(* Title: ZF/Integ/Int.thy ID: $Id: Int.thy,v 1.17 2005/06/17 14:15:11 haftmann Exp $ Author: Lawrence C Paulson, Cambridge University Computer Laboratory Copyright 1993 University of Cambridge *) header{*The Integers as Equivalence Classes Over Pairs of Natural Numbers*} theory Int imports EquivClass ArithSimp begin constdefs intrel :: i "intrel == {p : (nat*nat)*(nat*nat). \x1 y1 x2 y2. p=<,> & x1#+y2 = x2#+y1}" int :: i "int == (nat*nat)//intrel" int_of :: "i=>i" --{*coercion from nat to int*} ("$# _" [80] 80) "$# m == intrel `` {}" intify :: "i=>i" --{*coercion from ANYTHING to int*} "intify(m) == if m : int then m else $#0" raw_zminus :: "i=>i" "raw_zminus(z) == \\z. intrel``{}" zminus :: "i=>i" ("$- _" [80] 80) "$- z == raw_zminus (intify(z))" znegative :: "i=>o" "znegative(z) == \x y. xnat & \z" iszero :: "i=>o" "iszero(z) == z = $# 0" raw_nat_of :: "i=>i" "raw_nat_of(z) == natify (\\z. x#-y)" nat_of :: "i=>i" "nat_of(z) == raw_nat_of (intify(z))" zmagnitude :: "i=>i" --{*could be replaced by an absolute value function from int to int?*} "zmagnitude(z) == THE m. m\nat & ((~ znegative(z) & z = $# m) | (znegative(z) & $- z = $# m))" raw_zmult :: "[i,i]=>i" (*Cannot use UN here or in zadd because of the form of congruent2. Perhaps a "curried" or even polymorphic congruent predicate would be better.*) "raw_zmult(z1,z2) == \p1\z1. \p2\z2. split(%x1 y1. split(%x2 y2. intrel``{}, p2), p1)" zmult :: "[i,i]=>i" (infixl "$*" 70) "z1 $* z2 == raw_zmult (intify(z1),intify(z2))" raw_zadd :: "[i,i]=>i" "raw_zadd (z1, z2) == \z1\z1. \z2\z2. let =z1; =z2 in intrel``{}" zadd :: "[i,i]=>i" (infixl "$+" 65) "z1 $+ z2 == raw_zadd (intify(z1),intify(z2))" zdiff :: "[i,i]=>i" (infixl "$-" 65) "z1 $- z2 == z1 $+ zminus(z2)" zless :: "[i,i]=>o" (infixl "$<" 50) "z1 $< z2 == znegative(z1 $- z2)" zle :: "[i,i]=>o" (infixl "$<=" 50) "z1 $<= z2 == z1 $< z2 | intify(z1)=intify(z2)" syntax (xsymbols) zmult :: "[i,i]=>i" (infixl "$\" 70) zle :: "[i,i]=>o" (infixl "$\" 50) --{*less than or equals*} syntax (HTML output) zmult :: "[i,i]=>i" (infixl "$\" 70) zle :: "[i,i]=>o" (infixl "$\" 50) declare quotientE [elim!] subsection{*Proving that @{term intrel} is an equivalence relation*} (** Natural deduction for intrel **) lemma intrel_iff [simp]: "<,>: intrel <-> x1\nat & y1\nat & x2\nat & y2\nat & x1#+y2 = x2#+y1" by (simp add: intrel_def) lemma intrelI [intro!]: "[| x1#+y2 = x2#+y1; x1\nat; y1\nat; x2\nat; y2\nat |] ==> <,>: intrel" by (simp add: intrel_def) lemma intrelE [elim!]: "[| p: intrel; !!x1 y1 x2 y2. [| p = <,>; x1#+y2 = x2#+y1; x1\nat; y1\nat; x2\nat; y2\nat |] ==> Q |] ==> Q" by (simp add: intrel_def, blast) lemma int_trans_lemma: "[| x1 #+ y2 = x2 #+ y1; x2 #+ y3 = x3 #+ y2 |] ==> x1 #+ y3 = x3 #+ y1" apply (rule sym) apply (erule add_left_cancel)+ apply (simp_all (no_asm_simp)) done lemma equiv_intrel: "equiv(nat*nat, intrel)" apply (simp add: equiv_def refl_def sym_def trans_def) apply (fast elim!: sym int_trans_lemma) done lemma image_intrel_int: "[| m\nat; n\nat |] ==> intrel `` {} : int" by (simp add: int_def) declare equiv_intrel [THEN eq_equiv_class_iff, simp] declare conj_cong [cong] lemmas eq_intrelD = eq_equiv_class [OF _ equiv_intrel] (** int_of: the injection from nat to int **) lemma int_of_type [simp,TC]: "$#m : int" by (simp add: int_def quotient_def int_of_def, auto) lemma int_of_eq [iff]: "($# m = $# n) <-> natify(m)=natify(n)" by (simp add: int_of_def) lemma int_of_inject: "[| $#m = $#n; m\nat; n\nat |] ==> m=n" by (drule int_of_eq [THEN iffD1], auto) (** intify: coercion from anything to int **) lemma intify_in_int [iff,TC]: "intify(x) : int" by (simp add: intify_def) lemma intify_ident [simp]: "n : int ==> intify(n) = n" by (simp add: intify_def) subsection{*Collapsing rules: to remove @{term intify} from arithmetic expressions*} lemma intify_idem [simp]: "intify(intify(x)) = intify(x)" by simp lemma int_of_natify [simp]: "$# (natify(m)) = $# m" by (simp add: int_of_def) lemma zminus_intify [simp]: "$- (intify(m)) = $- m" by (simp add: zminus_def) (** Addition **) lemma zadd_intify1 [simp]: "intify(x) $+ y = x $+ y" by (simp add: zadd_def) lemma zadd_intify2 [simp]: "x $+ intify(y) = x $+ y" by (simp add: zadd_def) (** Subtraction **) lemma zdiff_intify1 [simp]:"intify(x) $- y = x $- y" by (simp add: zdiff_def) lemma zdiff_intify2 [simp]:"x $- intify(y) = x $- y" by (simp add: zdiff_def) (** Multiplication **) lemma zmult_intify1 [simp]:"intify(x) $* y = x $* y" by (simp add: zmult_def) lemma zmult_intify2 [simp]:"x $* intify(y) = x $* y" by (simp add: zmult_def) (** Orderings **) lemma zless_intify1 [simp]:"intify(x) $< y <-> x $< y" by (simp add: zless_def) lemma zless_intify2 [simp]:"x $< intify(y) <-> x $< y" by (simp add: zless_def) lemma zle_intify1 [simp]:"intify(x) $<= y <-> x $<= y" by (simp add: zle_def) lemma zle_intify2 [simp]:"x $<= intify(y) <-> x $<= y" by (simp add: zle_def) subsection{*@{term zminus}: unary negation on @{term int}*} lemma zminus_congruent: "(%. intrel``{}) respects intrel" by (auto simp add: congruent_def add_ac) lemma raw_zminus_type: "z : int ==> raw_zminus(z) : int" apply (simp add: int_def raw_zminus_def) apply (typecheck add: UN_equiv_class_type [OF equiv_intrel zminus_congruent]) done lemma zminus_type [TC,iff]: "$-z : int" by (simp add: zminus_def raw_zminus_type) lemma raw_zminus_inject: "[| raw_zminus(z) = raw_zminus(w); z: int; w: int |] ==> z=w" apply (simp add: int_def raw_zminus_def) apply (erule UN_equiv_class_inject [OF equiv_intrel zminus_congruent], safe) apply (auto dest: eq_intrelD simp add: add_ac) done lemma zminus_inject_intify [dest!]: "$-z = $-w ==> intify(z) = intify(w)" apply (simp add: zminus_def) apply (blast dest!: raw_zminus_inject) done lemma zminus_inject: "[| $-z = $-w; z: int; w: int |] ==> z=w" by auto lemma raw_zminus: "[| x\nat; y\nat |] ==> raw_zminus(intrel``{}) = intrel `` {}" apply (simp add: raw_zminus_def UN_equiv_class [OF equiv_intrel zminus_congruent]) done lemma zminus: "[| x\nat; y\nat |] ==> $- (intrel``{}) = intrel `` {}" by (simp add: zminus_def raw_zminus image_intrel_int) lemma raw_zminus_zminus: "z : int ==> raw_zminus (raw_zminus(z)) = z" by (auto simp add: int_def raw_zminus) lemma zminus_zminus_intify [simp]: "$- ($- z) = intify(z)" by (simp add: zminus_def raw_zminus_type raw_zminus_zminus) lemma zminus_int0 [simp]: "$- ($#0) = $#0" by (simp add: int_of_def zminus) lemma zminus_zminus: "z : int ==> $- ($- z) = z" by simp subsection{*@{term znegative}: the test for negative integers*} lemma znegative: "[| x\nat; y\nat |] ==> znegative(intrel``{}) <-> x natify(n)=0" by (simp add: znegative int_of_def zminus Ord_0_lt_iff [THEN iff_sym]) subsection{*@{term nat_of}: Coercion of an Integer to a Natural Number*} lemma nat_of_intify [simp]: "nat_of(intify(z)) = nat_of(z)" by (simp add: nat_of_def) lemma nat_of_congruent: "(\x. (\\x,y\. x #- y)(x)) respects intrel" by (auto simp add: congruent_def split add: nat_diff_split) lemma raw_nat_of: "[| x\nat; y\nat |] ==> raw_nat_of(intrel``{}) = x#-y" by (simp add: raw_nat_of_def UN_equiv_class [OF equiv_intrel nat_of_congruent]) lemma raw_nat_of_int_of: "raw_nat_of($# n) = natify(n)" by (simp add: int_of_def raw_nat_of) lemma nat_of_int_of [simp]: "nat_of($# n) = natify(n)" by (simp add: raw_nat_of_int_of nat_of_def) lemma raw_nat_of_type: "raw_nat_of(z) \ nat" by (simp add: raw_nat_of_def) lemma nat_of_type [iff,TC]: "nat_of(z) \ nat" by (simp add: nat_of_def raw_nat_of_type) subsection{*zmagnitude: magnitide of an integer, as a natural number*} lemma zmagnitude_int_of [simp]: "zmagnitude($# n) = natify(n)" by (auto simp add: zmagnitude_def int_of_eq) lemma natify_int_of_eq: "natify(x)=n ==> $#x = $# n" apply (drule sym) apply (simp (no_asm_simp) add: int_of_eq) done lemma zmagnitude_zminus_int_of [simp]: "zmagnitude($- $# n) = natify(n)" apply (simp add: zmagnitude_def) apply (rule the_equality) apply (auto dest!: not_znegative_imp_zero natify_int_of_eq iff del: int_of_eq, auto) done lemma zmagnitude_type [iff,TC]: "zmagnitude(z)\nat" apply (simp add: zmagnitude_def) apply (rule theI2, auto) done lemma not_zneg_int_of: "[| z: int; ~ znegative(z) |] ==> \n\nat. z = $# n" apply (auto simp add: int_def znegative int_of_def not_lt_iff_le) apply (rename_tac x y) apply (rule_tac x="x#-y" in bexI) apply (auto simp add: add_diff_inverse2) done lemma not_zneg_mag [simp]: "[| z: int; ~ znegative(z) |] ==> $# (zmagnitude(z)) = z" by (drule not_zneg_int_of, auto) lemma zneg_int_of: "[| znegative(z); z: int |] ==> \n\nat. z = $- ($# succ(n))" by (auto simp add: int_def znegative zminus int_of_def dest!: less_imp_succ_add) lemma zneg_mag [simp]: "[| znegative(z); z: int |] ==> $# (zmagnitude(z)) = $- z" by (drule zneg_int_of, auto) lemma int_cases: "z : int ==> \n\nat. z = $# n | z = $- ($# succ(n))" apply (case_tac "znegative (z) ") prefer 2 apply (blast dest: not_zneg_mag sym) apply (blast dest: zneg_int_of) done lemma not_zneg_raw_nat_of: "[| ~ znegative(z); z: int |] ==> $# (raw_nat_of(z)) = z" apply (drule not_zneg_int_of) apply (auto simp add: raw_nat_of_type raw_nat_of_int_of) done lemma not_zneg_nat_of_intify: "~ znegative(intify(z)) ==> $# (nat_of(z)) = intify(z)" by (simp (no_asm_simp) add: nat_of_def not_zneg_raw_nat_of) lemma not_zneg_nat_of: "[| ~ znegative(z); z: int |] ==> $# (nat_of(z)) = z" apply (simp (no_asm_simp) add: not_zneg_nat_of_intify) done lemma zneg_nat_of [simp]: "znegative(intify(z)) ==> nat_of(z) = 0" apply (subgoal_tac "intify(z) \ int") apply (simp add: int_def) apply (auto simp add: znegative nat_of_def raw_nat_of split add: nat_diff_split) done subsection{*@{term zadd}: addition on int*} text{*Congruence Property for Addition*} lemma zadd_congruent2: "(%z1 z2. let =z1; =z2 in intrel``{}) respects2 intrel" apply (simp add: congruent2_def) (*Proof via congruent2_commuteI seems longer*) apply safe apply (simp (no_asm_simp) add: add_assoc Let_def) (*The rest should be trivial, but rearranging terms is hard add_ac does not help rewriting with the assumptions.*) apply (rule_tac m1 = x1a in add_left_commute [THEN ssubst]) apply (rule_tac m1 = x2a in add_left_commute [THEN ssubst]) apply (simp (no_asm_simp) add: add_assoc [symmetric]) done lemma raw_zadd_type: "[| z: int; w: int |] ==> raw_zadd(z,w) : int" apply (simp add: int_def raw_zadd_def) apply (rule UN_equiv_class_type2 [OF equiv_intrel zadd_congruent2], assumption+) apply (simp add: Let_def) done lemma zadd_type [iff,TC]: "z $+ w : int" by (simp add: zadd_def raw_zadd_type) lemma raw_zadd: "[| x1\nat; y1\nat; x2\nat; y2\nat |] ==> raw_zadd (intrel``{}, intrel``{}) = intrel `` {}" apply (simp add: raw_zadd_def UN_equiv_class2 [OF equiv_intrel equiv_intrel zadd_congruent2]) apply (simp add: Let_def) done lemma zadd: "[| x1\nat; y1\nat; x2\nat; y2\nat |] ==> (intrel``{}) $+ (intrel``{}) = intrel `` {}" by (simp add: zadd_def raw_zadd image_intrel_int) lemma raw_zadd_int0: "z : int ==> raw_zadd ($#0,z) = z" by (auto simp add: int_def int_of_def raw_zadd) lemma zadd_int0_intify [simp]: "$#0 $+ z = intify(z)" by (simp add: zadd_def raw_zadd_int0) lemma zadd_int0: "z: int ==> $#0 $+ z = z" by simp lemma raw_zminus_zadd_distrib: "[| z: int; w: int |] ==> $- raw_zadd(z,w) = raw_zadd($- z, $- w)" by (auto simp add: zminus raw_zadd int_def) lemma zminus_zadd_distrib [simp]: "$- (z $+ w) = $- z $+ $- w" by (simp add: zadd_def raw_zminus_zadd_distrib) lemma raw_zadd_commute: "[| z: int; w: int |] ==> raw_zadd(z,w) = raw_zadd(w,z)" by (auto simp add: raw_zadd add_ac int_def) lemma zadd_commute: "z $+ w = w $+ z" by (simp add: zadd_def raw_zadd_commute) lemma raw_zadd_assoc: "[| z1: int; z2: int; z3: int |] ==> raw_zadd (raw_zadd(z1,z2),z3) = raw_zadd(z1,raw_zadd(z2,z3))" by (auto simp add: int_def raw_zadd add_assoc) lemma zadd_assoc: "(z1 $+ z2) $+ z3 = z1 $+ (z2 $+ z3)" by (simp add: zadd_def raw_zadd_type raw_zadd_assoc) (*For AC rewriting*) lemma zadd_left_commute: "z1$+(z2$+z3) = z2$+(z1$+z3)" apply (simp add: zadd_assoc [symmetric]) apply (simp add: zadd_commute) done (*Integer addition is an AC operator*) lemmas zadd_ac = zadd_assoc zadd_commute zadd_left_commute lemma int_of_add: "$# (m #+ n) = ($#m) $+ ($#n)" by (simp add: int_of_def zadd) lemma int_succ_int_1: "$# succ(m) = $# 1 $+ ($# m)" by (simp add: int_of_add [symmetric] natify_succ) lemma int_of_diff: "[| m\nat; n le m |] ==> $# (m #- n) = ($#m) $- ($#n)" apply (simp add: int_of_def zdiff_def) apply (frule lt_nat_in_nat) apply (simp_all add: zadd zminus add_diff_inverse2) done lemma raw_zadd_zminus_inverse: "z : int ==> raw_zadd (z, $- z) = $#0" by (auto simp add: int_def int_of_def zminus raw_zadd add_commute) lemma zadd_zminus_inverse [simp]: "z $+ ($- z) = $#0" apply (simp add: zadd_def) apply (subst zminus_intify [symmetric]) apply (rule intify_in_int [THEN raw_zadd_zminus_inverse]) done lemma zadd_zminus_inverse2 [simp]: "($- z) $+ z = $#0" by (simp add: zadd_commute zadd_zminus_inverse) lemma zadd_int0_right_intify [simp]: "z $+ $#0 = intify(z)" by (rule trans [OF zadd_commute zadd_int0_intify]) lemma zadd_int0_right: "z:int ==> z $+ $#0 = z" by simp subsection{*@{term zmult}: Integer Multiplication*} text{*Congruence property for multiplication*} lemma zmult_congruent2: "(%p1 p2. split(%x1 y1. split(%x2 y2. intrel``{}, p2), p1)) respects2 intrel" apply (rule equiv_intrel [THEN congruent2_commuteI], auto) (*Proof that zmult is congruent in one argument*) apply (rename_tac x y) apply (frule_tac t = "%u. x#*u" in sym [THEN subst_context]) apply (drule_tac t = "%u. y#*u" in subst_context) apply (erule add_left_cancel)+ apply (simp_all add: add_mult_distrib_left) done lemma raw_zmult_type: "[| z: int; w: int |] ==> raw_zmult(z,w) : int" apply (simp add: int_def raw_zmult_def) apply (rule UN_equiv_class_type2 [OF equiv_intrel zmult_congruent2], assumption+) apply (simp add: Let_def) done lemma zmult_type [iff,TC]: "z $* w : int" by (simp add: zmult_def raw_zmult_type) lemma raw_zmult: "[| x1\nat; y1\nat; x2\nat; y2\nat |] ==> raw_zmult(intrel``{}, intrel``{}) = intrel `` {}" by (simp add: raw_zmult_def UN_equiv_class2 [OF equiv_intrel equiv_intrel zmult_congruent2]) lemma zmult: "[| x1\nat; y1\nat; x2\nat; y2\nat |] ==> (intrel``{}) $* (intrel``{}) = intrel `` {}" by (simp add: zmult_def raw_zmult image_intrel_int) lemma raw_zmult_int0: "z : int ==> raw_zmult ($#0,z) = $#0" by (auto simp add: int_def int_of_def raw_zmult) lemma zmult_int0 [simp]: "$#0 $* z = $#0" by (simp add: zmult_def raw_zmult_int0) lemma raw_zmult_int1: "z : int ==> raw_zmult ($#1,z) = z" by (auto simp add: int_def int_of_def raw_zmult) lemma zmult_int1_intify [simp]: "$#1 $* z = intify(z)" by (simp add: zmult_def raw_zmult_int1) lemma zmult_int1: "z : int ==> $#1 $* z = z" by simp lemma raw_zmult_commute: "[| z: int; w: int |] ==> raw_zmult(z,w) = raw_zmult(w,z)" by (auto simp add: int_def raw_zmult add_ac mult_ac) lemma zmult_commute: "z $* w = w $* z" by (simp add: zmult_def raw_zmult_commute) lemma raw_zmult_zminus: "[| z: int; w: int |] ==> raw_zmult($- z, w) = $- raw_zmult(z, w)" by (auto simp add: int_def zminus raw_zmult add_ac) lemma zmult_zminus [simp]: "($- z) $* w = $- (z $* w)" apply (simp add: zmult_def raw_zmult_zminus) apply (subst zminus_intify [symmetric], rule raw_zmult_zminus, auto) done lemma zmult_zminus_right [simp]: "w $* ($- z) = $- (w $* z)" by (simp add: zmult_commute [of w]) lemma raw_zmult_assoc: "[| z1: int; z2: int; z3: int |] ==> raw_zmult (raw_zmult(z1,z2),z3) = raw_zmult(z1,raw_zmult(z2,z3))" by (auto simp add: int_def raw_zmult add_mult_distrib_left add_ac mult_ac) lemma zmult_assoc: "(z1 $* z2) $* z3 = z1 $* (z2 $* z3)" by (simp add: zmult_def raw_zmult_type raw_zmult_assoc) (*For AC rewriting*) lemma zmult_left_commute: "z1$*(z2$*z3) = z2$*(z1$*z3)" apply (simp add: zmult_assoc [symmetric]) apply (simp add: zmult_commute) done (*Integer multiplication is an AC operator*) lemmas zmult_ac = zmult_assoc zmult_commute zmult_left_commute