isabelle: src/HOL/Rat.thy@63c05991882e (annotated)

35372 ca158c7b1144 renamed theory Rational to Rat haftmann parents: 35369 diff changeset	1	(* Title: HOL/Rat.thy
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	2	Author: Markus Wenzel, TU Muenchen
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	3	*)
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	4
14691 e1eedc8cad37 tuned instance statements; wenzelm parents: 14430 diff changeset	5	header {* Rational numbers *}
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	6
35372 ca158c7b1144 renamed theory Rational to Rat haftmann parents: 35369 diff changeset	7	theory Rat
30097 57df8626c23b generalize floor/ceiling to work with real and rat; rename floor_mono2 to floor_mono huffman parents: 30095 diff changeset	8	imports GCD Archimedean_Field
35343 523124691b3a move float syntax from RealPow to Rational huffman parents: 35293 diff changeset	9	uses ("Tools/float_syntax.ML")
15131 c69542757a4d New theory header syntax. nipkow parents: 15013 diff changeset	10	begin
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	11
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	12	subsection {* Rational numbers as quotient *}
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	13
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	14	subsubsection {* Construction of the type of rational numbers *}
18913 57f19fad8c2a reimplemented using Equiv_Relations.thy huffman parents: 18372 diff changeset	15
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 20522 diff changeset	16	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 20522 diff changeset	17	ratrel :: "((int \<times> int) \<times> (int \<times> int)) set" where
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	18	"ratrel = {(x, y). snd x \<noteq> 0 \<and> snd y \<noteq> 0 \<and> fst x * snd y = fst y * snd x}"
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	19
18913 57f19fad8c2a reimplemented using Equiv_Relations.thy huffman parents: 18372 diff changeset	20	lemma ratrel_iff [simp]:
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	21	"(x, y) \<in> ratrel \<longleftrightarrow> snd x \<noteq> 0 \<and> snd y \<noteq> 0 \<and> fst x * snd y = fst y * snd x"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	22	by (simp add: ratrel_def)
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	23
30198 922f944f03b2 name changes nipkow parents: 30097 diff changeset	24	lemma refl_on_ratrel: "refl_on {x. snd x \<noteq> 0} ratrel"
922f944f03b2 name changes nipkow parents: 30097 diff changeset	25	by (auto simp add: refl_on_def ratrel_def)
18913 57f19fad8c2a reimplemented using Equiv_Relations.thy huffman parents: 18372 diff changeset	26
57f19fad8c2a reimplemented using Equiv_Relations.thy huffman parents: 18372 diff changeset	27	lemma sym_ratrel: "sym ratrel"
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	28	by (simp add: ratrel_def sym_def)
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	29
18913 57f19fad8c2a reimplemented using Equiv_Relations.thy huffman parents: 18372 diff changeset	30	lemma trans_ratrel: "trans ratrel"
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	31	proof (rule transI, unfold split_paired_all)
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	32	fix a b a' b' a'' b'' :: int
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	33	assume A: "((a, b), (a', b')) \<in> ratrel"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	34	assume B: "((a', b'), (a'', b'')) \<in> ratrel"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	35	have "b' * (a * b'') = b'' * (a * b')" by simp
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	36	also from A have "a * b' = a' * b" by auto
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	37	also have "b'' * (a' * b) = b * (a' * b'')" by simp
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	38	also from B have "a' * b'' = a'' * b'" by auto
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	39	also have "b * (a'' * b') = b' * (a'' * b)" by simp
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	40	finally have "b' * (a * b'') = b' * (a'' * b)" .
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	41	moreover from B have "b' \<noteq> 0" by auto
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	42	ultimately have "a * b'' = a'' * b" by simp
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	43	with A B show "((a, b), (a'', b'')) \<in> ratrel" by auto
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	44	qed
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	45
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	46	lemma equiv_ratrel: "equiv {x. snd x \<noteq> 0} ratrel"
40815 6e2d17cc0d1d equivI has replaced equiv.intro haftmann parents: 39910 diff changeset	47	by (rule equivI [OF refl_on_ratrel sym_ratrel trans_ratrel])
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	48
18913 57f19fad8c2a reimplemented using Equiv_Relations.thy huffman parents: 18372 diff changeset	49	lemmas UN_ratrel = UN_equiv_class [OF equiv_ratrel]
57f19fad8c2a reimplemented using Equiv_Relations.thy huffman parents: 18372 diff changeset	50	lemmas UN_ratrel2 = UN_equiv_class2 [OF equiv_ratrel equiv_ratrel]
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	51
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	52	lemma equiv_ratrel_iff [iff]:
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	53	assumes "snd x \<noteq> 0" and "snd y \<noteq> 0"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	54	shows "ratrel `` {x} = ratrel `` {y} \<longleftrightarrow> (x, y) \<in> ratrel"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	55	by (rule eq_equiv_class_iff, rule equiv_ratrel) (auto simp add: assms)
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	56
45694 4a8743618257 prefer typedef without extra definition and alternative name; wenzelm parents: 45507 diff changeset	57	definition "Rat = {x. snd x \<noteq> 0} // ratrel"
4a8743618257 prefer typedef without extra definition and alternative name; wenzelm parents: 45507 diff changeset	58
4a8743618257 prefer typedef without extra definition and alternative name; wenzelm parents: 45507 diff changeset	59	typedef (open) rat = Rat
4a8743618257 prefer typedef without extra definition and alternative name; wenzelm parents: 45507 diff changeset	60	morphisms Rep_Rat Abs_Rat
4a8743618257 prefer typedef without extra definition and alternative name; wenzelm parents: 45507 diff changeset	61	unfolding Rat_def
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	62	proof
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	63	have "(0::int, 1::int) \<in> {x. snd x \<noteq> 0}" by simp
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	64	then show "ratrel `` {(0, 1)} \<in> {x. snd x \<noteq> 0} // ratrel" by (rule quotientI)
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	65	qed
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	66
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	67	lemma ratrel_in_Rat [simp]: "snd x \<noteq> 0 \<Longrightarrow> ratrel `` {x} \<in> Rat"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	68	by (simp add: Rat_def quotientI)
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	69
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	70	declare Abs_Rat_inject [simp] Abs_Rat_inverse [simp]
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	71
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	72
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	73	subsubsection {* Representation and basic operations *}
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	74
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	75	definition
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	76	Fract :: "int \<Rightarrow> int \<Rightarrow> rat" where
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	77	"Fract a b = Abs_Rat (ratrel `` {if b = 0 then (0, 1) else (a, b)})"
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	78
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	79	lemma eq_rat:
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	80	shows "\<And>a b c d. b \<noteq> 0 \<Longrightarrow> d \<noteq> 0 \<Longrightarrow> Fract a b = Fract c d \<longleftrightarrow> a * d = c * b"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	81	and "\<And>a. Fract a 0 = Fract 0 1"
818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	82	and "\<And>a c. Fract 0 a = Fract 0 c"
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	83	by (simp_all add: Fract_def)
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	84
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	85	lemma Rat_cases [case_names Fract, cases type: rat]:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	86	assumes "\<And>a b. q = Fract a b \<Longrightarrow> b > 0 \<Longrightarrow> coprime a b \<Longrightarrow> C"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	87	shows C
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	88	proof -
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	89	obtain a b :: int where "q = Fract a b" and "b \<noteq> 0"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	90	by (cases q) (clarsimp simp add: Fract_def Rat_def quotient_def)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	91	let ?a = "a div gcd a b"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	92	let ?b = "b div gcd a b"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	93	from `b \<noteq> 0` have "?b * gcd a b = b"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	94	by (simp add: dvd_div_mult_self)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	95	with `b \<noteq> 0` have "?b \<noteq> 0" by auto
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	96	from `q = Fract a b` `b \<noteq> 0` `?b \<noteq> 0` have q: "q = Fract ?a ?b"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	97	by (simp add: eq_rat dvd_div_mult mult_commute [of a])
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	98	from `b \<noteq> 0` have coprime: "coprime ?a ?b"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	99	by (auto intro: div_gcd_coprime_int)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	100	show C proof (cases "b > 0")
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	101	case True
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	102	note assms
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	103	moreover note q
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	104	moreover from True have "?b > 0" by (simp add: nonneg1_imp_zdiv_pos_iff)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	105	moreover note coprime
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	106	ultimately show C .
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	107	next
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	108	case False
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	109	note assms
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	110	moreover from q have "q = Fract (- ?a) (- ?b)" by (simp add: Fract_def)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	111	moreover from False `b \<noteq> 0` have "- ?b > 0" by (simp add: pos_imp_zdiv_neg_iff)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	112	moreover from coprime have "coprime (- ?a) (- ?b)" by simp
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	113	ultimately show C .
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	114	qed
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	115	qed
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	116
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	117	lemma Rat_induct [case_names Fract, induct type: rat]:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	118	assumes "\<And>a b. b > 0 \<Longrightarrow> coprime a b \<Longrightarrow> P (Fract a b)"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	119	shows "P q"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	120	using assms by (cases q) simp
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	121
31017 2c227493ea56 stripped class recpower further haftmann parents: 30960 diff changeset	122	instantiation rat :: comm_ring_1
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25502 diff changeset	123	begin
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25502 diff changeset	124
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25502 diff changeset	125	definition
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	126	Zero_rat_def: "0 = Fract 0 1"
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	127
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25502 diff changeset	128	definition
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	129	One_rat_def: "1 = Fract 1 1"
18913 57f19fad8c2a reimplemented using Equiv_Relations.thy huffman parents: 18372 diff changeset	130
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25502 diff changeset	131	definition
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	132	add_rat_def:
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	133	"q + r = Abs_Rat (\<Union>x \<in> Rep_Rat q. \<Union>y \<in> Rep_Rat r.
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	134	ratrel `` {(fst x * snd y + fst y * snd x, snd x * snd y)})"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	135
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	136	lemma add_rat [simp]:
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	137	assumes "b \<noteq> 0" and "d \<noteq> 0"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	138	shows "Fract a b + Fract c d = Fract (a * d + c * b) (b * d)"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	139	proof -
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	140	have "(\<lambda>x y. ratrel``{(fst x * snd y + fst y * snd x, snd x * snd y)})
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	141	respects2 ratrel"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	142	by (rule equiv_ratrel [THEN congruent2_commuteI]) (simp_all add: left_distrib)
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	143	with assms show ?thesis by (simp add: Fract_def add_rat_def UN_ratrel2)
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	144	qed
18913 57f19fad8c2a reimplemented using Equiv_Relations.thy huffman parents: 18372 diff changeset	145
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25502 diff changeset	146	definition
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	147	minus_rat_def:
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	148	"- q = Abs_Rat (\<Union>x \<in> Rep_Rat q. ratrel `` {(- fst x, snd x)})"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	149
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	150	lemma minus_rat [simp]: "- Fract a b = Fract (- a) b"
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	151	proof -
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	152	have "(\<lambda>x. ratrel `` {(- fst x, snd x)}) respects ratrel"
40819 2ac5af6eb8a8 adapted proofs to slightly changed definitions of congruent(2) haftmann parents: 40816 diff changeset	153	by (simp add: congruent_def split_paired_all)
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	154	then show ?thesis by (simp add: Fract_def minus_rat_def UN_ratrel)
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	155	qed
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	156
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	157	lemma minus_rat_cancel [simp]: "Fract (- a) (- b) = Fract a b"
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	158	by (cases "b = 0") (simp_all add: eq_rat)
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25502 diff changeset	159
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25502 diff changeset	160	definition
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	161	diff_rat_def: "q - r = q + - (r::rat)"
18913 57f19fad8c2a reimplemented using Equiv_Relations.thy huffman parents: 18372 diff changeset	162
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	163	lemma diff_rat [simp]:
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	164	assumes "b \<noteq> 0" and "d \<noteq> 0"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	165	shows "Fract a b - Fract c d = Fract (a * d - c * b) (b * d)"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	166	using assms by (simp add: diff_rat_def)
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25502 diff changeset	167
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25502 diff changeset	168	definition
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	169	mult_rat_def:
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	170	"q * r = Abs_Rat (\<Union>x \<in> Rep_Rat q. \<Union>y \<in> Rep_Rat r.
