isabelle: src/HOL/ex/Higher_Order_Logic.thy@c3658c18b7bc (annotated)

12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	1	(* Title: HOL/ex/Higher_Order_Logic.thy
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	2	Author: Gertrud Bauer and Markus Wenzel, TU Muenchen
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	3	*)
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	4
59031 4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	5	section \<open>Foundations of HOL\<close>
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	6
60769 cf7f3465eaf1 tuned proofs; wenzelm parents: 59031 diff changeset	7	theory Higher_Order_Logic
cf7f3465eaf1 tuned proofs; wenzelm parents: 59031 diff changeset	8	imports Pure
cf7f3465eaf1 tuned proofs; wenzelm parents: 59031 diff changeset	9	begin
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	10
59031 4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	11	text \<open>
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	12	The following theory development demonstrates Higher-Order Logic
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	13	itself, represented directly within the Pure framework of Isabelle.
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	14	The ``HOL'' logic given here is essentially that of Gordon
58622 aa99568f56de more antiquotations; wenzelm parents: 55380 diff changeset	15	@{cite "Gordon:1985:HOL"}, although we prefer to present basic concepts
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	16	in a slightly more conventional manner oriented towards plain
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	17	Natural Deduction.
59031 4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	18	\<close>
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	19
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	20
59031 4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	21	subsection \<open>Pure Logic\<close>
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	22
55380 4de48353034e prefer vacuous definitional type classes over axiomatic ones; wenzelm parents: 41460 diff changeset	23	class type
36452 d37c6eed8117 renamed command 'defaultsort' to 'default_sort'; wenzelm parents: 26957 diff changeset	24	default_sort type
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	25
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	26	typedecl o
55380 4de48353034e prefer vacuous definitional type classes over axiomatic ones; wenzelm parents: 41460 diff changeset	27	instance o :: type ..
4de48353034e prefer vacuous definitional type classes over axiomatic ones; wenzelm parents: 41460 diff changeset	28	instance "fun" :: (type, type) type ..
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	29
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	30
59031 4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	31	subsubsection \<open>Basic logical connectives\<close>
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	32
60769 cf7f3465eaf1 tuned proofs; wenzelm parents: 59031 diff changeset	33	judgment Trueprop :: "o \<Rightarrow> prop" ("_" 5)
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	34
23822 bfb3b1e1d766 tuned specifications; wenzelm parents: 23373 diff changeset	35	axiomatization
bfb3b1e1d766 tuned specifications; wenzelm parents: 23373 diff changeset	36	imp :: "o \<Rightarrow> o \<Rightarrow> o" (infixr "\<longrightarrow>" 25) and
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	37	All :: "('a \<Rightarrow> o) \<Rightarrow> o" (binder "\<forall>" 10)
23822 bfb3b1e1d766 tuned specifications; wenzelm parents: 23373 diff changeset	38	where
bfb3b1e1d766 tuned specifications; wenzelm parents: 23373 diff changeset	39	impI [intro]: "(A \<Longrightarrow> B) \<Longrightarrow> A \<longrightarrow> B" and
bfb3b1e1d766 tuned specifications; wenzelm parents: 23373 diff changeset	40	impE [dest, trans]: "A \<longrightarrow> B \<Longrightarrow> A \<Longrightarrow> B" and
bfb3b1e1d766 tuned specifications; wenzelm parents: 23373 diff changeset	41	allI [intro]: "(\<And>x. P x) \<Longrightarrow> \<forall>x. P x" and
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	42	allE [dest]: "\<forall>x. P x \<Longrightarrow> P a"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	43
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	44
59031 4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	45	subsubsection \<open>Extensional equality\<close>
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	46
23822 bfb3b1e1d766 tuned specifications; wenzelm parents: 23373 diff changeset	47	axiomatization
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	48	equal :: "'a \<Rightarrow> 'a \<Rightarrow> o" (infixl "=" 50)
23822 bfb3b1e1d766 tuned specifications; wenzelm parents: 23373 diff changeset	49	where
bfb3b1e1d766 tuned specifications; wenzelm parents: 23373 diff changeset	50	refl [intro]: "x = x" and
bfb3b1e1d766 tuned specifications; wenzelm parents: 23373 diff changeset	51	subst: "x = y \<Longrightarrow> P x \<Longrightarrow> P y"
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	52
23822 bfb3b1e1d766 tuned specifications; wenzelm parents: 23373 diff changeset	53	axiomatization where
bfb3b1e1d766 tuned specifications; wenzelm parents: 23373 diff changeset	54	ext [intro]: "(\<And>x. f x = g x) \<Longrightarrow> f = g" and
