66e760b5
parent 22990	775e9de3db48
child 23073	d810dc04b96d
permissions	-rw-r--r--