author | wenzelm |
Wed, 14 May 2008 14:43:37 +0200 | |
changeset 26889 | ccea41fb5c39 |
parent 24893 | b8ef7afe3a6b |
child 35762 | af3ff2ba4c54 |
permissions | -rw-r--r-- |
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(* Title: ZF/bool.thy |
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ID: $Id$ |
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Author: Lawrence C Paulson, Cambridge University Computer Laboratory |
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Copyright 1992 University of Cambridge |
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*) |
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header{*Booleans in Zermelo-Fraenkel Set Theory*} |
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theory Bool imports pair begin |
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abbreviation |
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one ("1") where |
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"1 == succ(0)" |
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abbreviation |
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two ("2") where |
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"2 == succ(1)" |
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1c0926788772
ex/{bin.ML,comb.ML,prop.ML}: replaced NewSext by Syntax.simple_sext
lcp
parents:
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text{*2 is equal to bool, but is used as a number rather than a type.*} |
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definition "bool == {0,1}" |
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definition "cond(b,c,d) == if(b=1,c,d)" |
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definition "not(b) == cond(b,0,1)" |
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definition |
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"and" :: "[i,i]=>i" (infixl "and" 70) where |
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"a and b == cond(a,b,0)" |
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definition |
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or :: "[i,i]=>i" (infixl "or" 65) where |
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"a or b == cond(a,1,b)" |
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definition |
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xor :: "[i,i]=>i" (infixl "xor" 65) where |
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"a xor b == cond(a,not(b),b)" |
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lemmas bool_defs = bool_def cond_def |
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lemma singleton_0: "{0} = 1" |
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by (simp add: succ_def) |
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(* Introduction rules *) |
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lemma bool_1I [simp,TC]: "1 : bool" |
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by (simp add: bool_defs ) |
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lemma bool_0I [simp,TC]: "0 : bool" |
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by (simp add: bool_defs) |
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lemma one_not_0: "1~=0" |
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by (simp add: bool_defs ) |
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(** 1=0 ==> R **) |
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lemmas one_neq_0 = one_not_0 [THEN notE, standard] |
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lemma boolE: |
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"[| c: bool; c=1 ==> P; c=0 ==> P |] ==> P" |
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by (simp add: bool_defs, blast) |
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(** cond **) |
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(*1 means true*) |
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lemma cond_1 [simp]: "cond(1,c,d) = c" |
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by (simp add: bool_defs ) |
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(*0 means false*) |
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lemma cond_0 [simp]: "cond(0,c,d) = d" |
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by (simp add: bool_defs ) |
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lemma cond_type [TC]: "[| b: bool; c: A(1); d: A(0) |] ==> cond(b,c,d): A(b)" |
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by (simp add: bool_defs, blast) |
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(*For Simp_tac and Blast_tac*) |
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lemma cond_simple_type: "[| b: bool; c: A; d: A |] ==> cond(b,c,d): A" |
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by (simp add: bool_defs ) |
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lemma def_cond_1: "[| !!b. j(b)==cond(b,c,d) |] ==> j(1) = c" |
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by simp |
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lemma def_cond_0: "[| !!b. j(b)==cond(b,c,d) |] ==> j(0) = d" |
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by simp |
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lemmas not_1 = not_def [THEN def_cond_1, standard, simp] |
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lemmas not_0 = not_def [THEN def_cond_0, standard, simp] |
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lemmas and_1 = and_def [THEN def_cond_1, standard, simp] |
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lemmas and_0 = and_def [THEN def_cond_0, standard, simp] |
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lemmas or_1 = or_def [THEN def_cond_1, standard, simp] |
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lemmas or_0 = or_def [THEN def_cond_0, standard, simp] |
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lemmas xor_1 = xor_def [THEN def_cond_1, standard, simp] |
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lemmas xor_0 = xor_def [THEN def_cond_0, standard, simp] |
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lemma not_type [TC]: "a:bool ==> not(a) : bool" |
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by (simp add: not_def) |
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lemma and_type [TC]: "[| a:bool; b:bool |] ==> a and b : bool" |
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by (simp add: and_def) |
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lemma or_type [TC]: "[| a:bool; b:bool |] ==> a or b : bool" |
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by (simp add: or_def) |
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lemma xor_type [TC]: "[| a:bool; b:bool |] ==> a xor b : bool" |
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by (simp add: xor_def) |
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lemmas bool_typechecks = bool_1I bool_0I cond_type not_type and_type |
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or_type xor_type |
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subsection{*Laws About 'not' *} |