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	55	iff [intro]: "(A \<Longrightarrow> B) \<Longrightarrow> (B \<Longrightarrow> A) \<Longrightarrow> A = B"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	56
12394 b20a37eb8338 sym [sym]; wenzelm parents: 12360 diff changeset	57	theorem sym [sym]: "x = y \<Longrightarrow> y = x"
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	58	proof -
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	59	assume "x = y"
23373 ead82c82da9e tuned proofs: avoid implicit prems; wenzelm parents: 21404 diff changeset	60	then show "y = x" by (rule subst) (rule refl)
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	61	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	62
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	63	lemma [trans]: "x = y \<Longrightarrow> P y \<Longrightarrow> P x"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	64	by (rule subst) (rule sym)
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	65
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	66	lemma [trans]: "P x \<Longrightarrow> x = y \<Longrightarrow> P y"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	67	by (rule subst)
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	68
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	69	theorem trans [trans]: "x = y \<Longrightarrow> y = z \<Longrightarrow> x = z"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	70	by (rule subst)
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	71
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	72	theorem iff1 [elim]: "A = B \<Longrightarrow> A \<Longrightarrow> B"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	73	by (rule subst)
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	74
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	75	theorem iff2 [elim]: "A = B \<Longrightarrow> B \<Longrightarrow> A"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	76	by (rule subst) (rule sym)
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	77
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	78
59031 4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	79	subsubsection \<open>Derived connectives\<close>
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	80
59031 4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	81	definition false :: o ("\<bottom>") where "\<bottom> \<equiv> \<forall>A. A"
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 20523 diff changeset	82
59031 4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	83	definition true :: o ("\<top>") where "\<top> \<equiv> \<bottom> \<longrightarrow> \<bottom>"
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 20523 diff changeset	84
59031 4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	85	definition not :: "o \<Rightarrow> o" ("\<not> _" [40] 40)
4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	86	where "not \<equiv> \<lambda>A. A \<longrightarrow> \<bottom>"
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 20523 diff changeset	87
59031 4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	88	definition conj :: "o \<Rightarrow> o \<Rightarrow> o" (infixr "\<and>" 35)
4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	89	where "conj \<equiv> \<lambda>A B. \<forall>C. (A \<longrightarrow> B \<longrightarrow> C) \<longrightarrow> C"
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 20523 diff changeset	90
59031 4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	91	definition disj :: "o \<Rightarrow> o \<Rightarrow> o" (infixr "\<or>" 30)
4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	92	where "disj \<equiv> \<lambda>A B. \<forall>C. (A \<longrightarrow> C) \<longrightarrow> (B \<longrightarrow> C) \<longrightarrow> C"
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 20523 diff changeset	93
59031 4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	94	definition Ex :: "('a \<Rightarrow> o) \<Rightarrow> o" (binder "\<exists>" 10)
4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	95	where "\<exists>x. P x \<equiv> \<forall>C. (\<forall>x. P x \<longrightarrow> C) \<longrightarrow> C"
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	96
59031 4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	97	abbreviation not_equal :: "'a \<Rightarrow> 'a \<Rightarrow> o" (infixl "\<noteq>" 50)
4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	98	where "x \<noteq> y \<equiv> \<not> (x = y)"
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	99
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	100	theorem falseE [elim]: "\<bottom> \<Longrightarrow> A"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	101	proof (unfold false_def)
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	102	assume "\<forall>A. A"
23373 ead82c82da9e tuned proofs: avoid implicit prems; wenzelm parents: 21404 diff changeset	103	then show A ..
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	104	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	105
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	106	theorem trueI [intro]: \<top>
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	107	proof (unfold true_def)
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	108	show "\<bottom> \<longrightarrow> \<bottom>" ..