lemma raw_zadd_zmult_distrib: "[| z1: int; z2: int; w: int |] ==> raw_zmult(raw_zadd(z1,z2), w) = raw_zadd (raw_zmult(z1,w), raw_zmult(z2,w))" by (auto simp add: int_def raw_zadd raw_zmult add_mult_distrib_left add_ac mult_ac) lemma zadd_zmult_distrib: "(z1 $+ z2) $* w = (z1 $* w) $+ (z2 $* w)" by (simp add: zmult_def zadd_def raw_zadd_type raw_zmult_type raw_zadd_zmult_distrib) lemma zadd_zmult_distrib2: "w $* (z1 $+ z2) = (w $* z1) $+ (w $* z2)" by (simp add: zmult_commute [of w] zadd_zmult_distrib) lemmas int_typechecks = int_of_type zminus_type zmagnitude_type zadd_type zmult_type (*** Subtraction laws ***) lemma zdiff_type [iff,TC]: "z $- w : int" by (simp add: zdiff_def) lemma zminus_zdiff_eq [simp]: "$- (z $- y) = y $- z" by (simp add: zdiff_def zadd_commute) lemma zdiff_zmult_distrib: "(z1 $- z2) $* w = (z1 $* w) $- (z2 $* w)" apply (simp add: zdiff_def) apply (subst zadd_zmult_distrib) apply (simp add: zmult_zminus) done lemma zdiff_zmult_distrib2: "w $* (z1 $- z2) = (w $* z1) $- (w $* z2)" by (simp add: zmult_commute [of w] zdiff_zmult_distrib) lemma zadd_zdiff_eq: "x $+ (y $- z) = (x $+ y) $- z" by (simp add: zdiff_def zadd_ac) lemma zdiff_zadd_eq: "(x $- y) $+ z = (x $+ z) $- y" by (simp add: zdiff_def zadd_ac) subsection{*The "Less Than" Relation*} (*"Less than" is a linear ordering*) lemma zless_linear_lemma: "[| z: int; w: int |] ==> z$ (x ~= y) <-> (x $< y | y $< x)" by (cut_tac z = x and w = y in zless_linear, auto) lemma zless_imp_intify_neq: "w $< z ==> intify(w) ~= intify(z)" apply auto apply (subgoal_tac "~ (intify (w) $< intify (z))") apply (erule_tac [2] ssubst) apply (simp (no_asm_use)) apply auto done (*This lemma allows direct proofs of other <-properties*) lemma zless_imp_succ_zadd_lemma: "[| w $< z; w: int; z: int |] ==> (\n\nat. z = w $+ $#(succ(n)))" apply (simp add: zless_def znegative_def zdiff_def int_def) apply (auto dest!: less_imp_succ_add simp add: zadd zminus int_of_def) apply (rule_tac x = k in bexI) apply (erule add_left_cancel, auto) done lemma zless_imp_succ_zadd: "w $< z ==> (\n\nat. w $+ $#(succ(n)) = intify(z))" apply (subgoal_tac "intify (w) $< intify (z) ") apply (drule_tac w = "intify (w) " in zless_imp_succ_zadd_lemma) apply auto done lemma zless_succ_zadd_lemma: "w : int ==> w $< w $+ $# succ(n)" apply (simp add: zless_def znegative_def zdiff_def int_def) apply (auto simp add: zadd zminus int_of_def image_iff) apply (rule_tac x = 0 in exI, auto) done lemma zless_succ_zadd: "w $< w $+ $# succ(n)" by (cut_tac intify_in_int [THEN zless_succ_zadd_lemma], auto) lemma zless_iff_succ_zadd: "w $< z <-> (\n\nat. w $+ $#(succ(n)) = intify(z))" apply (rule iffI) apply (erule zless_imp_succ_zadd, auto) apply (rename_tac "n") apply (cut_tac w = w and n = n in zless_succ_zadd, auto) done lemma zless_int_of [simp]: "[| m\nat; n\nat |] ==> ($#m $< $#n) <-> (m x $< z" apply (simp add: zless_def znegative_def zdiff_def int_def) apply (auto simp add: zadd zminus image_iff) apply (rename_tac x1 x2 y1 y2) apply (rule_tac x = "x1#+x2" in exI) apply (rule_tac x = "y1#+y2" in exI) apply (auto simp add: add_lt_mono) apply (rule sym) apply (erule add_left_cancel)+ apply auto done lemma zless_trans: "[| x $< y; y $< z |] ==> x $< z" apply (subgoal_tac "intify (x) $< intify (z) ") apply (rule_tac [2] y = "intify (y) " in zless_trans_lemma) apply auto done lemma zless_not_sym: "z $< w ==> ~ (w $< z)" by (blast dest: zless_trans) (* [| z $< w; ~ P ==> w $< z |] ==> P *) lemmas zless_asym = zless_not_sym [THEN swap, standard] lemma zless_imp_zle: "z $< w ==> z $<= w" by (simp add: zle_def) lemma zle_linear: "z $<= w | w $<= z" apply (simp add: zle_def) apply (cut_tac zless_linear, blast) done subsection{*Less Than or Equals*} lemma zle_refl: "z $<= z" by (simp add: zle_def) lemma zle_eq_refl: "x=y ==> x $<= y" by (simp add: zle_refl) lemma zle_anti_sym_intify: "[| x $<= y; y $<= x |] ==> intify(x) = intify(y)" apply (simp add: zle_def, auto) apply (blast dest: zless_trans) done