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	171	ratrel``{(fst x * fst y, snd x * snd y)})"
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	172
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	173	lemma mult_rat [simp]: "Fract a b * Fract c d = Fract (a * c) (b * d)"
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	174	proof -
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	175	have "(\<lambda>x y. ratrel `` {(fst x * fst y, snd x * snd y)}) respects2 ratrel"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	176	by (rule equiv_ratrel [THEN congruent2_commuteI]) simp_all
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	177	then show ?thesis by (simp add: Fract_def mult_rat_def UN_ratrel2)
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	178	qed
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	179
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	180	lemma mult_rat_cancel:
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	181	assumes "c \<noteq> 0"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	182	shows "Fract (c * a) (c * b) = Fract a b"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	183	proof -
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	184	from assms have "Fract c c = Fract 1 1" by (simp add: Fract_def)
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	185	then show ?thesis by (simp add: mult_rat [symmetric])
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	186	qed
27509 63161d5f8f29 rearrange instantiations huffman parents: 26732 diff changeset	187
63161d5f8f29 rearrange instantiations huffman parents: 26732 diff changeset	188	instance proof
27668 6eb20b2cecf8 Tuned and simplified proofs chaieb parents: 27652 diff changeset	189	fix q r s :: rat show "(q * r) * s = q * (r * s)"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	190	by (cases q, cases r, cases s) (simp add: eq_rat)
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	191	next
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	192	fix q r :: rat show "q * r = r * q"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	193	by (cases q, cases r) (simp add: eq_rat)
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	194	next
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	195	fix q :: rat show "1 * q = q"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	196	by (cases q) (simp add: One_rat_def eq_rat)
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	197	next
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	198	fix q r s :: rat show "(q + r) + s = q + (r + s)"
29667 53103fc8ffa3 Replaced group_ and ring_simps by algebra_simps; nipkow parents: 29332 diff changeset	199	by (cases q, cases r, cases s) (simp add: eq_rat algebra_simps)
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	200	next
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	201	fix q r :: rat show "q + r = r + q"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	202	by (cases q, cases r) (simp add: eq_rat)
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	203	next
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	204	fix q :: rat show "0 + q = q"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	205	by (cases q) (simp add: Zero_rat_def eq_rat)
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	206	next
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	207	fix q :: rat show "- q + q = 0"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	208	by (cases q) (simp add: Zero_rat_def eq_rat)
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	209	next
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	210	fix q r :: rat show "q - r = q + - r"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	211	by (cases q, cases r) (simp add: eq_rat)
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	212	next
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	213	fix q r s :: rat show "(q + r) * s = q * s + r * s"
29667 53103fc8ffa3 Replaced group_ and ring_simps by algebra_simps; nipkow parents: 29332 diff changeset	214	by (cases q, cases r, cases s) (simp add: eq_rat algebra_simps)
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	215	next
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	216	show "(0::rat) \<noteq> 1" by (simp add: Zero_rat_def One_rat_def eq_rat)
27509 63161d5f8f29 rearrange instantiations huffman parents: 26732 diff changeset	217	qed
63161d5f8f29 rearrange instantiations huffman parents: 26732 diff changeset	218
63161d5f8f29 rearrange instantiations huffman parents: 26732 diff changeset	219	end
63161d5f8f29 rearrange instantiations huffman parents: 26732 diff changeset	220
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	221	lemma of_nat_rat: "of_nat k = Fract (of_nat k) 1"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	222	by (induct k) (simp_all add: Zero_rat_def One_rat_def)
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	223
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	224	lemma of_int_rat: "of_int k = Fract k 1"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	225	by (cases k rule: int_diff_cases) (simp add: of_nat_rat)
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	226
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	227	lemma Fract_of_nat_eq: "Fract (of_nat k) 1 = of_nat k"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	228	by (rule of_nat_rat [symmetric])
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	229
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	230	lemma Fract_of_int_eq: "Fract k 1 = of_int k"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	231	by (rule of_int_rat [symmetric])
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	232
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	233	lemma rat_number_collapse:
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	234	"Fract 0 k = 0"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	235	"Fract 1 1 = 1"
47108 2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	236	"Fract (numeral w) 1 = numeral w"
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	237	"Fract (neg_numeral w) 1 = neg_numeral w"
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	238	"Fract k 0 = 0"
47108 2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	239	using Fract_of_int_eq [of "numeral w"]
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	240	using Fract_of_int_eq [of "neg_numeral w"]
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	241	by (simp_all add: Zero_rat_def One_rat_def eq_rat)
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	242
47108 2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	243	lemma rat_number_expand:
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	244	"0 = Fract 0 1"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	245	"1 = Fract 1 1"
47108 2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	246	"numeral k = Fract (numeral k) 1"
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	247	"neg_numeral k = Fract (neg_numeral k) 1"
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	248	by (simp_all add: rat_number_collapse)
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	249
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	250	lemma Rat_cases_nonzero [case_names Fract 0]:
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	251	assumes Fract: "\<And>a b. q = Fract a b \<Longrightarrow> b > 0 \<Longrightarrow> a \<noteq> 0 \<Longrightarrow> coprime a b \<Longrightarrow> C"
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	252	assumes 0: "q = 0 \<Longrightarrow> C"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	253	shows C
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	254	proof (cases "q = 0")
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	255	case True then show C using 0 by auto
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	256	next
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	257	case False
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	258	then obtain a b where "q = Fract a b" and "b > 0" and "coprime a b" by (cases q) auto
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	259	moreover with False have "0 \<noteq> Fract a b" by simp
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	260	with `b > 0` have "a \<noteq> 0" by (simp add: Zero_rat_def eq_rat)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	261	with Fract `q = Fract a b` `b > 0` `coprime a b` show C by blast
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	262	qed
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	263
33805 0461a101e27e added Rene Thiemann's normalize function nipkow parents: 33209 diff changeset	264	subsubsection {* Function @{text normalize} *}
0461a101e27e added Rene Thiemann's normalize function nipkow parents: 33209 diff changeset	265
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	266	lemma Fract_coprime: "Fract (a div gcd a b) (b div gcd a b) = Fract a b"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	267	proof (cases "b = 0")
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	268	case True then show ?thesis by (simp add: eq_rat)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	269	next
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	270	case False
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	271	moreover have "b div gcd a b * gcd a b = b"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	272	by (rule dvd_div_mult_self) simp
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	273	ultimately have "b div gcd a b \<noteq> 0" by auto
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	274	with False show ?thesis by (simp add: eq_rat dvd_div_mult mult_commute [of a])
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	275	qed
33805 0461a101e27e added Rene Thiemann's normalize function nipkow parents: 33209 diff changeset	276
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	277	definition normalize :: "int \<times> int \<Rightarrow> int \<times> int" where
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	278	"normalize p = (if snd p > 0 then (let a = gcd (fst p) (snd p) in (fst p div a, snd p div a))
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	279	else if snd p = 0 then (0, 1)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	280	else (let a = - gcd (fst p) (snd p) in (fst p div a, snd p div a)))"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	281
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	282	lemma normalize_crossproduct:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	283	assumes "q \<noteq> 0" "s \<noteq> 0"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	284	assumes "normalize (p, q) = normalize (r, s)"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	285	shows "p * s = r * q"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	286	proof -
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	287	have aux: "p * gcd r s = sgn (q * s) * r * gcd p q \<Longrightarrow> q * gcd r s = sgn (q * s) * s * gcd p q \<Longrightarrow> p * s = q * r"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	288	proof -
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	289	assume "p * gcd r s = sgn (q * s) * r * gcd p q" and "q * gcd r s = sgn (q * s) * s * gcd p q"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	290	then have "(p * gcd r s) * (sgn (q * s) * s * gcd p q) = (q * gcd r s) * (sgn (q * s) * r * gcd p q)" by simp
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	291	with assms show "p * s = q * r" by (auto simp add: mult_ac sgn_times sgn_0_0)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	292	qed
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	293	from assms show ?thesis
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	294	by (auto simp add: normalize_def Let_def dvd_div_div_eq_mult mult_commute sgn_times split: if_splits intro: aux)
33805 0461a101e27e added Rene Thiemann's normalize function nipkow parents: 33209 diff changeset	295	qed
0461a101e27e added Rene Thiemann's normalize function nipkow parents: 33209 diff changeset	296
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	297	lemma normalize_eq: "normalize (a, b) = (p, q) \<Longrightarrow> Fract p q = Fract a b"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	298	by (auto simp add: normalize_def Let_def Fract_coprime dvd_div_neg rat_number_collapse
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	299	split:split_if_asm)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	300
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	301	lemma normalize_denom_pos: "normalize r = (p, q) \<Longrightarrow> q > 0"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	302	by (auto simp add: normalize_def Let_def dvd_div_neg pos_imp_zdiv_neg_iff nonneg1_imp_zdiv_pos_iff
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	303	split:split_if_asm)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	304
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	305	lemma normalize_coprime: "normalize r = (p, q) \<Longrightarrow> coprime p q"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	306	by (auto simp add: normalize_def Let_def dvd_div_neg div_gcd_coprime_int
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	307	split:split_if_asm)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	308
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	309	lemma normalize_stable [simp]:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	310	"q > 0 \<Longrightarrow> coprime p q \<Longrightarrow> normalize (p, q) = (p, q)"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	311	by (simp add: normalize_def)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	312
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	313	lemma normalize_denom_zero [simp]:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	314	"normalize (p, 0) = (0, 1)"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	315	by (simp add: normalize_def)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	316
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	317	lemma normalize_negative [simp]:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	318	"q < 0 \<Longrightarrow> normalize (p, q) = normalize (- p, - q)"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	319	by (simp add: normalize_def Let_def dvd_div_neg dvd_neg_div)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	320
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	321	text{*
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	322	Decompose a fraction into normalized, i.e. coprime numerator and denominator:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	323	*}
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	324
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	325	definition quotient_of :: "rat \<Rightarrow> int \<times> int" where
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	326	"quotient_of x = (THE pair. x = Fract (fst pair) (snd pair) &
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	327	snd pair > 0 & coprime (fst pair) (snd pair))"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	328
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	329	lemma quotient_of_unique:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	330	"\<exists>!p. r = Fract (fst p) (snd p) \<and> snd p > 0 \<and> coprime (fst p) (snd p)"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	331	proof (cases r)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	332	case (Fract a b)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	333	then have "r = Fract (fst (a, b)) (snd (a, b)) \<and> snd (a, b) > 0 \<and> coprime (fst (a, b)) (snd (a, b))" by auto
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	334	then show ?thesis proof (rule ex1I)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	335	fix p
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	336	obtain c d :: int where p: "p = (c, d)" by (cases p)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	337	assume "r = Fract (fst p) (snd p) \<and> snd p > 0 \<and> coprime (fst p) (snd p)"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	338	with p have Fract': "r = Fract c d" "d > 0" "coprime c d" by simp_all
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	339	have "c = a \<and> d = b"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	340	proof (cases "a = 0")
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	341	case True with Fract Fract' show ?thesis by (simp add: eq_rat)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	342	next
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	343	case False
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	344	with Fract Fract' have : "c b = a * d" and "c \<noteq> 0" by (auto simp add: eq_rat)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	345	then have "c * b > 0 \<longleftrightarrow> a * d > 0" by auto
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	346	with `b > 0` `d > 0` have "a > 0 \<longleftrightarrow> c > 0" by (simp add: zero_less_mult_iff)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	347	with `a \<noteq> 0` `c \<noteq> 0` have sgn: "sgn a = sgn c" by (auto simp add: not_less)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	348	from `coprime a b` `coprime c d` have "\<bar>a\<bar> * \<bar>d\<bar> = \<bar>c\<bar> * \<bar>b\<bar> \<longleftrightarrow> \<bar>a\<bar> = \<bar>c\<bar> \<and> \<bar>d\<bar> = \<bar>b\<bar>"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	349	by (simp add: coprime_crossproduct_int)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	350	with `b > 0` `d > 0` have "\<bar>a\<bar> * d = \<bar>c\<bar> * b \<longleftrightarrow> \<bar>a\<bar> = \<bar>c\<bar> \<and> d = b" by simp
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	351	then have "a * sgn a * d = c * sgn c * b \<longleftrightarrow> a * sgn a = c * sgn c \<and> d = b" by (simp add: abs_sgn)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	352	with sgn * show ?thesis by (auto simp add: sgn_0_0)
33805 0461a101e27e added Rene Thiemann's normalize function nipkow parents: 33209 diff changeset	353	qed
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	354	with p show "p = (a, b)" by simp
33805 0461a101e27e added Rene Thiemann's normalize function nipkow parents: 33209 diff changeset	355	qed
0461a101e27e added Rene Thiemann's normalize function nipkow parents: 33209 diff changeset	356	qed
0461a101e27e added Rene Thiemann's normalize function nipkow parents: 33209 diff changeset	357
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	358	lemma quotient_of_Fract [code]:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	359	"quotient_of (Fract a b) = normalize (a, b)"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	360	proof -