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	109	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	110
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	111	theorem notI [intro]: "(A \<Longrightarrow> \<bottom>) \<Longrightarrow> \<not> A"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	112	proof (unfold not_def)
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	113	assume "A \<Longrightarrow> \<bottom>"
23373 ead82c82da9e tuned proofs: avoid implicit prems; wenzelm parents: 21404 diff changeset	114	then show "A \<longrightarrow> \<bottom>" ..
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	115	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	116
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	117	theorem notE [elim]: "\<not> A \<Longrightarrow> A \<Longrightarrow> B"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	118	proof (unfold not_def)
60769 cf7f3465eaf1 tuned proofs; wenzelm parents: 59031 diff changeset	119	assume "A \<longrightarrow> \<bottom>" and A
cf7f3465eaf1 tuned proofs; wenzelm parents: 59031 diff changeset	120	then have \<bottom> ..
23373 ead82c82da9e tuned proofs: avoid implicit prems; wenzelm parents: 21404 diff changeset	121	then show B ..
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	122	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	123
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	124	lemma notE': "A \<Longrightarrow> \<not> A \<Longrightarrow> B"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	125	by (rule notE)
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	126
59031 4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	127	lemmas contradiction = notE notE' -- \<open>proof by contradiction in any order\<close>
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	128
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	129	theorem conjI [intro]: "A \<Longrightarrow> B \<Longrightarrow> A \<and> B"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	130	proof (unfold conj_def)
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	131	assume A and B
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	132	show "\<forall>C. (A \<longrightarrow> B \<longrightarrow> C) \<longrightarrow> C"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	133	proof
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	134	fix C show "(A \<longrightarrow> B \<longrightarrow> C) \<longrightarrow> C"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	135	proof
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	136	assume "A \<longrightarrow> B \<longrightarrow> C"
59031 4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	137	also note \<open>A\<close>
4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	138	also note \<open>B\<close>
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	139	finally show C .
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	140	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	141	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	142	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	143
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	144	theorem conjE [elim]: "A \<and> B \<Longrightarrow> (A \<Longrightarrow> B \<Longrightarrow> C) \<Longrightarrow> C"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	145	proof (unfold conj_def)
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	146	assume c: "\<forall>C. (A \<longrightarrow> B \<longrightarrow> C) \<longrightarrow> C"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	147	assume "A \<Longrightarrow> B \<Longrightarrow> C"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	148	moreover {
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	149	from c have "(A \<longrightarrow> B \<longrightarrow> A) \<longrightarrow> A" ..
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	150	also have "A \<longrightarrow> B \<longrightarrow> A"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	151	proof
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	152	assume A
23373 ead82c82da9e tuned proofs: avoid implicit prems; wenzelm parents: 21404 diff changeset	153	then show "B \<longrightarrow> A" ..
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	154	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	155	finally have A .
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	156	} moreover {
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	157	from c have "(A \<longrightarrow> B \<longrightarrow> B) \<longrightarrow> B" ..
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	158	also have "A \<longrightarrow> B \<longrightarrow> B"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	159	proof
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	160	show "B \<longrightarrow> B" ..
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	161	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	162	finally have B .
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	163	} ultimately show C .
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	164	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	165
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	166	theorem disjI1 [intro]: "A \<Longrightarrow> A \<or> B"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	167	proof (unfold disj_def)
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	168	assume A
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	169	show "\<forall>C. (A \<longrightarrow> C) \<longrightarrow> (B \<longrightarrow> C) \<longrightarrow> C"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	170	proof
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	171	fix C show "(A \<longrightarrow> C) \<longrightarrow> (B \<longrightarrow> C) \<longrightarrow> C"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	172	proof
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	173	assume "A \<longrightarrow> C"
59031 4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	174	also note \<open>A\<close>
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	175	finally have C .
23373 ead82c82da9e tuned proofs: avoid implicit prems; wenzelm parents: 21404 diff changeset	176	then show "(B \<longrightarrow> C) \<longrightarrow> C" ..