lemma zle_anti_sym: "[| x $<= y; y $<= x; x: int; y: int |] ==> x=y" by (drule zle_anti_sym_intify, auto) lemma zle_trans_lemma: "[| x: int; y: int; z: int; x $<= y; y $<= z |] ==> x $<= z" apply (simp add: zle_def, auto) apply (blast intro: zless_trans) done lemma zle_trans: "[| x $<= y; y $<= z |] ==> x $<= z" apply (subgoal_tac "intify (x) $<= intify (z) ") apply (rule_tac [2] y = "intify (y) " in zle_trans_lemma) apply auto done lemma zle_zless_trans: "[| i $<= j; j $< k |] ==> i $< k" apply (auto simp add: zle_def) apply (blast intro: zless_trans) apply (simp add: zless_def zdiff_def zadd_def) done lemma zless_zle_trans: "[| i $< j; j $<= k |] ==> i $< k" apply (auto simp add: zle_def) apply (blast intro: zless_trans) apply (simp add: zless_def zdiff_def zminus_def) done lemma not_zless_iff_zle: "~ (z $< w) <-> (w $<= z)" apply (cut_tac z = z and w = w in zless_linear) apply (auto dest: zless_trans simp add: zle_def) apply (auto dest!: zless_imp_intify_neq) done lemma not_zle_iff_zless: "~ (z $<= w) <-> (w $< z)" by (simp add: not_zless_iff_zle [THEN iff_sym]) subsection{*More subtraction laws (for @{text zcompare_rls})*} lemma zdiff_zdiff_eq: "(x $- y) $- z = x $- (y $+ z)" by (simp add: zdiff_def zadd_ac) lemma zdiff_zdiff_eq2: "x $- (y $- z) = (x $+ z) $- y" by (simp add: zdiff_def zadd_ac) lemma zdiff_zless_iff: "(x$-y $< z) <-> (x $< z $+ y)" by (simp add: zless_def zdiff_def zadd_ac) lemma zless_zdiff_iff: "(x $< z$-y) <-> (x $+ y $< z)" by (simp add: zless_def zdiff_def zadd_ac) lemma zdiff_eq_iff: "[| x: int; z: int |] ==> (x$-y = z) <-> (x = z $+ y)" by (auto simp add: zdiff_def zadd_assoc) lemma eq_zdiff_iff: "[| x: int; z: int |] ==> (x = z$-y) <-> (x $+ y = z)" by (auto simp add: zdiff_def zadd_assoc) lemma zdiff_zle_iff_lemma: "[| x: int; z: int |] ==> (x$-y $<= z) <-> (x $<= z $+ y)" by (auto simp add: zle_def zdiff_eq_iff zdiff_zless_iff) lemma zdiff_zle_iff: "(x$-y $<= z) <-> (x $<= z $+ y)" by (cut_tac zdiff_zle_iff_lemma [OF intify_in_int intify_in_int], simp) lemma zle_zdiff_iff_lemma: "[| x: int; z: int |] ==>(x $<= z$-y) <-> (x $+ y $<= z)" apply (auto simp add: zle_def zdiff_eq_iff zless_zdiff_iff) apply (auto simp add: zdiff_def zadd_assoc) done lemma zle_zdiff_iff: "(x $<= z$-y) <-> (x $+ y $<= z)" by (cut_tac zle_zdiff_iff_lemma [ OF intify_in_int intify_in_int], simp) text{*This list of rewrites simplifies (in)equalities by bringing subtractions to the top and then moving negative terms to the other side. Use with @{text zadd_ac}*} lemmas zcompare_rls = zdiff_def [symmetric] zadd_zdiff_eq zdiff_zadd_eq zdiff_zdiff_eq zdiff_zdiff_eq2 zdiff_zless_iff zless_zdiff_iff zdiff_zle_iff zle_zdiff_iff zdiff_eq_iff eq_zdiff_iff subsection{*Monotonicity and Cancellation Results for Instantiation of the CancelNumerals Simprocs*} lemma zadd_left_cancel: "[| w: int; w': int |] ==> (z $+ w' = z $+ w) <-> (w' = w)" apply safe apply (drule_tac t = "%x. x $+ ($-z) " in subst_context) apply (simp add: zadd_ac) done lemma zadd_left_cancel_intify [simp]: "(z $+ w' = z $+ w) <-> intify(w') = intify(w)" apply (rule iff_trans) apply (rule_tac [2] zadd_left_cancel, auto) done lemma zadd_right_cancel: "[| w: int; w': int |] ==> (w' $+ z = w $+ z) <-> (w' = w)" apply safe apply (drule_tac t = "%x. x $+ ($-z) " in subst_context) apply (simp add: zadd_ac) done lemma zadd_right_cancel_intify [simp]: "(w' $+ z = w $+ z) <-> intify(w') = intify(w)" apply (rule iff_trans) apply (rule_tac [2] zadd_right_cancel, auto) done lemma zadd_right_cancel_zless [simp]: "(w' $+ z $< w $+ z) <-> (w' $< w)" by (simp add: zdiff_zless_iff [THEN iff_sym] zdiff_def zadd_assoc) lemma zadd_left_cancel_zless [simp]: "(z $+ w' $< z $+ w) <-> (w' $< w)" by (simp add: zadd_commute [of z] zadd_right_cancel_zless) lemma zadd_right_cancel_zle [simp]: "(w' $+ z $<= w $+ z) <-> w' $<= w" by (simp add: zle_def) lemma zadd_left_cancel_zle [simp]: "(z $+ w' $<= z $+ w) <-> w' $<= w" by (simp add: zadd_commute [of z] zadd_right_cancel_zle) (*"v $<= w ==> v$+z $<= w$+z"*) lemmas zadd_zless_mono1 = zadd_right_cancel_zless [THEN iffD2, standard] (*"v $<= w ==> z$+v $<= z$+w"*) lemmas zadd_zless_mono2 = zadd_left_cancel_zless [THEN iffD2, standard] (*"v $<= w ==> v$+z $<= w$+z"*) lemmas zadd_zle_mono1 = zadd_right_cancel_zle [THEN iffD2, standard] (*"v $<= w ==> z$+v $<= z$+w"*) lemmas zadd_zle_mono2 = zadd_left_cancel_zle [THEN iffD2, standard] lemma zadd_zle_mono: "[| w' $<= w; z' $<= z |] ==> w' $+ z' $<= w $+ z" by (erule zadd_zle_mono1 [THEN zle_trans], simp) lemma zadd_zless_mono: "[| w' $< w; z' $<= z |] ==> w' $+ z' $< w $+ z" by (erule zadd_zless_mono1 [THEN zless_zle_trans], simp) subsection{*Comparison laws*} lemma zminus_zless_zminus [simp]: "($- x $< $- y) <-> (y $< x)" by (simp add: zless_def zdiff_def zadd_ac) lemma zminus_zle_zminus [simp]: "($- x $<= $- y) <-> (y $<= x)" by (simp add: not_zless_iff_zle [THEN iff_sym]) subsubsection{*More inequality lemmas*} lemma equation_zminus: "[| x: int; y: int |] ==> (x = $- y) <-> (y = $- x)" by auto lemma zminus_equation: "[| x: int; y: int |] ==> ($- x = y) <-> ($- y = x)" by auto lemma equation_zminus_intify: "(intify(x) = $- y) <-> (intify(y) = $- x)" apply (cut_tac x = "intify (x) " and y = "intify (y) " in equation_zminus) apply auto done lemma zminus_equation_intify: "($- x = intify(y)) <-> ($- y = intify(x))" apply (cut_tac x = "intify (x) " and y = "intify (y) " in zminus_equation) apply auto done subsubsection{*The next several equations are permutative: watch out!*} lemma zless_zminus: "(x $< $- y) <-> (y $< $- x)" by (simp add: zless_def zdiff_def zadd_ac) lemma zminus_zless: "($- x $< y) <-> ($- y $< x)" by (simp add: zless_def zdiff_def zadd_ac) lemma zle_zminus: "(x $<= $- y) <-> (y $<= $- x)" by (simp add: not_zless_iff_zle [THEN iff_sym] zminus_zless) lemma zminus_zle: "($- x $<= y) <-> ($- y $<= x)" by (simp add: not_zless_iff_zle [THEN iff_sym] zless_zminus) ML {* val zdiff_def = thm "zdiff_def"; val int_of_type = thm "int_of_type"; val int_of_eq = thm "int_of_eq"; val int_of_inject = thm "int_of_inject"; val intify_in_int = thm "intify_in_int"; val intify_ident = thm "intify_ident"; val intify_idem = thm "intify_idem"; val int_of_natify = thm "int_of_natify"; val zminus_intify = thm "zminus_intify"; val zadd_intify1 = thm "zadd_intify1"; val zadd_intify2 = thm "zadd_intify2"; val zdiff_intify1 = thm "zdiff_intify1"; val zdiff_intify2 = thm "zdiff_intify2"; val zmult_intify1 = thm "zmult_intify1"; val zmult_intify2 = thm "zmult_intify2"; val zless_intify1 = thm "zless_intify1"; val zless_intify2 = thm "zless_intify2"; val zle_intify1 = thm "zle_intify1"; val zle_intify2 = thm "zle_intify2"; val zminus_congruent = thm "zminus_congruent"; val zminus_type = thm "zminus_type"; val zminus_inject_intify = thm "zminus_inject_intify"; val zminus_inject = thm "zminus_inject"; val zminus = thm "zminus"; val zminus_zminus_intify = thm "zminus_zminus_intify"; val zminus_int0 = thm "zminus_int0"; val zminus_zminus = thm "zminus_zminus"; val not_znegative_int_of = thm "not_znegative_int_of"; val znegative_zminus_int_of = thm "znegative_zminus_int_of"; val not_znegative_imp_zero = thm "not_znegative_imp_zero"; val nat_of_intify = thm "nat_of_intify"; val nat_of_int_of = thm "nat_of_int_of"; val nat_of_type = thm "nat_of_type"; val zmagnitude_int_of = thm "zmagnitude_int_of"; val natify_int_of_eq = thm "natify_int_of_eq"; val zmagnitude_zminus_int_of = thm "zmagnitude_zminus_int_of"; val zmagnitude_type = thm "zmagnitude_type"; val not_zneg_int_of = thm "not_zneg_int_of"; val not_zneg_mag = thm "not_zneg_mag"; val zneg_int_of = thm "zneg_int_of"; val zneg_mag = thm "zneg_mag"; val int_cases = thm "int_cases"; val not_zneg_nat_of_intify = thm "not_zneg_nat_of_intify"; val not_zneg_nat_of = thm "not_zneg_nat_of"; val zneg_nat_of = thm "zneg_nat_of"; val zadd_congruent2 = thm "zadd_congruent2"; val zadd_type = thm "zadd_type"; val zadd = thm "zadd"; val zadd_int0_intify = thm "zadd_int0_intify"; val zadd_int0 = thm "zadd_int0"; val zminus_zadd_distrib = thm "zminus_zadd_distrib"; val zadd_commute = thm "zadd_commute"; val zadd_assoc = thm "zadd_assoc"; val zadd_left_commute = thm "zadd_left_commute"; val zadd_ac = thms "zadd_ac"; val int_of_add = thm "int_of_add"; val int_succ_int_1 = thm "int_succ_int_1"; val int_of_diff = thm "int_of_diff"; val zadd_zminus_inverse = thm "zadd_zminus_inverse"; val zadd_zminus_inverse2 = thm "zadd_zminus_inverse2"; val zadd_int0_right_intify = thm "zadd_int0_right_intify"; val zadd_int0_right = thm "zadd_int0_right"; val zmult_congruent2 = thm "zmult_congruent2"; val zmult_type = thm "zmult_type"; val zmult = thm "zmult"; val zmult_int0 = thm "zmult_int0"; val zmult_int1_intify = thm "zmult_int1_intify"; val zmult_int1 = thm "zmult_int1"; val zmult_commute = thm "zmult_commute"; val zmult_zminus = thm "zmult_zminus"; val zmult_zminus_right = thm "zmult_zminus_right"; val zmult_assoc = thm "zmult_assoc"; val zmult_left_commute = thm "zmult_left_commute"; val zmult_ac = thms "zmult_ac"; val zadd_zmult_distrib = thm "zadd_zmult_distrib"; val zadd_zmult_distrib2 = thm "zadd_zmult_distrib2"; val int_typechecks = thms "int_typechecks"; val zdiff_type = thm "zdiff_type"; val zminus_zdiff_eq = thm "zminus_zdiff_eq"; val zdiff_zmult_distrib = thm "zdiff_zmult_distrib"; val zdiff_zmult_distrib2 = thm "zdiff_zmult_distrib2"; val zadd_zdiff_eq = thm "zadd_zdiff_eq"; val zdiff_zadd_eq = thm "zdiff_zadd_eq"; val zless_linear = thm "zless_linear"; val zless_not_refl = thm "zless_not_refl"; val neq_iff_zless = thm "neq_iff_zless"; val zless_imp_intify_neq = thm "zless_imp_intify_neq"; val zless_imp_succ_zadd = thm "zless_imp_succ_zadd"; val zless_succ_zadd = thm "zless_succ_zadd"; val zless_iff_succ_zadd = thm "zless_iff_succ_zadd"; val zless_int_of = thm "zless_int_of"; val zless_trans = thm "zless_trans"; val zless_not_sym = thm "zless_not_sym"; val zless_asym = thm "zless_asym"; val zless_imp_zle = thm "zless_imp_zle"; val zle_linear = thm "zle_linear"; val zle_refl = thm "zle_refl"; val zle_eq_refl = thm "zle_eq_refl"; val zle_anti_sym_intify = thm "zle_anti_sym_intify"; val zle_anti_sym = thm "zle_anti_sym"; val zle_trans = thm "zle_trans"; val zle_zless_trans = thm "zle_zless_trans"; val zless_zle_trans = thm "zless_zle_trans"; val not_zless_iff_zle = thm "not_zless_iff_zle"; val not_zle_iff_zless = thm "not_zle_iff_zless"; val zdiff_zdiff_eq = thm "zdiff_zdiff_eq"; val zdiff_zdiff_eq2 = thm "zdiff_zdiff_eq2"; val zdiff_zless_iff = thm "zdiff_zless_iff"; val zless_zdiff_iff = thm "zless_zdiff_iff"; val zdiff_eq_iff = thm "zdiff_eq_iff"; val eq_zdiff_iff = thm "eq_zdiff_iff"; val zdiff_zle_iff = thm "zdiff_zle_iff"; val zle_zdiff_iff = thm "zle_zdiff_iff"; val zcompare_rls = thms "zcompare_rls"; val zadd_left_cancel = thm "zadd_left_cancel"; val zadd_left_cancel_intify = thm "zadd_left_cancel_intify"; val zadd_right_cancel = thm "zadd_right_cancel"; val zadd_right_cancel_intify = thm "zadd_right_cancel_intify"; val zadd_right_cancel_zless = thm "zadd_right_cancel_zless"; val zadd_left_cancel_zless = thm "zadd_left_cancel_zless"; val zadd_right_cancel_zle = thm "zadd_right_cancel_zle"; val zadd_left_cancel_zle = thm "zadd_left_cancel_zle"; val zadd_zless_mono1 = thm "zadd_zless_mono1"; val zadd_zless_mono2 = thm "zadd_zless_mono2"; val zadd_zle_mono1 = thm "zadd_zle_mono1"; val zadd_zle_mono2 = thm "zadd_zle_mono2"; val zadd_zle_mono = thm "zadd_zle_mono"; val zadd_zless_mono = thm "zadd_zless_mono"; val zminus_zless_zminus = thm "zminus_zless_zminus"; val zminus_zle_zminus = thm "zminus_zle_zminus"; val equation_zminus = thm "equation_zminus"; val zminus_equation = thm "zminus_equation"; val equation_zminus_intify = thm "equation_zminus_intify"; val zminus_equation_intify = thm "zminus_equation_intify"; val zless_zminus = thm "zless_zminus"; val zminus_zless = thm "zminus_zless"; val zle_zminus = thm "zle_zminus"; val zminus_zle = thm "zminus_zle"; *} end