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	361	have "Fract a b = Fract (fst (normalize (a, b))) (snd (normalize (a, b)))" (is ?Fract)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	362	by (rule sym) (auto intro: normalize_eq)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	363	moreover have "0 < snd (normalize (a, b))" (is ?denom_pos)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	364	by (cases "normalize (a, b)") (rule normalize_denom_pos, simp)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	365	moreover have "coprime (fst (normalize (a, b))) (snd (normalize (a, b)))" (is ?coprime)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	366	by (rule normalize_coprime) simp
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	367	ultimately have "?Fract \<and> ?denom_pos \<and> ?coprime" by blast
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	368	with quotient_of_unique have
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	369	"(THE p. Fract a b = Fract (fst p) (snd p) \<and> 0 < snd p \<and> coprime (fst p) (snd p)) = normalize (a, b)"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	370	by (rule the1_equality)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	371	then show ?thesis by (simp add: quotient_of_def)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	372	qed
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	373
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	374	lemma quotient_of_number [simp]:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	375	"quotient_of 0 = (0, 1)"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	376	"quotient_of 1 = (1, 1)"
47108 2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	377	"quotient_of (numeral k) = (numeral k, 1)"
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	378	"quotient_of (neg_numeral k) = (neg_numeral k, 1)"
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	379	by (simp_all add: rat_number_expand quotient_of_Fract)
33805 0461a101e27e added Rene Thiemann's normalize function nipkow parents: 33209 diff changeset	380
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	381	lemma quotient_of_eq: "quotient_of (Fract a b) = (p, q) \<Longrightarrow> Fract p q = Fract a b"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	382	by (simp add: quotient_of_Fract normalize_eq)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	383
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	384	lemma quotient_of_denom_pos: "quotient_of r = (p, q) \<Longrightarrow> q > 0"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	385	by (cases r) (simp add: quotient_of_Fract normalize_denom_pos)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	386
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	387	lemma quotient_of_coprime: "quotient_of r = (p, q) \<Longrightarrow> coprime p q"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	388	by (cases r) (simp add: quotient_of_Fract normalize_coprime)
33805 0461a101e27e added Rene Thiemann's normalize function nipkow parents: 33209 diff changeset	389
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	390	lemma quotient_of_inject:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	391	assumes "quotient_of a = quotient_of b"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	392	shows "a = b"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	393	proof -
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	394	obtain p q r s where a: "a = Fract p q"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	395	and b: "b = Fract r s"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	396	and "q > 0" and "s > 0" by (cases a, cases b)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	397	with assms show ?thesis by (simp add: eq_rat quotient_of_Fract normalize_crossproduct)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	398	qed
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	399
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	400	lemma quotient_of_inject_eq:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	401	"quotient_of a = quotient_of b \<longleftrightarrow> a = b"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	402	by (auto simp add: quotient_of_inject)
33805 0461a101e27e added Rene Thiemann's normalize function nipkow parents: 33209 diff changeset	403
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	404
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	405	subsubsection {* The field of rational numbers *}
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	406
36409 d323e7773aa8 use new classes (linordered_)field_inverse_zero haftmann parents: 36349 diff changeset	407	instantiation rat :: field_inverse_zero
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	408	begin
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	409
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	410	definition
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	411	inverse_rat_def:
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	412	"inverse q = Abs_Rat (\<Union>x \<in> Rep_Rat q.
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	413	ratrel `` {if fst x = 0 then (0, 1) else (snd x, fst x)})"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	414
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	415	lemma inverse_rat [simp]: "inverse (Fract a b) = Fract b a"
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	416	proof -
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	417	have "(\<lambda>x. ratrel `` {if fst x = 0 then (0, 1) else (snd x, fst x)}) respects ratrel"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	418	by (auto simp add: congruent_def mult_commute)
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	419	then show ?thesis by (simp add: Fract_def inverse_rat_def UN_ratrel)
27509 63161d5f8f29 rearrange instantiations huffman parents: 26732 diff changeset	420	qed
63161d5f8f29 rearrange instantiations huffman parents: 26732 diff changeset	421
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	422	definition
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	423	divide_rat_def: "q / r = q * inverse (r::rat)"
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	424
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	425	lemma divide_rat [simp]: "Fract a b / Fract c d = Fract (a * d) (b * c)"
818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	426	by (simp add: divide_rat_def)
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	427
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	428	instance proof
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	429	fix q :: rat
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	430	assume "q \<noteq> 0"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	431	then show "inverse q * q = 1" by (cases q rule: Rat_cases_nonzero)
35216 7641e8d831d2 get rid of many duplicate simp rule warnings huffman parents: 35063 diff changeset	432	(simp_all add: rat_number_expand eq_rat)
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	433	next
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	434	fix q r :: rat
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	435	show "q / r = q * inverse r" by (simp add: divide_rat_def)
36415 a168ac750096 explicit is better than implicit haftmann parents: 36409 diff changeset	436	next
a168ac750096 explicit is better than implicit haftmann parents: 36409 diff changeset	437	show "inverse 0 = (0::rat)" by (simp add: rat_number_expand, simp add: rat_number_collapse)
a168ac750096 explicit is better than implicit haftmann parents: 36409 diff changeset	438	qed
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	439
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	440	end
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	441
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	442
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	443	subsubsection {* Various *}
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	444
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	445	lemma Fract_of_int_quotient: "Fract k l = of_int k / of_int l"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	446	by (simp add: Fract_of_int_eq [symmetric])
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	447
47108 2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	448	lemma Fract_add_one: "n \<noteq> 0 ==> Fract (m + n) n = Fract m n + 1"
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	449	by (simp add: rat_number_expand)
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	450
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	451
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	452	subsubsection {* The ordered field of rational numbers *}
27509 63161d5f8f29 rearrange instantiations huffman parents: 26732 diff changeset	453
63161d5f8f29 rearrange instantiations huffman parents: 26732 diff changeset	454	instantiation rat :: linorder
63161d5f8f29 rearrange instantiations huffman parents: 26732 diff changeset	455	begin
63161d5f8f29 rearrange instantiations huffman parents: 26732 diff changeset	456
63161d5f8f29 rearrange instantiations huffman parents: 26732 diff changeset	457	definition
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	458	le_rat_def:
39910 10097e0a9dbd constant `contents` renamed to `the_elem` haftmann parents: 38857 diff changeset	459	"q \<le> r \<longleftrightarrow> the_elem (\<Union>x \<in> Rep_Rat q. \<Union>y \<in> Rep_Rat r.
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	460	{(fst x * snd y) * (snd x * snd y) \<le> (fst y * snd x) * (snd x * snd y)})"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	461
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	462	lemma le_rat [simp]:
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	463	assumes "b \<noteq> 0" and "d \<noteq> 0"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	464	shows "Fract a b \<le> Fract c d \<longleftrightarrow> (a * d) * (b * d) \<le> (c * b) * (b * d)"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	465	proof -
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	466	have "(\<lambda>x y. {(fst x * snd y) * (snd x * snd y) \<le> (fst y * snd x) * (snd x * snd y)})
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	467	respects2 ratrel"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	468	proof (clarsimp simp add: congruent2_def)
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	469	fix a b a' b' c d c' d'::int
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	470	assume neq: "b \<noteq> 0" "b' \<noteq> 0" "d \<noteq> 0" "d' \<noteq> 0"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	471	assume eq1: "a * b' = a' * b"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	472	assume eq2: "c * d' = c' * d"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	473
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	474	let ?le = "\<lambda>a b c d. ((a * d) * (b * d) \<le> (c * b) * (b * d))"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	475	{
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	476	fix a b c d x :: int assume x: "x \<noteq> 0"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	477	have "?le a b c d = ?le (a * x) (b * x) c d"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	478	proof -
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	479	from x have "0 < x * x" by (auto simp add: zero_less_mult_iff)
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	480	hence "?le a b c d =
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	481	((a * d) * (b * d) * (x * x) \<le> (c * b) * (b * d) * (x * x))"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	482	by (simp add: mult_le_cancel_right)
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	483	also have "... = ?le (a * x) (b * x) c d"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	484	by (simp add: mult_ac)
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	485	finally show ?thesis .
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	486	qed
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	487	} note le_factor = this
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	488
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	489	let ?D = "b * d" and ?D' = "b' * d'"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	490	from neq have D: "?D \<noteq> 0" by simp
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	491	from neq have "?D' \<noteq> 0" by simp
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	492	hence "?le a b c d = ?le (a * ?D') (b * ?D') c d"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	493	by (rule le_factor)
27668 6eb20b2cecf8 Tuned and simplified proofs chaieb parents: 27652 diff changeset	494	also have "... = ((a * b') * ?D * ?D' * d * d' \<le> (c * d') * ?D * ?D' * b * b')"
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	495	by (simp add: mult_ac)
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	496	also have "... = ((a' * b) * ?D * ?D' * d * d' \<le> (c' * d) * ?D * ?D' * b * b')"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	497	by (simp only: eq1 eq2)
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	498	also have "... = ?le (a' * ?D) (b' * ?D) c' d'"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	499	by (simp add: mult_ac)
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	500	also from D have "... = ?le a' b' c' d'"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	501	by (rule le_factor [symmetric])
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	502	finally show "?le a b c d = ?le a' b' c' d'" .
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	503	qed
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	504	with assms show ?thesis by (simp add: Fract_def le_rat_def UN_ratrel2)
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	505	qed
27509 63161d5f8f29 rearrange instantiations huffman parents: 26732 diff changeset	506
63161d5f8f29 rearrange instantiations huffman parents: 26732 diff changeset	507	definition
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	508	less_rat_def: "z < (w::rat) \<longleftrightarrow> z \<le> w \<and> z \<noteq> w"
27509 63161d5f8f29 rearrange instantiations huffman parents: 26732 diff changeset	509
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	510	lemma less_rat [simp]:
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	511	assumes "b \<noteq> 0" and "d \<noteq> 0"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	512	shows "Fract a b < Fract c d \<longleftrightarrow> (a * d) * (b * d) < (c * b) * (b * d)"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	513	using assms by (simp add: less_rat_def eq_rat order_less_le)
27509 63161d5f8f29 rearrange instantiations huffman parents: 26732 diff changeset	514
63161d5f8f29 rearrange instantiations huffman parents: 26732 diff changeset	515	instance proof
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	516	fix q r s :: rat
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	517	{
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	518	assume "q \<le> r" and "r \<le> s"
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	519	then show "q \<le> s"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	520	proof (induct q, induct r, induct s)
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	521	fix a b c d e f :: int
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	522	assume neq: "b > 0" "d > 0" "f > 0"
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	523	assume 1: "Fract a b \<le> Fract c d" and 2: "Fract c d \<le> Fract e f"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	524	show "Fract a b \<le> Fract e f"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	525	proof -
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	526	from neq obtain bb: "0 < b * b" and dd: "0 < d * d" and ff: "0 < f * f"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	527	by (auto simp add: zero_less_mult_iff linorder_neq_iff)
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	528	have "(a * d) * (b * d) * (f * f) \<le> (c * b) * (b * d) * (f * f)"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	529	proof -
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	530	from neq 1 have "(a * d) * (b * d) \<le> (c * b) * (b * d)"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	531	by simp
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	532	with ff show ?thesis by (simp add: mult_le_cancel_right)
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	533	qed
27668 6eb20b2cecf8 Tuned and simplified proofs chaieb parents: 27652 diff changeset	534	also have "... = (c * f) * (d * f) * (b * b)" by algebra
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	535	also have "... \<le> (e * d) * (d * f) * (b * b)"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	536	proof -
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	537	from neq 2 have "(c * f) * (d * f) \<le> (e * d) * (d * f)"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	538	by simp
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	539	with bb show ?thesis by (simp add: mult_le_cancel_right)
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	540	qed
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	541	finally have "(a * f) * (b * f) * (d * d) \<le> e * b * (b * f) * (d * d)"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	542	by (simp only: mult_ac)
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	543	with dd have "(a * f) * (b * f) \<le> (e * b) * (b * f)"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	544	by (simp add: mult_le_cancel_right)
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	545	with neq show ?thesis by simp
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	546	qed
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	547	qed
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	548	next
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	549	assume "q \<le> r" and "r \<le> q"
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	550	then show "q = r"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	551	proof (induct q, induct r)
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	552	fix a b c d :: int
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	553	assume neq: "b > 0" "d > 0"
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	554	assume 1: "Fract a b \<le> Fract c d" and 2: "Fract c d \<le> Fract a b"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	555	show "Fract a b = Fract c d"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	556	proof -
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	557	from neq 1 have "(a * d) * (b * d) \<le> (c * b) * (b * d)"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	558	by simp
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	559	also have "... \<le> (a * d) * (b * d)"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	560	proof -
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	561	from neq 2 have "(c * b) * (d * b) \<le> (a * d) * (d * b)"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	562	by simp
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	563	thus ?thesis by (simp only: mult_ac)
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	564	qed
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	565	finally have "(a * d) * (b * d) = (c * b) * (b * d)" .
