(* Title: HOL/equalities
ID: $Id$
Author: Lawrence C Paulson, Cambridge University Computer Laboratory
Copyright 1994 University of Cambridge
Equalities involving union, intersection, inclusion, etc.
*)
writeln"File HOL/equalities";
AddSIs [equalityI];
section "{}";
goal Set.thy "{x.False} = {}";
by (Fast_tac 1);
qed "Collect_False_empty";
Addsimps [Collect_False_empty];
goal Set.thy "(A <= {}) = (A = {})";
by (Fast_tac 1);
qed "subset_empty";
Addsimps [subset_empty];
section ":";
goal Set.thy "x ~: {}";
by (Fast_tac 1);
qed "in_empty";
Addsimps[in_empty];
goal Set.thy "x : insert y A = (x=y | x:A)";
by (Fast_tac 1);
qed "in_insert";
Addsimps[in_insert];
section "insert";
(*NOT SUITABLE FOR REWRITING since {a} == insert a {}*)
goal Set.thy "insert a A = {a} Un A";
by (Fast_tac 1);
qed "insert_is_Un";
goal Set.thy "insert a A ~= {}";
by (fast_tac (!claset addEs [equalityCE]) 1);
qed"insert_not_empty";
Addsimps[insert_not_empty];
bind_thm("empty_not_insert",insert_not_empty RS not_sym);
Addsimps[empty_not_insert];
goal Set.thy "!!a. a:A ==> insert a A = A";
by (Fast_tac 1);
qed "insert_absorb";
goal Set.thy "insert x (insert x A) = insert x A";
by (Fast_tac 1);
qed "insert_absorb2";
Addsimps [insert_absorb2];
goal Set.thy "insert x (insert y A) = insert y (insert x A)";
by (Fast_tac 1);
qed "insert_commute";
goal Set.thy "(insert x A <= B) = (x:B & A <= B)";
by (Fast_tac 1);
qed "insert_subset";
Addsimps[insert_subset];
(* use new B rather than (A-{a}) to avoid infinite unfolding *)
goal Set.thy "!!a. a:A ==> ? B. A = insert a B & a ~: B";
by (res_inst_tac [("x","A-{a}")] exI 1);
by (Fast_tac 1);
qed "mk_disjoint_insert";
goal Set.thy
"!!A. A~={} ==> (UN x:A. insert a (B x)) = insert a (UN x:A. B x)";
by (Fast_tac 1);
qed "UN_insert_distrib";
goal Set.thy "(UN x. insert a (B x)) = insert a (UN x. B x)";
by (Fast_tac 1);
qed "UN1_insert_distrib";
section "``";
goal Set.thy "f``{} = {}";
by (Fast_tac 1);
qed "image_empty";
Addsimps[image_empty];
goal Set.thy "f``insert a B = insert (f a) (f``B)";
by (Fast_tac 1);
qed "image_insert";
Addsimps[image_insert];
qed_goal "ball_image" Set.thy "(!y:F``S. P y) = (!x:S. P (F x))"
(fn _ => [Fast_tac 1]);
goalw Set.thy [image_def]
"(%x. if P x then f x else g x) `` S \
\ = (f `` ({x.x:S & P x})) Un (g `` ({x.x:S & ~(P x)}))";
by(split_tac [expand_if] 1);
by(Fast_tac 1);
qed "if_image_distrib";
Addsimps[if_image_distrib];
section "range";
qed_goal "ball_range" Set.thy "(!y:range f. P y) = (!x. P (f x))"
(fn _ => [Fast_tac 1]);
qed_goalw "image_range" Set.thy [image_def, range_def]
"f``range g = range (%x. f (g x))" (fn _ => [
rtac Collect_cong 1,
Fast_tac 1]);
section "Int";
goal Set.thy "A Int A = A";