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	177	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	178	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	179	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	180
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	181	theorem disjI2 [intro]: "B \<Longrightarrow> A \<or> B"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	182	proof (unfold disj_def)
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	183	assume B
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	184	show "\<forall>C. (A \<longrightarrow> C) \<longrightarrow> (B \<longrightarrow> C) \<longrightarrow> C"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	185	proof
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	186	fix C show "(A \<longrightarrow> C) \<longrightarrow> (B \<longrightarrow> C) \<longrightarrow> C"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	187	proof
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	188	show "(B \<longrightarrow> C) \<longrightarrow> C"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	189	proof
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	190	assume "B \<longrightarrow> C"
59031 4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	191	also note \<open>B\<close>
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	192	finally show C .
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	193	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	194	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	195	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	196	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	197
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	198	theorem disjE [elim]: "A \<or> B \<Longrightarrow> (A \<Longrightarrow> C) \<Longrightarrow> (B \<Longrightarrow> C) \<Longrightarrow> C"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	199	proof (unfold disj_def)
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	200	assume c: "\<forall>C. (A \<longrightarrow> C) \<longrightarrow> (B \<longrightarrow> C) \<longrightarrow> C"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	201	assume r1: "A \<Longrightarrow> C" and r2: "B \<Longrightarrow> C"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	202	from c have "(A \<longrightarrow> C) \<longrightarrow> (B \<longrightarrow> C) \<longrightarrow> C" ..
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	203	also have "A \<longrightarrow> C"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	204	proof
60769 cf7f3465eaf1 tuned proofs; wenzelm parents: 59031 diff changeset	205	assume A
cf7f3465eaf1 tuned proofs; wenzelm parents: 59031 diff changeset	206	then show C by (rule r1)
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	207	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	208	also have "B \<longrightarrow> C"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	209	proof
60769 cf7f3465eaf1 tuned proofs; wenzelm parents: 59031 diff changeset	210	assume B
cf7f3465eaf1 tuned proofs; wenzelm parents: 59031 diff changeset	211	then show C by (rule r2)
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	212	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	213	finally show C .
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	214	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	215
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	216	theorem exI [intro]: "P a \<Longrightarrow> \<exists>x. P x"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	217	proof (unfold Ex_def)
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	218	assume "P a"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	219	show "\<forall>C. (\<forall>x. P x \<longrightarrow> C) \<longrightarrow> C"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	220	proof
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	221	fix C show "(\<forall>x. P x \<longrightarrow> C) \<longrightarrow> C"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	222	proof
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	223	assume "\<forall>x. P x \<longrightarrow> C"
23373 ead82c82da9e tuned proofs: avoid implicit prems; wenzelm parents: 21404 diff changeset	224	then have "P a \<longrightarrow> C" ..
59031 4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	225	also note \<open>P a\<close>
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	226	finally show C .
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	227	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	228	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	229	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	230
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	231	theorem exE [elim]: "\<exists>x. P x \<Longrightarrow> (\<And>x. P x \<Longrightarrow> C) \<Longrightarrow> C"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	232	proof (unfold Ex_def)
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	233	assume c: "\<forall>C. (\<forall>x. P x \<longrightarrow> C) \<longrightarrow> C"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	234	assume r: "\<And>x. P x \<Longrightarrow> C"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	235	from c have "(\<forall>x. P x \<longrightarrow> C) \<longrightarrow> C" ..
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	236	also have "\<forall>x. P x \<longrightarrow> C"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	237	proof
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	238	fix x show "P x \<longrightarrow> C"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	239	proof
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	240	assume "P x"
23373 ead82c82da9e tuned proofs: avoid implicit prems; wenzelm parents: 21404 diff changeset	241	then show C by (rule r)
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	242	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	243	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	244	finally show C .
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	245	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	246
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	247
59031 4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	248	subsection \<open>Classical logic\<close>
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	249
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	250	locale classical =
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	251	assumes classical: "(\<not> A \<Longrightarrow> A) \<Longrightarrow> A"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	252
60769 cf7f3465eaf1 tuned proofs; wenzelm parents: 59031 diff changeset	253	theorem (in classical) Peirce's_Law: "((A \<longrightarrow> B) \<longrightarrow> A) \<longrightarrow> A"
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	254	proof
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	255	assume a: "(A \<longrightarrow> B) \<longrightarrow> A"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	256	show A
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	257	proof (rule classical)
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	258	assume "\<not> A"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	259	have "A \<longrightarrow> B"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	260	proof
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	261	assume A
59031 4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	262	with \<open>\<not> A\<close> show B by (rule contradiction)
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	263	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	264	with a show A ..