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	566	moreover from neq have "b * d \<noteq> 0" by simp
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	567	ultimately have "a * d = c * b" by simp
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	568	with neq show ?thesis by (simp add: eq_rat)
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	569	qed
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	570	qed
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	571	next
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	572	show "q \<le> q"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	573	by (induct q) simp
27682 25aceefd4786 added class preorder haftmann parents: 27668 diff changeset	574	show "(q < r) = (q \<le> r \<and> \<not> r \<le> q)"
25aceefd4786 added class preorder haftmann parents: 27668 diff changeset	575	by (induct q, induct r) (auto simp add: le_less mult_commute)
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	576	show "q \<le> r \<or> r \<le> q"
18913 57f19fad8c2a reimplemented using Equiv_Relations.thy huffman parents: 18372 diff changeset	577	by (induct q, induct r)
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	578	(simp add: mult_commute, rule linorder_linear)
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	579	}
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	580	qed
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	581
27509 63161d5f8f29 rearrange instantiations huffman parents: 26732 diff changeset	582	end
63161d5f8f29 rearrange instantiations huffman parents: 26732 diff changeset	583
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	584	instantiation rat :: "{distrib_lattice, abs_if, sgn_if}"
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25502 diff changeset	585	begin
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25502 diff changeset	586
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25502 diff changeset	587	definition
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	588	abs_rat_def: "\<bar>q\<bar> = (if q < 0 then -q else (q::rat))"
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	589
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	590	lemma abs_rat [simp, code]: "\<bar>Fract a b\<bar> = Fract \<bar>a\<bar> \<bar>b\<bar>"
35216 7641e8d831d2 get rid of many duplicate simp rule warnings huffman parents: 35063 diff changeset	591	by (auto simp add: abs_rat_def zabs_def Zero_rat_def not_less le_less eq_rat zero_less_mult_iff)
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	592
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	593	definition
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	594	sgn_rat_def: "sgn (q::rat) = (if q = 0 then 0 else if 0 < q then 1 else - 1)"
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	595
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	596	lemma sgn_rat [simp, code]: "sgn (Fract a b) = of_int (sgn a * sgn b)"
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	597	unfolding Fract_of_int_eq
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	598	by (auto simp: zsgn_def sgn_rat_def Zero_rat_def eq_rat)
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	599	(auto simp: rat_number_collapse not_less le_less zero_less_mult_iff)
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	600
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	601	definition
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25502 diff changeset	602	"(inf \<Colon> rat \<Rightarrow> rat \<Rightarrow> rat) = min"
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25502 diff changeset	603
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25502 diff changeset	604	definition
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25502 diff changeset	605	"(sup \<Colon> rat \<Rightarrow> rat \<Rightarrow> rat) = max"
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25502 diff changeset	606
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	607	instance by intro_classes
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	608	(auto simp add: abs_rat_def sgn_rat_def min_max.sup_inf_distrib1 inf_rat_def sup_rat_def)
22456 6070e48ecb78 added lattice definitions haftmann parents: 21404 diff changeset	609
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25502 diff changeset	610	end
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25502 diff changeset	611
36409 d323e7773aa8 use new classes (linordered_)field_inverse_zero haftmann parents: 36349 diff changeset	612	instance rat :: linordered_field_inverse_zero
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	613	proof
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	614	fix q r s :: rat
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	615	show "q \<le> r ==> s + q \<le> s + r"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	616	proof (induct q, induct r, induct s)
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	617	fix a b c d e f :: int
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	618	assume neq: "b > 0" "d > 0" "f > 0"
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	619	assume le: "Fract a b \<le> Fract c d"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	620	show "Fract e f + Fract a b \<le> Fract e f + Fract c d"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	621	proof -
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	622	let ?F = "f * f" from neq have F: "0 < ?F"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	623	by (auto simp add: zero_less_mult_iff)
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	624	from neq le have "(a * d) * (b * d) \<le> (c * b) * (b * d)"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	625	by simp
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	626	with F have "(a * d) * (b * d) * ?F * ?F \<le> (c * b) * (b * d) * ?F * ?F"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	627	by (simp add: mult_le_cancel_right)
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	628	with neq show ?thesis by (simp add: mult_ac int_distrib)
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	629	qed
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	630	qed
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	631	show "q < r ==> 0 < s ==> s * q < s * r"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	632	proof (induct q, induct r, induct s)
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	633	fix a b c d e f :: int
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	634	assume neq: "b > 0" "d > 0" "f > 0"
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	635	assume le: "Fract a b < Fract c d"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	636	assume gt: "0 < Fract e f"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	637	show "Fract e f * Fract a b < Fract e f * Fract c d"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	638	proof -
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	639	let ?E = "e * f" and ?F = "f * f"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	640	from neq gt have "0 < ?E"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	641	by (auto simp add: Zero_rat_def order_less_le eq_rat)
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	642	moreover from neq have "0 < ?F"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	643	by (auto simp add: zero_less_mult_iff)
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	644	moreover from neq le have "(a * d) * (b * d) < (c * b) * (b * d)"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	645	by simp
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	646	ultimately have "(a * d) * (b * d) * ?E * ?F < (c * b) * (b * d) * ?E * ?F"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	647	by (simp add: mult_less_cancel_right)
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	648	with neq show ?thesis
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	649	by (simp add: mult_ac)
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	650	qed
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	651	qed
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	652	qed auto
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	653
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	654	lemma Rat_induct_pos [case_names Fract, induct type: rat]:
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	655	assumes step: "\<And>a b. 0 < b \<Longrightarrow> P (Fract a b)"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	656	shows "P q"
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	657	proof (cases q)
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	658	have step': "\<And>a b. b < 0 \<Longrightarrow> P (Fract a b)"
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	659	proof -
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	660	fix a::int and b::int
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	661	assume b: "b < 0"
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	662	hence "0 < -b" by simp
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	663	hence "P (Fract (-a) (-b))" by (rule step)
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	664	thus "P (Fract a b)" by (simp add: order_less_imp_not_eq [OF b])
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	665	qed
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	666	case (Fract a b)
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	667	thus "P q" by (force simp add: linorder_neq_iff step step')
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	668	qed
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	669
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	670	lemma zero_less_Fract_iff:
30095 c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	671	"0 < b \<Longrightarrow> 0 < Fract a b \<longleftrightarrow> 0 < a"
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	672	by (simp add: Zero_rat_def zero_less_mult_iff)
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	673
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	674	lemma Fract_less_zero_iff:
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	675	"0 < b \<Longrightarrow> Fract a b < 0 \<longleftrightarrow> a < 0"
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	676	by (simp add: Zero_rat_def mult_less_0_iff)
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	677
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	678	lemma zero_le_Fract_iff:
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	679	"0 < b \<Longrightarrow> 0 \<le> Fract a b \<longleftrightarrow> 0 \<le> a"
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	680	by (simp add: Zero_rat_def zero_le_mult_iff)
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	681
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	682	lemma Fract_le_zero_iff:
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	683	"0 < b \<Longrightarrow> Fract a b \<le> 0 \<longleftrightarrow> a \<le> 0"
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	684	by (simp add: Zero_rat_def mult_le_0_iff)
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	685
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	686	lemma one_less_Fract_iff:
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	687	"0 < b \<Longrightarrow> 1 < Fract a b \<longleftrightarrow> b < a"
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	688	by (simp add: One_rat_def mult_less_cancel_right_disj)
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	689
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	690	lemma Fract_less_one_iff:
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	691	"0 < b \<Longrightarrow> Fract a b < 1 \<longleftrightarrow> a < b"
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	692	by (simp add: One_rat_def mult_less_cancel_right_disj)
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	693
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	694	lemma one_le_Fract_iff:
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	695	"0 < b \<Longrightarrow> 1 \<le> Fract a b \<longleftrightarrow> b \<le> a"
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	696	by (simp add: One_rat_def mult_le_cancel_right)
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	697
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	698	lemma Fract_le_one_iff:
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	699	"0 < b \<Longrightarrow> Fract a b \<le> 1 \<longleftrightarrow> a \<le> b"
c6e184561159 add lemmas about comparisons of Fract a b with 0 and 1 huffman parents: 29940 diff changeset	700	by (simp add: One_rat_def mult_le_cancel_right)
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: diff changeset	701
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	702
30097 57df8626c23b generalize floor/ceiling to work with real and rat; rename floor_mono2 to floor_mono huffman parents: 30095 diff changeset	703	subsubsection {* Rationals are an Archimedean field *}
57df8626c23b generalize floor/ceiling to work with real and rat; rename floor_mono2 to floor_mono huffman parents: 30095 diff changeset	704
57df8626c23b generalize floor/ceiling to work with real and rat; rename floor_mono2 to floor_mono huffman parents: 30095 diff changeset	705	lemma rat_floor_lemma:
57df8626c23b generalize floor/ceiling to work with real and rat; rename floor_mono2 to floor_mono huffman parents: 30095 diff changeset	706	shows "of_int (a div b) \<le> Fract a b \<and> Fract a b < of_int (a div b + 1)"
57df8626c23b generalize floor/ceiling to work with real and rat; rename floor_mono2 to floor_mono huffman parents: 30095 diff changeset	707	proof -
57df8626c23b generalize floor/ceiling to work with real and rat; rename floor_mono2 to floor_mono huffman parents: 30095 diff changeset	708	have "Fract a b = of_int (a div b) + Fract (a mod b) b"
35293 06a98796453e remove unneeded premise from rat_floor_lemma and floor_Fract huffman parents: 35216 diff changeset	709	by (cases "b = 0", simp, simp add: of_int_rat)
30097 57df8626c23b generalize floor/ceiling to work with real and rat; rename floor_mono2 to floor_mono huffman parents: 30095 diff changeset	710	moreover have "0 \<le> Fract (a mod b) b \<and> Fract (a mod b) b < 1"
35293 06a98796453e remove unneeded premise from rat_floor_lemma and floor_Fract huffman parents: 35216 diff changeset	711	unfolding Fract_of_int_quotient
36409 d323e7773aa8 use new classes (linordered_)field_inverse_zero haftmann parents: 36349 diff changeset	712	by (rule linorder_cases [of b 0]) (simp add: divide_nonpos_neg, simp, simp add: divide_nonneg_pos)
30097 57df8626c23b generalize floor/ceiling to work with real and rat; rename floor_mono2 to floor_mono huffman parents: 30095 diff changeset	713	ultimately show ?thesis by simp
57df8626c23b generalize floor/ceiling to work with real and rat; rename floor_mono2 to floor_mono huffman parents: 30095 diff changeset	714	qed
57df8626c23b generalize floor/ceiling to work with real and rat; rename floor_mono2 to floor_mono huffman parents: 30095 diff changeset	715
57df8626c23b generalize floor/ceiling to work with real and rat; rename floor_mono2 to floor_mono huffman parents: 30095 diff changeset	716	instance rat :: archimedean_field
57df8626c23b generalize floor/ceiling to work with real and rat; rename floor_mono2 to floor_mono huffman parents: 30095 diff changeset	717	proof
57df8626c23b generalize floor/ceiling to work with real and rat; rename floor_mono2 to floor_mono huffman parents: 30095 diff changeset	718	fix r :: rat
57df8626c23b generalize floor/ceiling to work with real and rat; rename floor_mono2 to floor_mono huffman parents: 30095 diff changeset	719	show "\<exists>z. r \<le> of_int z"
57df8626c23b generalize floor/ceiling to work with real and rat; rename floor_mono2 to floor_mono huffman parents: 30095 diff changeset	720	proof (induct r)
57df8626c23b generalize floor/ceiling to work with real and rat; rename floor_mono2 to floor_mono huffman parents: 30095 diff changeset	721	case (Fract a b)
35293 06a98796453e remove unneeded premise from rat_floor_lemma and floor_Fract huffman parents: 35216 diff changeset	722	have "Fract a b \<le> of_int (a div b + 1)"
06a98796453e remove unneeded premise from rat_floor_lemma and floor_Fract huffman parents: 35216 diff changeset	723	using rat_floor_lemma [of a b] by simp
30097 57df8626c23b generalize floor/ceiling to work with real and rat; rename floor_mono2 to floor_mono huffman parents: 30095 diff changeset	724	then show "\<exists>z. Fract a b \<le> of_int z" ..