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lemma not_not [simp]: "a:bool ==> not(not(a)) = a" |
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by (elim boolE, auto) |
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lemma not_and [simp]: "a:bool ==> not(a and b) = not(a) or not(b)" |
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by (elim boolE, auto) |
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lemma not_or [simp]: "a:bool ==> not(a or b) = not(a) and not(b)" |
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by (elim boolE, auto) |
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subsection{*Laws About 'and' *} |
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lemma and_absorb [simp]: "a: bool ==> a and a = a" |
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by (elim boolE, auto) |
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lemma and_commute: "[| a: bool; b:bool |] ==> a and b = b and a" |
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by (elim boolE, auto) |
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lemma and_assoc: "a: bool ==> (a and b) and c = a and (b and c)" |
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by (elim boolE, auto) |
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lemma and_or_distrib: "[| a: bool; b:bool; c:bool |] ==> |
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(a or b) and c = (a and c) or (b and c)" |
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by (elim boolE, auto) |
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subsection{*Laws About 'or' *} |
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lemma or_absorb [simp]: "a: bool ==> a or a = a" |
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by (elim boolE, auto) |
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lemma or_commute: "[| a: bool; b:bool |] ==> a or b = b or a" |
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by (elim boolE, auto) |
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lemma or_assoc: "a: bool ==> (a or b) or c = a or (b or c)" |
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by (elim boolE, auto) |
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lemma or_and_distrib: "[| a: bool; b: bool; c: bool |] ==> |
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(a and b) or c = (a or c) and (b or c)" |
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by (elim boolE, auto) |
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definition |
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bool_of_o :: "o=>i" where |
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"bool_of_o(P) == (if P then 1 else 0)" |
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lemma [simp]: "bool_of_o(True) = 1" |
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by (simp add: bool_of_o_def) |
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lemma [simp]: "bool_of_o(False) = 0" |
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by (simp add: bool_of_o_def) |
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lemma [simp,TC]: "bool_of_o(P) \<in> bool" |
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by (simp add: bool_of_o_def) |
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lemma [simp]: "(bool_of_o(P) = 1) <-> P" |
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by (simp add: bool_of_o_def) |
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lemma [simp]: "(bool_of_o(P) = 0) <-> ~P" |
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by (simp add: bool_of_o_def) |
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ML |
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{* |
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val bool_def = thm "bool_def"; |
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val bool_defs = thms "bool_defs"; |
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val singleton_0 = thm "singleton_0"; |
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val bool_1I = thm "bool_1I"; |
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val bool_0I = thm "bool_0I"; |
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val one_not_0 = thm "one_not_0"; |
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val one_neq_0 = thm "one_neq_0"; |
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val boolE = thm "boolE"; |
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val cond_1 = thm "cond_1"; |
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val cond_0 = thm "cond_0"; |
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val cond_type = thm "cond_type"; |
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val cond_simple_type = thm "cond_simple_type"; |
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val def_cond_1 = thm "def_cond_1"; |
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val def_cond_0 = thm "def_cond_0"; |
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val not_1 = thm "not_1"; |
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val not_0 = thm "not_0"; |
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val and_1 = thm "and_1"; |
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val and_0 = thm "and_0"; |
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val or_1 = thm "or_1"; |
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val or_0 = thm "or_0"; |
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val xor_1 = thm "xor_1"; |
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val xor_0 = thm "xor_0"; |
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val not_type = thm "not_type"; |
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val and_type = thm "and_type"; |
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val or_type = thm "or_type"; |
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val xor_type = thm "xor_type"; |
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val bool_typechecks = thms "bool_typechecks"; |
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val not_not = thm "not_not"; |
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val not_and = thm "not_and"; |
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val not_or = thm "not_or"; |
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val and_absorb = thm "and_absorb"; |
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val and_commute = thm "and_commute"; |
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val and_assoc = thm "and_assoc"; |
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val and_or_distrib = thm "and_or_distrib"; |
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val or_absorb = thm "or_absorb"; |
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val or_commute = thm "or_commute"; |
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val or_assoc = thm "or_assoc"; |
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val or_and_distrib = thm "or_and_distrib"; |
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*} |
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end |