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	265	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	266	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	267
60769 cf7f3465eaf1 tuned proofs; wenzelm parents: 59031 diff changeset	268	theorem (in classical) double_negation: "\<not> \<not> A \<Longrightarrow> A"
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	269	proof -
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	270	assume "\<not> \<not> A"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	271	show A
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	272	proof (rule classical)
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	273	assume "\<not> A"
59031 4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	274	with \<open>\<not> \<not> A\<close> show ?thesis by (rule contradiction)
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	275	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	276	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	277
60769 cf7f3465eaf1 tuned proofs; wenzelm parents: 59031 diff changeset	278	theorem (in classical) tertium_non_datur: "A \<or> \<not> A"
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	279	proof (rule double_negation)
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	280	show "\<not> \<not> (A \<or> \<not> A)"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	281	proof
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	282	assume "\<not> (A \<or> \<not> A)"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	283	have "\<not> A"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	284	proof
23373 ead82c82da9e tuned proofs: avoid implicit prems; wenzelm parents: 21404 diff changeset	285	assume A then have "A \<or> \<not> A" ..
59031 4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	286	with \<open>\<not> (A \<or> \<not> A)\<close> show \<bottom> by (rule contradiction)
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	287	qed
23373 ead82c82da9e tuned proofs: avoid implicit prems; wenzelm parents: 21404 diff changeset	288	then have "A \<or> \<not> A" ..
59031 4c3bb56b8ce7 misc tuning and modernization; wenzelm parents: 58889 diff changeset	289	with \<open>\<not> (A \<or> \<not> A)\<close> show \<bottom> by (rule contradiction)
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	290	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	291	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	292
60769 cf7f3465eaf1 tuned proofs; wenzelm parents: 59031 diff changeset	293	theorem (in classical) classical_cases: "(A \<Longrightarrow> C) \<Longrightarrow> (\<not> A \<Longrightarrow> C) \<Longrightarrow> C"
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	294	proof -
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	295	assume r1: "A \<Longrightarrow> C" and r2: "\<not> A \<Longrightarrow> C"
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	296	from tertium_non_datur show C
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	297	proof
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	298	assume A
23373 ead82c82da9e tuned proofs: avoid implicit prems; wenzelm parents: 21404 diff changeset	299	then show ?thesis by (rule r1)
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	300	next
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	301	assume "\<not> A"
23373 ead82c82da9e tuned proofs: avoid implicit prems; wenzelm parents: 21404 diff changeset	302	then show ?thesis by (rule r2)
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	303	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	304	qed
9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	305
12573 6226b35c04ca added lemma; wenzelm parents: 12394 diff changeset	306	lemma (in classical) "(\<not> A \<Longrightarrow> A) \<Longrightarrow> A" (* FIXME *)
6226b35c04ca added lemma; wenzelm parents: 12394 diff changeset	307	proof -
6226b35c04ca added lemma; wenzelm parents: 12394 diff changeset	308	assume r: "\<not> A \<Longrightarrow> A"
6226b35c04ca added lemma; wenzelm parents: 12394 diff changeset	309	show A
6226b35c04ca added lemma; wenzelm parents: 12394 diff changeset	310	proof (rule classical_cases)
23373 ead82c82da9e tuned proofs: avoid implicit prems; wenzelm parents: 21404 diff changeset	311	assume A then show A .
12573 6226b35c04ca added lemma; wenzelm parents: 12394 diff changeset	312	next
23373 ead82c82da9e tuned proofs: avoid implicit prems; wenzelm parents: 21404 diff changeset	313	assume "\<not> A" then show A by (rule r)
12573 6226b35c04ca added lemma; wenzelm parents: 12394 diff changeset	314	qed
6226b35c04ca added lemma; wenzelm parents: 12394 diff changeset	315	qed
6226b35c04ca added lemma; wenzelm parents: 12394 diff changeset	316
12360 9c156045c8f2 added Higher_Order_Logic.thy; wenzelm parents: diff changeset	317	end

author	haftmann
	Tue, 13 Oct 2015 09:21:15 +0200
changeset 61424	c3658c18b7bc
parent 60769	cf7f3465eaf1
child 61759	49353865e539
permissions	-rw-r--r--