57df8626c23b generalize floor/ceiling to work with real and rat; rename floor_mono2 to floor_mono huffman parents: 30095 diff changeset	725	qed
57df8626c23b generalize floor/ceiling to work with real and rat; rename floor_mono2 to floor_mono huffman parents: 30095 diff changeset	726	qed
57df8626c23b generalize floor/ceiling to work with real and rat; rename floor_mono2 to floor_mono huffman parents: 30095 diff changeset	727
43732 6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	728	instantiation rat :: floor_ceiling
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	729	begin
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	730
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	731	definition [code del]:
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	732	"floor (x::rat) = (THE z. of_int z \<le> x \<and> x < of_int (z + 1))"
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	733
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	734	instance proof
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	735	fix x :: rat
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	736	show "of_int (floor x) \<le> x \<and> x < of_int (floor x + 1)"
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	737	unfolding floor_rat_def using floor_exists1 by (rule theI')
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	738	qed
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	739
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	740	end
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	741
35293 06a98796453e remove unneeded premise from rat_floor_lemma and floor_Fract huffman parents: 35216 diff changeset	742	lemma floor_Fract: "floor (Fract a b) = a div b"
06a98796453e remove unneeded premise from rat_floor_lemma and floor_Fract huffman parents: 35216 diff changeset	743	using rat_floor_lemma [of a b]
30097 57df8626c23b generalize floor/ceiling to work with real and rat; rename floor_mono2 to floor_mono huffman parents: 30095 diff changeset	744	by (simp add: floor_unique)
57df8626c23b generalize floor/ceiling to work with real and rat; rename floor_mono2 to floor_mono huffman parents: 30095 diff changeset	745
57df8626c23b generalize floor/ceiling to work with real and rat; rename floor_mono2 to floor_mono huffman parents: 30095 diff changeset	746
31100 6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 31021 diff changeset	747	subsection {* Linear arithmetic setup *}
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	748
31100 6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 31021 diff changeset	749	declaration {*
6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 31021 diff changeset	750	K (Lin_Arith.add_inj_thms [@{thm of_nat_le_iff} RS iffD2, @{thm of_nat_eq_iff} RS iffD2]
6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 31021 diff changeset	751	(* not needed because x < (y::nat) can be rewritten as Suc x <= y: of_nat_less_iff RS iffD2 *)
6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 31021 diff changeset	752	#> Lin_Arith.add_inj_thms [@{thm of_int_le_iff} RS iffD2, @{thm of_int_eq_iff} RS iffD2]
6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 31021 diff changeset	753	(* not needed because x < (y::int) can be rewritten as x + 1 <= y: of_int_less_iff RS iffD2 *)
6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 31021 diff changeset	754	#> Lin_Arith.add_simps [@{thm neg_less_iff_less},
6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 31021 diff changeset	755	@{thm True_implies_equals},
47108 2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	756	read_instantiate @{context} [(("a", 0), "(numeral ?v)")] @{thm right_distrib},
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	757	read_instantiate @{context} [(("a", 0), "(neg_numeral ?v)")] @{thm right_distrib},
31100 6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 31021 diff changeset	758	@{thm divide_1}, @{thm divide_zero_left},
6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 31021 diff changeset	759	@{thm times_divide_eq_right}, @{thm times_divide_eq_left},
6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 31021 diff changeset	760	@{thm minus_divide_left} RS sym, @{thm minus_divide_right} RS sym,
6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 31021 diff changeset	761	@{thm of_int_minus}, @{thm of_int_diff},
6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 31021 diff changeset	762	@{thm of_int_of_nat_eq}]
6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 31021 diff changeset	763	#> Lin_Arith.add_simprocs Numeral_Simprocs.field_cancel_numeral_factors
6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 31021 diff changeset	764	#> Lin_Arith.add_inj_const (@{const_name of_nat}, @{typ "nat => rat"})
6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 31021 diff changeset	765	#> Lin_Arith.add_inj_const (@{const_name of_int}, @{typ "int => rat"}))
6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 31021 diff changeset	766	*}
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	767
23342 0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	768
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	769	subsection {* Embedding from Rationals to other Fields *}
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	770
24198 4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	771	class field_char_0 = field + ring_char_0
23342 0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	772
35028 108662d50512 more consistent naming of type classes involving orderings (and lattices) -- c.f. NEWS haftmann parents: 33814 diff changeset	773	subclass (in linordered_field) field_char_0 ..
23342 0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	774
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	775	context field_char_0
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	776	begin
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	777
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	778	definition of_rat :: "rat \<Rightarrow> 'a" where
39910 10097e0a9dbd constant `contents` renamed to `the_elem` haftmann parents: 38857 diff changeset	779	"of_rat q = the_elem (\<Union>(a,b) \<in> Rep_Rat q. {of_int a / of_int b})"
23342 0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	780
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	781	end
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	782
23342 0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	783	lemma of_rat_congruent:
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	784	"(\<lambda>(a, b). {of_int a / of_int b :: 'a::field_char_0}) respects ratrel"
40816 19c492929756 replaced slightly odd locale congruent by plain definition haftmann parents: 40815 diff changeset	785	apply (rule congruentI)
23342 0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	786	apply (clarsimp simp add: nonzero_divide_eq_eq nonzero_eq_divide_eq)
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	787	apply (simp only: of_int_mult [symmetric])
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	788	done
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	789
27551 9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	790	lemma of_rat_rat: "b \<noteq> 0 \<Longrightarrow> of_rat (Fract a b) = of_int a / of_int b"
9a5543d4cc24 Fract now total; improved code generator setup haftmann parents: 27509 diff changeset	791	unfolding Fract_def of_rat_def by (simp add: UN_ratrel of_rat_congruent)
23342 0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	792
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	793	lemma of_rat_0 [simp]: "of_rat 0 = 0"
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	794	by (simp add: Zero_rat_def of_rat_rat)
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	795
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	796	lemma of_rat_1 [simp]: "of_rat 1 = 1"
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	797	by (simp add: One_rat_def of_rat_rat)
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	798
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	799	lemma of_rat_add: "of_rat (a + b) = of_rat a + of_rat b"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	800	by (induct a, induct b, simp add: of_rat_rat add_frac_eq)
23342 0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	801
23343 6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	802	lemma of_rat_minus: "of_rat (- a) = - of_rat a"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	803	by (induct a, simp add: of_rat_rat)
23343 6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	804
6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	805	lemma of_rat_diff: "of_rat (a - b) = of_rat a - of_rat b"
6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	806	by (simp only: diff_minus of_rat_add of_rat_minus)
6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	807
23342 0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	808	lemma of_rat_mult: "of_rat (a * b) = of_rat a * of_rat b"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	809	apply (induct a, induct b, simp add: of_rat_rat)
23342 0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	810	apply (simp add: divide_inverse nonzero_inverse_mult_distrib mult_ac)
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	811	done
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	812
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	813	lemma nonzero_of_rat_inverse:
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	814	"a \<noteq> 0 \<Longrightarrow> of_rat (inverse a) = inverse (of_rat a)"
23343 6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	815	apply (rule inverse_unique [symmetric])
6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	816	apply (simp add: of_rat_mult [symmetric])
23342 0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	817	done
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	818
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	819	lemma of_rat_inverse:
36409 d323e7773aa8 use new classes (linordered_)field_inverse_zero haftmann parents: 36349 diff changeset	820	"(of_rat (inverse a)::'a::{field_char_0, field_inverse_zero}) =
23342 0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	821	inverse (of_rat a)"
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	822	by (cases "a = 0", simp_all add: nonzero_of_rat_inverse)
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	823
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	824	lemma nonzero_of_rat_divide:
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	825	"b \<noteq> 0 \<Longrightarrow> of_rat (a / b) = of_rat a / of_rat b"
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	826	by (simp add: divide_inverse of_rat_mult nonzero_of_rat_inverse)
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	827
0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	828	lemma of_rat_divide:
36409 d323e7773aa8 use new classes (linordered_)field_inverse_zero haftmann parents: 36349 diff changeset	829	"(of_rat (a / b)::'a::{field_char_0, field_inverse_zero})
23342 0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	830	= of_rat a / of_rat b"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	831	by (cases "b = 0") (simp_all add: nonzero_of_rat_divide)
23342 0261d2da0b1c add function of_rat and related lemmas huffman parents: 22456 diff changeset	832
23343 6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	833	lemma of_rat_power:
31017 2c227493ea56 stripped class recpower further haftmann parents: 30960 diff changeset	834	"(of_rat (a ^ n)::'a::field_char_0) = of_rat a ^ n"
30273 ecd6f0ca62ea declare power_Suc [simp]; remove redundant type-specific versions of power_Suc huffman parents: 30242 diff changeset	835	by (induct n) (simp_all add: of_rat_mult)
23343 6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	836
6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	837	lemma of_rat_eq_iff [simp]: "(of_rat a = of_rat b) = (a = b)"
6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	838	apply (induct a, induct b)
6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	839	apply (simp add: of_rat_rat eq_rat)
6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	840	apply (simp add: nonzero_divide_eq_eq nonzero_eq_divide_eq)
6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	841	apply (simp only: of_int_mult [symmetric] of_int_eq_iff)
6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	842	done
6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	843
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	844	lemma of_rat_less:
35028 108662d50512 more consistent naming of type classes involving orderings (and lattices) -- c.f. NEWS haftmann parents: 33814 diff changeset	845	"(of_rat r :: 'a::linordered_field) < of_rat s \<longleftrightarrow> r < s"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	846	proof (induct r, induct s)
818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	847	fix a b c d :: int
818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	848	assume not_zero: "b > 0" "d > 0"
818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	849	then have "b * d > 0" by (rule mult_pos_pos)
818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	850	have of_int_divide_less_eq:
818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	851	"(of_int a :: 'a) / of_int b < of_int c / of_int d
818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	852	\<longleftrightarrow> (of_int a :: 'a) * of_int d < of_int c * of_int b"
818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	853	using not_zero by (simp add: pos_less_divide_eq pos_divide_less_eq)
35028 108662d50512 more consistent naming of type classes involving orderings (and lattices) -- c.f. NEWS haftmann parents: 33814 diff changeset	854	show "(of_rat (Fract a b) :: 'a::linordered_field) < of_rat (Fract c d)
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	855	\<longleftrightarrow> Fract a b < Fract c d"
818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	856	using not_zero `b * d > 0`
818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	857	by (simp add: of_rat_rat of_int_divide_less_eq of_int_mult [symmetric] del: of_int_mult)
818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	858	qed
818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	859
818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	860	lemma of_rat_less_eq:
35028 108662d50512 more consistent naming of type classes involving orderings (and lattices) -- c.f. NEWS haftmann parents: 33814 diff changeset	861	"(of_rat r :: 'a::linordered_field) \<le> of_rat s \<longleftrightarrow> r \<le> s"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	862	unfolding le_less by (auto simp add: of_rat_less)
818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	863
23343 6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	864	lemmas of_rat_eq_0_iff [simp] = of_rat_eq_iff [of _ 0, simplified]
6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	865
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	866	lemma of_rat_eq_id [simp]: "of_rat = id"
23343 6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	867	proof
6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	868	fix a
6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	869	show "of_rat a = id a"
6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	870	by (induct a)
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	871	(simp add: of_rat_rat Fract_of_int_eq [symmetric])
23343 6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	872	qed
6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	873
6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	874	text{Collapse nested embeddings}
6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	875	lemma of_rat_of_nat_eq [simp]: "of_rat (of_nat n) = of_nat n"
6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	876	by (induct n) (simp_all add: of_rat_add)
6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	877
6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	878	lemma of_rat_of_int_eq [simp]: "of_rat (of_int z) = of_int z"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	879	by (cases z rule: int_diff_cases) (simp add: of_rat_diff)
23343 6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	880
47108 2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	881	lemma of_rat_numeral_eq [simp]:
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	882	"of_rat (numeral w) = numeral w"
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	883	using of_rat_of_int_eq [of "numeral w"] by simp
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	884
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	885	lemma of_rat_neg_numeral_eq [simp]:
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	886	"of_rat (neg_numeral w) = neg_numeral w"
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	887	using of_rat_of_int_eq [of "neg_numeral w"] by simp
23343 6a83ca5fe282 more of_rat lemmas huffman parents: 23342 diff changeset	888
23879 4776af8be741 split class abs from class minus haftmann parents: 23429 diff changeset	889	lemmas zero_rat = Zero_rat_def
4776af8be741 split class abs from class minus haftmann parents: 23429 diff changeset	890	lemmas one_rat = One_rat_def
4776af8be741 split class abs from class minus haftmann parents: 23429 diff changeset	891
24198 4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	892	abbreviation
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	893	rat_of_nat :: "nat \<Rightarrow> rat"
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	894	where
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	895	"rat_of_nat \<equiv> of_nat"
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	896
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	897	abbreviation
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	898	rat_of_int :: "int \<Rightarrow> rat"
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	899	where
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	900	"rat_of_int \<equiv> of_int"
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	901
28010 8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	902	subsection {* The Set of Rational Numbers *}
24533 fe1f93f6a15a Added code generator setup (taken from Library/Executable_Rat.thy, berghofe parents: 24506 diff changeset	903
28001 4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27682 diff changeset	904	context field_char_0
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27682 diff changeset	905	begin
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27682 diff changeset	906
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27682 diff changeset	907	definition
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27682 diff changeset	908	Rats :: "'a set" where
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	909	"Rats = range of_rat"
28001 4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27682 diff changeset	910
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27682 diff changeset	911	notation (xsymbols)
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27682 diff changeset	912	Rats ("\<rat>")
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27682 diff changeset	913
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27682 diff changeset	914	end
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27682 diff changeset	915
28010 8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	916	lemma Rats_of_rat [simp]: "of_rat r \<in> Rats"
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	917	by (simp add: Rats_def)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	918
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	919	lemma Rats_of_int [simp]: "of_int z \<in> Rats"
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	920	by (subst of_rat_of_int_eq [symmetric], rule Rats_of_rat)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	921
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	922	lemma Rats_of_nat [simp]: "of_nat n \<in> Rats"
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	923	by (subst of_rat_of_nat_eq [symmetric], rule Rats_of_rat)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	924
47108 2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	925	lemma Rats_number_of [simp]: "numeral w \<in> Rats"
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	926	by (subst of_rat_numeral_eq [symmetric], rule Rats_of_rat)
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	927
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	928	lemma Rats_neg_number_of [simp]: "neg_numeral w \<in> Rats"
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	929	by (subst of_rat_neg_numeral_eq [symmetric], rule Rats_of_rat)
28010 8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	930
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	931	lemma Rats_0 [simp]: "0 \<in> Rats"
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	932	apply (unfold Rats_def)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	933	apply (rule range_eqI)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	934	apply (rule of_rat_0 [symmetric])
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	935	done
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	936
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	937	lemma Rats_1 [simp]: "1 \<in> Rats"
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	938	apply (unfold Rats_def)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	939	apply (rule range_eqI)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	940	apply (rule of_rat_1 [symmetric])
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	941	done
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	942
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	943	lemma Rats_add [simp]: "\<lbrakk>a \<in> Rats; b \<in> Rats\<rbrakk> \<Longrightarrow> a + b \<in> Rats"
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	944	apply (auto simp add: Rats_def)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	945	apply (rule range_eqI)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	946	apply (rule of_rat_add [symmetric])
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	947	done
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	948
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	949	lemma Rats_minus [simp]: "a \<in> Rats \<Longrightarrow> - a \<in> Rats"
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	950	apply (auto simp add: Rats_def)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	951	apply (rule range_eqI)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	952	apply (rule of_rat_minus [symmetric])
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	953	done
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	954
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	955	lemma Rats_diff [simp]: "\<lbrakk>a \<in> Rats; b \<in> Rats\<rbrakk> \<Longrightarrow> a - b \<in> Rats"
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	956	apply (auto simp add: Rats_def)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	957	apply (rule range_eqI)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	958	apply (rule of_rat_diff [symmetric])
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	959	done
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	960
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	961	lemma Rats_mult [simp]: "\<lbrakk>a \<in> Rats; b \<in> Rats\<rbrakk> \<Longrightarrow> a * b \<in> Rats"
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	962	apply (auto simp add: Rats_def)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	963	apply (rule range_eqI)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	964	apply (rule of_rat_mult [symmetric])
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	965	done
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	966
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	967	lemma nonzero_Rats_inverse:
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	968	fixes a :: "'a::field_char_0"
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	969	shows "\<lbrakk>a \<in> Rats; a \<noteq> 0\<rbrakk> \<Longrightarrow> inverse a \<in> Rats"
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	970	apply (auto simp add: Rats_def)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	971	apply (rule range_eqI)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	972	apply (erule nonzero_of_rat_inverse [symmetric])
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	973	done
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	974
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	975	lemma Rats_inverse [simp]:
36409 d323e7773aa8 use new classes (linordered_)field_inverse_zero haftmann parents: 36349 diff changeset	976	fixes a :: "'a::{field_char_0, field_inverse_zero}"
28010 8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	977	shows "a \<in> Rats \<Longrightarrow> inverse a \<in> Rats"
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	978	apply (auto simp add: Rats_def)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	979	apply (rule range_eqI)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	980	apply (rule of_rat_inverse [symmetric])
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	981	done
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	982
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	983	lemma nonzero_Rats_divide:
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	984	fixes a b :: "'a::field_char_0"
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	985	shows "\<lbrakk>a \<in> Rats; b \<in> Rats; b \<noteq> 0\<rbrakk> \<Longrightarrow> a / b \<in> Rats"
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	986	apply (auto simp add: Rats_def)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	987	apply (rule range_eqI)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	988	apply (erule nonzero_of_rat_divide [symmetric])
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	989	done
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	990
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	991	lemma Rats_divide [simp]:
36409 d323e7773aa8 use new classes (linordered_)field_inverse_zero haftmann parents: 36349 diff changeset	992	fixes a b :: "'a::{field_char_0, field_inverse_zero}"
28010 8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	993	shows "\<lbrakk>a \<in> Rats; b \<in> Rats\<rbrakk> \<Longrightarrow> a / b \<in> Rats"
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	994	apply (auto simp add: Rats_def)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	995	apply (rule range_eqI)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	996	apply (rule of_rat_divide [symmetric])
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	997	done
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	998
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	999	lemma Rats_power [simp]:
31017 2c227493ea56 stripped class recpower further haftmann parents: 30960 diff changeset	1000	fixes a :: "'a::field_char_0"
28010 8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	1001	shows "a \<in> Rats \<Longrightarrow> a ^ n \<in> Rats"
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	1002	apply (auto simp add: Rats_def)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	1003	apply (rule range_eqI)
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	1004	apply (rule of_rat_power [symmetric])
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	1005	done
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	1006
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	1007	lemma Rats_cases [cases set: Rats]:
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	1008	assumes "q \<in> \<rat>"
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	1009	obtains (of_rat) r where "q = of_rat r"
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	1010	unfolding Rats_def
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	1011	proof -
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	1012	from `q \<in> \<rat>` have "q \<in> range of_rat" unfolding Rats_def .
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	1013	then obtain r where "q = of_rat r" ..
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	1014	then show thesis ..
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	1015	qed
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	1016
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	1017	lemma Rats_induct [case_names of_rat, induct set: Rats]:
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	1018	"q \<in> \<rat> \<Longrightarrow> (\<And>r. P (of_rat r)) \<Longrightarrow> P q"
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	1019	by (rule Rats_cases) auto
8312edc51969 add lemmas about Rats similar to those about Reals huffman parents: 28001 diff changeset	1020
28001 4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27682 diff changeset	1021
24533 fe1f93f6a15a Added code generator setup (taken from Library/Executable_Rat.thy, berghofe parents: 24506 diff changeset	1022	subsection {* Implementation of rational numbers as pairs of integers *}
fe1f93f6a15a Added code generator setup (taken from Library/Executable_Rat.thy, berghofe parents: 24506 diff changeset	1023
47108 2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1024	text {* Formal constructor *}
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1025
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1026	definition Frct :: "int \<times> int \<Rightarrow> rat" where
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1027	[simp]: "Frct p = Fract (fst p) (snd p)"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1028
36112 7fa17a225852 user interface for abstract datatypes is an attribute, not a command haftmann parents: 35726 diff changeset	1029	lemma [code abstype]:
7fa17a225852 user interface for abstract datatypes is an attribute, not a command haftmann parents: 35726 diff changeset	1030	"Frct (quotient_of q) = q"
7fa17a225852 user interface for abstract datatypes is an attribute, not a command haftmann parents: 35726 diff changeset	1031	by (cases q) (auto intro: quotient_of_eq)
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1032
47108 2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1033
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1034	text {* Numerals *}
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1035
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1036	declare quotient_of_Fract [code abstract]
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1037
47108 2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1038	definition of_int :: "int \<Rightarrow> rat"
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1039	where
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1040	[code_abbrev]: "of_int = Int.of_int"
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1041	hide_const (open) of_int
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1042
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1043	lemma quotient_of_int [code abstract]:
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1044	"quotient_of (Rat.of_int a) = (a, 1)"
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1045	by (simp add: of_int_def of_int_rat quotient_of_Fract)
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1046
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1047	lemma [code_unfold]:
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1048	"numeral k = Rat.of_int (numeral k)"
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1049	by (simp add: Rat.of_int_def)
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1050
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1051	lemma [code_unfold]:
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1052	"neg_numeral k = Rat.of_int (neg_numeral k)"
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1053	by (simp add: Rat.of_int_def)
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1054
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1055	lemma Frct_code_post [code_post]:
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1056	"Frct (0, a) = 0"
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1057	"Frct (a, 0) = 0"
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1058	"Frct (1, 1) = 1"
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1059	"Frct (numeral k, 1) = numeral k"
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1060	"Frct (neg_numeral k, 1) = neg_numeral k"
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1061	"Frct (1, numeral k) = 1 / numeral k"
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1062	"Frct (1, neg_numeral k) = 1 / neg_numeral k"
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1063	"Frct (numeral k, numeral l) = numeral k / numeral l"
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1064	"Frct (numeral k, neg_numeral l) = numeral k / neg_numeral l"
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1065	"Frct (neg_numeral k, numeral l) = neg_numeral k / numeral l"
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1066	"Frct (neg_numeral k, neg_numeral l) = neg_numeral k / neg_numeral l"
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1067	by (simp_all add: Fract_of_int_quotient)
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1068
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1069
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1070	text {* Operations *}
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1071
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1072	lemma rat_zero_code [code abstract]:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1073	"quotient_of 0 = (0, 1)"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1074	by (simp add: Zero_rat_def quotient_of_Fract normalize_def)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1075
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1076	lemma rat_one_code [code abstract]:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1077	"quotient_of 1 = (1, 1)"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1078	by (simp add: One_rat_def quotient_of_Fract normalize_def)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1079
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1080	lemma rat_plus_code [code abstract]:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1081	"quotient_of (p + q) = (let (a, c) = quotient_of p; (b, d) = quotient_of q
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1082	in normalize (a * d + b * c, c * d))"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1083	by (cases p, cases q) (simp add: quotient_of_Fract)
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	1084
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1085	lemma rat_uminus_code [code abstract]:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1086	"quotient_of (- p) = (let (a, b) = quotient_of p in (- a, b))"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1087	by (cases p) (simp add: quotient_of_Fract)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1088
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1089	lemma rat_minus_code [code abstract]:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1090	"quotient_of (p - q) = (let (a, c) = quotient_of p; (b, d) = quotient_of q
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1091	in normalize (a * d - b * c, c * d))"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1092	by (cases p, cases q) (simp add: quotient_of_Fract)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1093
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1094	lemma rat_times_code [code abstract]:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1095	"quotient_of (p * q) = (let (a, c) = quotient_of p; (b, d) = quotient_of q
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1096	in normalize (a * b, c * d))"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1097	by (cases p, cases q) (simp add: quotient_of_Fract)
24533 fe1f93f6a15a Added code generator setup (taken from Library/Executable_Rat.thy, berghofe parents: 24506 diff changeset	1098
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1099	lemma rat_inverse_code [code abstract]:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1100	"quotient_of (inverse p) = (let (a, b) = quotient_of p
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1101	in if a = 0 then (0, 1) else (sgn a * b, \<bar>a\<bar>))"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1102	proof (cases p)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1103	case (Fract a b) then show ?thesis
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1104	by (cases "0::int" a rule: linorder_cases) (simp_all add: quotient_of_Fract gcd_int.commute)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1105	qed
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1106
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1107	lemma rat_divide_code [code abstract]:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1108	"quotient_of (p / q) = (let (a, c) = quotient_of p; (b, d) = quotient_of q
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1109	in normalize (a * d, c * b))"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1110	by (cases p, cases q) (simp add: quotient_of_Fract)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1111
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1112	lemma rat_abs_code [code abstract]:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1113	"quotient_of \<bar>p\<bar> = (let (a, b) = quotient_of p in (\<bar>a\<bar>, b))"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1114	by (cases p) (simp add: quotient_of_Fract)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1115
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1116	lemma rat_sgn_code [code abstract]:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1117	"quotient_of (sgn p) = (sgn (fst (quotient_of p)), 1)"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1118	proof (cases p)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1119	case (Fract a b) then show ?thesis
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1120	by (cases "0::int" a rule: linorder_cases) (simp_all add: quotient_of_Fract)
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1121	qed
24533 fe1f93f6a15a Added code generator setup (taken from Library/Executable_Rat.thy, berghofe parents: 24506 diff changeset	1122
43733 a6ca7b83612f adding code equations to execute floor and ceiling on rational and real numbers bulwahn parents: 43732 diff changeset	1123	lemma rat_floor_code [code]:
a6ca7b83612f adding code equations to execute floor and ceiling on rational and real numbers bulwahn parents: 43732 diff changeset	1124	"floor p = (let (a, b) = quotient_of p in a div b)"
a6ca7b83612f adding code equations to execute floor and ceiling on rational and real numbers bulwahn parents: 43732 diff changeset	1125	by (cases p) (simp add: quotient_of_Fract floor_Fract)
a6ca7b83612f adding code equations to execute floor and ceiling on rational and real numbers bulwahn parents: 43732 diff changeset	1126
38857 97775f3e8722 renamed class/constant eq to equal; tuned some instantiations haftmann parents: 38287 diff changeset	1127	instantiation rat :: equal
26513 6f306c8c2c54 explicit class "eq" for operational equality haftmann parents: 25965 diff changeset	1128	begin
6f306c8c2c54 explicit class "eq" for operational equality haftmann parents: 25965 diff changeset	1129
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1130	definition [code]:
38857 97775f3e8722 renamed class/constant eq to equal; tuned some instantiations haftmann parents: 38287 diff changeset	1131	"HOL.equal a b \<longleftrightarrow> quotient_of a = quotient_of b"
26513 6f306c8c2c54 explicit class "eq" for operational equality haftmann parents: 25965 diff changeset	1132
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1133	instance proof
38857 97775f3e8722 renamed class/constant eq to equal; tuned some instantiations haftmann parents: 38287 diff changeset	1134	qed (simp add: equal_rat_def quotient_of_inject_eq)
26513 6f306c8c2c54 explicit class "eq" for operational equality haftmann parents: 25965 diff changeset	1135
28351 abfc66969d1f non left-linear equations for nbe haftmann parents: 28313 diff changeset	1136	lemma rat_eq_refl [code nbe]:
38857 97775f3e8722 renamed class/constant eq to equal; tuned some instantiations haftmann parents: 38287 diff changeset	1137	"HOL.equal (r::rat) r \<longleftrightarrow> True"
97775f3e8722 renamed class/constant eq to equal; tuned some instantiations haftmann parents: 38287 diff changeset	1138	by (rule equal_refl)
28351 abfc66969d1f non left-linear equations for nbe haftmann parents: 28313 diff changeset	1139
26513 6f306c8c2c54 explicit class "eq" for operational equality haftmann parents: 25965 diff changeset	1140	end
24533 fe1f93f6a15a Added code generator setup (taken from Library/Executable_Rat.thy, berghofe parents: 24506 diff changeset	1141
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1142	lemma rat_less_eq_code [code]:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1143	"p \<le> q \<longleftrightarrow> (let (a, c) = quotient_of p; (b, d) = quotient_of q in a * d \<le> c * b)"
35726 059d2f7b979f tuned prefixes of ac interpretations haftmann parents: 35402 diff changeset	1144	by (cases p, cases q) (simp add: quotient_of_Fract mult.commute)
24533 fe1f93f6a15a Added code generator setup (taken from Library/Executable_Rat.thy, berghofe parents: 24506 diff changeset	1145
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1146	lemma rat_less_code [code]:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1147	"p < q \<longleftrightarrow> (let (a, c) = quotient_of p; (b, d) = quotient_of q in a * d < c * b)"
35726 059d2f7b979f tuned prefixes of ac interpretations haftmann parents: 35402 diff changeset	1148	by (cases p, cases q) (simp add: quotient_of_Fract mult.commute)
24533 fe1f93f6a15a Added code generator setup (taken from Library/Executable_Rat.thy, berghofe parents: 24506 diff changeset	1149
35369 e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1150	lemma [code]:
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1151	"of_rat p = (let (a, b) = quotient_of p in of_int a / of_int b)"
e4a7947e02b8 more general case and induct rules; normalize and quotient_of; abstract code generation haftmann parents: 35293 diff changeset	1152	by (cases p) (simp add: quotient_of_Fract of_rat_rat)
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27551 diff changeset	1153
47108 2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1154
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1155	text {* Quickcheck *}
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1156
31203 5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1157	definition (in term_syntax)
32657 5f13912245ff Code_Eval(uation) haftmann parents: 32069 diff changeset	1158	valterm_fract :: "int \<times> (unit \<Rightarrow> Code_Evaluation.term) \<Rightarrow> int \<times> (unit \<Rightarrow> Code_Evaluation.term) \<Rightarrow> rat \<times> (unit \<Rightarrow> Code_Evaluation.term)" where
5f13912245ff Code_Eval(uation) haftmann parents: 32069 diff changeset	1159	[code_unfold]: "valterm_fract k l = Code_Evaluation.valtermify Fract {\<cdot>} k {\<cdot>} l"
31203 5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1160
37751 89e16802b6cc nicer xsymbol syntax for fcomp and scomp haftmann parents: 37397 diff changeset	1161	notation fcomp (infixl "\<circ>>" 60)
89e16802b6cc nicer xsymbol syntax for fcomp and scomp haftmann parents: 37397 diff changeset	1162	notation scomp (infixl "\<circ>\<rightarrow>" 60)
31203 5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1163
5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1164	instantiation rat :: random
5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1165	begin
5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1166
5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1167	definition
37751 89e16802b6cc nicer xsymbol syntax for fcomp and scomp haftmann parents: 37397 diff changeset	1168	"Quickcheck.random i = Quickcheck.random i \<circ>\<rightarrow> (\<lambda>num. Random.range i \<circ>\<rightarrow> (\<lambda>denom. Pair (
31205 98370b26c2ce String.literal replaces message_string, code_numeral replaces (code_)index haftmann parents: 31203 diff changeset	1169	let j = Code_Numeral.int_of (denom + 1)
32657 5f13912245ff Code_Eval(uation) haftmann parents: 32069 diff changeset	1170	in valterm_fract num (j, \<lambda>u. Code_Evaluation.term_of j))))"
31203 5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1171
5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1172	instance ..
5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1173
5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1174	end
5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1175
37751 89e16802b6cc nicer xsymbol syntax for fcomp and scomp haftmann parents: 37397 diff changeset	1176	no_notation fcomp (infixl "\<circ>>" 60)
89e16802b6cc nicer xsymbol syntax for fcomp and scomp haftmann parents: 37397 diff changeset	1177	no_notation scomp (infixl "\<circ>\<rightarrow>" 60)
31203 5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1178
41920 d4fb7a418152 moving exhaustive_generators.ML to Quickcheck directory bulwahn parents: 41792 diff changeset	1179	instantiation rat :: exhaustive
41231 2e901158675e adding exhaustive tester instances for numeric types: code_numeral, nat, rat and real bulwahn parents: 40819 diff changeset	1180	begin
2e901158675e adding exhaustive tester instances for numeric types: code_numeral, nat, rat and real bulwahn parents: 40819 diff changeset	1181
2e901158675e adding exhaustive tester instances for numeric types: code_numeral, nat, rat and real bulwahn parents: 40819 diff changeset	1182	definition
45818 53a697f5454a hiding constants and facts in the Quickcheck_Exhaustive and Quickcheck_Narrowing theory; bulwahn parents: 45694 diff changeset	1183	"exhaustive_rat f d = Quickcheck_Exhaustive.exhaustive (%l. Quickcheck_Exhaustive.exhaustive (%k. f (Fract k (Code_Numeral.int_of l + 1))) d) d"
42311 eb32a8474a57 rational and real instances for new compilation scheme for exhaustive quickcheck bulwahn parents: 41920 diff changeset	1184
eb32a8474a57 rational and real instances for new compilation scheme for exhaustive quickcheck bulwahn parents: 41920 diff changeset	1185	instance ..
eb32a8474a57 rational and real instances for new compilation scheme for exhaustive quickcheck bulwahn parents: 41920 diff changeset	1186
eb32a8474a57 rational and real instances for new compilation scheme for exhaustive quickcheck bulwahn parents: 41920 diff changeset	1187	end
eb32a8474a57 rational and real instances for new compilation scheme for exhaustive quickcheck bulwahn parents: 41920 diff changeset	1188
eb32a8474a57 rational and real instances for new compilation scheme for exhaustive quickcheck bulwahn parents: 41920 diff changeset	1189	instantiation rat :: full_exhaustive
eb32a8474a57 rational and real instances for new compilation scheme for exhaustive quickcheck bulwahn parents: 41920 diff changeset	1190	begin
eb32a8474a57 rational and real instances for new compilation scheme for exhaustive quickcheck bulwahn parents: 41920 diff changeset	1191
eb32a8474a57 rational and real instances for new compilation scheme for exhaustive quickcheck bulwahn parents: 41920 diff changeset	1192	definition
45818 53a697f5454a hiding constants and facts in the Quickcheck_Exhaustive and Quickcheck_Narrowing theory; bulwahn parents: 45694 diff changeset	1193	"full_exhaustive_rat f d = Quickcheck_Exhaustive.full_exhaustive (%(l, _). Quickcheck_Exhaustive.full_exhaustive (%k.
45507 6975db7fd6f0 improved generators for rational numbers to generate negative numbers; bulwahn parents: 45478 diff changeset	1194	f (let j = Code_Numeral.int_of l + 1
6975db7fd6f0 improved generators for rational numbers to generate negative numbers; bulwahn parents: 45478 diff changeset	1195	in valterm_fract k (j, %_. Code_Evaluation.term_of j))) d) d"
41231 2e901158675e adding exhaustive tester instances for numeric types: code_numeral, nat, rat and real bulwahn parents: 40819 diff changeset	1196
2e901158675e adding exhaustive tester instances for numeric types: code_numeral, nat, rat and real bulwahn parents: 40819 diff changeset	1197	instance ..
2e901158675e adding exhaustive tester instances for numeric types: code_numeral, nat, rat and real bulwahn parents: 40819 diff changeset	1198
2e901158675e adding exhaustive tester instances for numeric types: code_numeral, nat, rat and real bulwahn parents: 40819 diff changeset	1199	end
2e901158675e adding exhaustive tester instances for numeric types: code_numeral, nat, rat and real bulwahn parents: 40819 diff changeset	1200
43889 90d24cafb05d adding code equations for partial_term_of for rational numbers bulwahn parents: 43887 diff changeset	1201	instantiation rat :: partial_term_of
90d24cafb05d adding code equations for partial_term_of for rational numbers bulwahn parents: 43887 diff changeset	1202	begin
90d24cafb05d adding code equations for partial_term_of for rational numbers bulwahn parents: 43887 diff changeset	1203
90d24cafb05d adding code equations for partial_term_of for rational numbers bulwahn parents: 43887 diff changeset	1204	instance ..
90d24cafb05d adding code equations for partial_term_of for rational numbers bulwahn parents: 43887 diff changeset	1205
90d24cafb05d adding code equations for partial_term_of for rational numbers bulwahn parents: 43887 diff changeset	1206	end
90d24cafb05d adding code equations for partial_term_of for rational numbers bulwahn parents: 43887 diff changeset	1207
90d24cafb05d adding code equations for partial_term_of for rational numbers bulwahn parents: 43887 diff changeset	1208	lemma [code]:
46758 4106258260b3 choosing longer constant names in Quickcheck_Narrowing to reduce the chances of name clashes in Quickcheck-Narrowing bulwahn parents: 45818 diff changeset	1209	"partial_term_of (ty :: rat itself) (Quickcheck_Narrowing.Narrowing_variable p tt) == Code_Evaluation.Free (STR ''_'') (Typerep.Typerep (STR ''Rat.rat'') [])"
4106258260b3 choosing longer constant names in Quickcheck_Narrowing to reduce the chances of name clashes in Quickcheck-Narrowing bulwahn parents: 45818 diff changeset	1210	"partial_term_of (ty :: rat itself) (Quickcheck_Narrowing.Narrowing_constructor 0 [l, k]) ==
45507 6975db7fd6f0 improved generators for rational numbers to generate negative numbers; bulwahn parents: 45478 diff changeset	1211	Code_Evaluation.App (Code_Evaluation.Const (STR ''Rat.Frct'')
6975db7fd6f0 improved generators for rational numbers to generate negative numbers; bulwahn parents: 45478 diff changeset	1212	(Typerep.Typerep (STR ''fun'') [Typerep.Typerep (STR ''Product_Type.prod'') [Typerep.Typerep (STR ''Int.int'') [], Typerep.Typerep (STR ''Int.int'') []],
6975db7fd6f0 improved generators for rational numbers to generate negative numbers; bulwahn parents: 45478 diff changeset	1213	Typerep.Typerep (STR ''Rat.rat'') []])) (Code_Evaluation.App (Code_Evaluation.App (Code_Evaluation.Const (STR ''Product_Type.Pair'') (Typerep.Typerep (STR ''fun'') [Typerep.Typerep (STR ''Int.int'') [], Typerep.Typerep (STR ''fun'') [Typerep.Typerep (STR ''Int.int'') [], Typerep.Typerep (STR ''Product_Type.prod'') [Typerep.Typerep (STR ''Int.int'') [], Typerep.Typerep (STR ''Int.int'') []]]])) (partial_term_of (TYPE(int)) l)) (partial_term_of (TYPE(int)) k))"
43889 90d24cafb05d adding code equations for partial_term_of for rational numbers bulwahn parents: 43887 diff changeset	1214	by (rule partial_term_of_anything)+
90d24cafb05d adding code equations for partial_term_of for rational numbers bulwahn parents: 43887 diff changeset	1215
43887 442aceb54969 adding narrowing instances for real and rational bulwahn parents: 43733 diff changeset	1216	instantiation rat :: narrowing
442aceb54969 adding narrowing instances for real and rational bulwahn parents: 43733 diff changeset	1217	begin
442aceb54969 adding narrowing instances for real and rational bulwahn parents: 43733 diff changeset	1218
442aceb54969 adding narrowing instances for real and rational bulwahn parents: 43733 diff changeset	1219	definition
45507 6975db7fd6f0 improved generators for rational numbers to generate negative numbers; bulwahn parents: 45478 diff changeset	1220	"narrowing = Quickcheck_Narrowing.apply (Quickcheck_Narrowing.apply
6975db7fd6f0 improved generators for rational numbers to generate negative numbers; bulwahn parents: 45478 diff changeset	1221	(Quickcheck_Narrowing.cons (%nom denom. Fract nom denom)) narrowing) narrowing"
43887 442aceb54969 adding narrowing instances for real and rational bulwahn parents: 43733 diff changeset	1222
442aceb54969 adding narrowing instances for real and rational bulwahn parents: 43733 diff changeset	1223	instance ..
442aceb54969 adding narrowing instances for real and rational bulwahn parents: 43733 diff changeset	1224
442aceb54969 adding narrowing instances for real and rational bulwahn parents: 43733 diff changeset	1225	end
442aceb54969 adding narrowing instances for real and rational bulwahn parents: 43733 diff changeset	1226
442aceb54969 adding narrowing instances for real and rational bulwahn parents: 43733 diff changeset	1227
45183 2e1ad4a54189 removing old code generator setup for rational numbers; tuned bulwahn parents: 43889 diff changeset	1228	subsection {* Setup for Nitpick *}
24533 fe1f93f6a15a Added code generator setup (taken from Library/Executable_Rat.thy, berghofe parents: 24506 diff changeset	1229
38287 796302ca3611 replace "setup" with "declaration" blanchet parents: 38242 diff changeset	1230	declaration {*
796302ca3611 replace "setup" with "declaration" blanchet parents: 38242 diff changeset	1231	Nitpick_HOL.register_frac_type @{type_name rat}
33209 d36ca3960e33 tuned white space; wenzelm parents: 33197 diff changeset	1232	[(@{const_name zero_rat_inst.zero_rat}, @{const_name Nitpick.zero_frac}),
d36ca3960e33 tuned white space; wenzelm parents: 33197 diff changeset	1233	(@{const_name one_rat_inst.one_rat}, @{const_name Nitpick.one_frac}),
d36ca3960e33 tuned white space; wenzelm parents: 33197 diff changeset	1234	(@{const_name plus_rat_inst.plus_rat}, @{const_name Nitpick.plus_frac}),
d36ca3960e33 tuned white space; wenzelm parents: 33197 diff changeset	1235	(@{const_name times_rat_inst.times_rat}, @{const_name Nitpick.times_frac}),
d36ca3960e33 tuned white space; wenzelm parents: 33197 diff changeset	1236	(@{const_name uminus_rat_inst.uminus_rat}, @{const_name Nitpick.uminus_frac}),
d36ca3960e33 tuned white space; wenzelm parents: 33197 diff changeset	1237	(@{const_name inverse_rat_inst.inverse_rat}, @{const_name Nitpick.inverse_frac}),
37397 18000f9d783e adjust Nitpick's handling of "<" on "rat"s and "reals" blanchet parents: 37143 diff changeset	1238	(@{const_name ord_rat_inst.less_rat}, @{const_name Nitpick.less_frac}),
33209 d36ca3960e33 tuned white space; wenzelm parents: 33197 diff changeset	1239	(@{const_name ord_rat_inst.less_eq_rat}, @{const_name Nitpick.less_eq_frac}),
45478 8e299034eab4 remove unsound line in Nitpick's "rat" setup blanchet parents: 45183 diff changeset	1240	(@{const_name field_char_0_class.of_rat}, @{const_name Nitpick.of_frac})]
33197 de6285ebcc05 continuation of Nitpick's integration into Isabelle; blanchet parents: 32657 diff changeset	1241	*}
de6285ebcc05 continuation of Nitpick's integration into Isabelle; blanchet parents: 32657 diff changeset	1242
41792 ff3cb0c418b7 renamed "nitpick\_def" to "nitpick_unfold" to reflect its new semantics blanchet parents: 41231 diff changeset	1243	lemmas [nitpick_unfold] = inverse_rat_inst.inverse_rat
47108 2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46758 diff changeset	1244	one_rat_inst.one_rat ord_rat_inst.less_rat
37397 18000f9d783e adjust Nitpick's handling of "<" on "rat"s and "reals" blanchet parents: 37143 diff changeset	1245	ord_rat_inst.less_eq_rat plus_rat_inst.plus_rat times_rat_inst.times_rat
18000f9d783e adjust Nitpick's handling of "<" on "rat"s and "reals" blanchet parents: 37143 diff changeset	1246	uminus_rat_inst.uminus_rat zero_rat_inst.zero_rat
33197 de6285ebcc05 continuation of Nitpick's integration into Isabelle; blanchet parents: 32657 diff changeset	1247
35343 523124691b3a move float syntax from RealPow to Rational huffman parents: 35293 diff changeset	1248	subsection{* Float syntax *}
523124691b3a move float syntax from RealPow to Rational huffman parents: 35293 diff changeset	1249
523124691b3a move float syntax from RealPow to Rational huffman parents: 35293 diff changeset	1250	syntax "_Float" :: "float_const \<Rightarrow> 'a" ("_")
523124691b3a move float syntax from RealPow to Rational huffman parents: 35293 diff changeset	1251
523124691b3a move float syntax from RealPow to Rational huffman parents: 35293 diff changeset	1252	use "Tools/float_syntax.ML"
523124691b3a move float syntax from RealPow to Rational huffman parents: 35293 diff changeset	1253	setup Float_Syntax.setup
523124691b3a move float syntax from RealPow to Rational huffman parents: 35293 diff changeset	1254
523124691b3a move float syntax from RealPow to Rational huffman parents: 35293 diff changeset	1255	text{* Test: *}
523124691b3a move float syntax from RealPow to Rational huffman parents: 35293 diff changeset	1256	lemma "123.456 = -111.111 + 200 + 30 + 4 + 5/10 + 6/100 + (7/1000::rat)"
523124691b3a move float syntax from RealPow to Rational huffman parents: 35293 diff changeset	1257	by simp
523124691b3a move float syntax from RealPow to Rational huffman parents: 35293 diff changeset	1258
37143 2a5182751151 constant Rat.normalize needs to be qualified; wenzelm parents: 36415 diff changeset	1259
2a5182751151 constant Rat.normalize needs to be qualified; wenzelm parents: 36415 diff changeset	1260	hide_const (open) normalize
2a5182751151 constant Rat.normalize needs to be qualified; wenzelm parents: 36415 diff changeset	1261
29880 3dee8ff45d3d move countability proof from Rational to Countable; add instance rat :: countable huffman parents: 29667 diff changeset	1262	end

author	wenzelm
	Mon, 09 Apr 2012 20:57:23 +0200
changeset 47408	63c05991882e
parent 47108	2a1953f0d20d
child 47906	09a896d295bd
permissions	-rw-r--r--