by (Fast_tac 1);
qed "Int_absorb";
Addsimps[Int_absorb];
goal Set.thy "A Int B = B Int A";
by (Fast_tac 1);
qed "Int_commute";
goal Set.thy "(A Int B) Int C = A Int (B Int C)";
by (Fast_tac 1);
qed "Int_assoc";
goal Set.thy "{} Int B = {}";
by (Fast_tac 1);
qed "Int_empty_left";
Addsimps[Int_empty_left];
goal Set.thy "A Int {} = {}";
by (Fast_tac 1);
qed "Int_empty_right";
Addsimps[Int_empty_right];
goal Set.thy "UNIV Int B = B";
by (Fast_tac 1);
qed "Int_UNIV_left";
Addsimps[Int_UNIV_left];
goal Set.thy "A Int UNIV = A";
by (Fast_tac 1);
qed "Int_UNIV_right";
Addsimps[Int_UNIV_right];
goal Set.thy "A Int (B Un C) = (A Int B) Un (A Int C)";
by (Fast_tac 1);
qed "Int_Un_distrib";
goal Set.thy "(B Un C) Int A = (B Int A) Un (C Int A)";
by (Fast_tac 1);
qed "Int_Un_distrib2";
goal Set.thy "(A<=B) = (A Int B = A)";
by (fast_tac (!claset addSEs [equalityE]) 1);
qed "subset_Int_eq";
goal Set.thy "(A Int B = UNIV) = (A = UNIV & B = UNIV)";
by (fast_tac (!claset addEs [equalityCE]) 1);
qed "Int_UNIV";
Addsimps[Int_UNIV];
section "Un";
goal Set.thy "A Un A = A";
by (Fast_tac 1);
qed "Un_absorb";
Addsimps[Un_absorb];
goal Set.thy "A Un B = B Un A";
by (Fast_tac 1);
qed "Un_commute";
goal Set.thy "(A Un B) Un C = A Un (B Un C)";
by (Fast_tac 1);
qed "Un_assoc";
goal Set.thy "{} Un B = B";
by (Fast_tac 1);
qed "Un_empty_left";
Addsimps[Un_empty_left];
goal Set.thy "A Un {} = A";
by (Fast_tac 1);
qed "Un_empty_right";
Addsimps[Un_empty_right];
goal Set.thy "UNIV Un B = UNIV";
by (Fast_tac 1);
qed "Un_UNIV_left";
Addsimps[Un_UNIV_left];
goal Set.thy "A Un UNIV = UNIV";
by (Fast_tac 1);
qed "Un_UNIV_right";
Addsimps[Un_UNIV_right];
goal Set.thy "(insert a B) Un C = insert a (B Un C)";
by (Fast_tac 1);
qed "Un_insert_left";
goal Set.thy "(A Int B) Un C = (A Un C) Int (B Un C)";
by (Fast_tac 1);
qed "Un_Int_distrib";
goal Set.thy
"(A Int B) Un (B Int C) Un (C Int A) = (A Un B) Int (B Un C) Int (C Un A)";
by (Fast_tac 1);
qed "Un_Int_crazy";
goal Set.thy "(A<=B) = (A Un B = B)";
by (fast_tac (!claset addSEs [equalityE]) 1);
qed "subset_Un_eq";
goal Set.thy "(A <= insert b C) = (A <= C | b:A & A-{b} <= C)";
by (Fast_tac 1);
qed "subset_insert_iff";
goal Set.thy "(A Un B = {}) = (A = {} & B = {})";
by (fast_tac (!claset addEs [equalityCE]) 1);
qed "Un_empty";
Addsimps[Un_empty];
section "Compl";
goal Set.thy "A Int Compl(A) = {}";
by (Fast_tac 1);
qed "Compl_disjoint";
Addsimps[Compl_disjoint];
goal Set.thy "A Un Compl(A) = UNIV";
by (Fast_tac 1);
qed "Compl_partition";
goal Set.thy "Compl(Compl(A)) = A";
by (Fast_tac 1);
qed "double_complement";
Addsimps[double_complement];
goal Set.thy "Compl(A Un B) = Compl(A) Int Compl(B)";
by (Fast_tac 1);
qed "Compl_Un";
goal Set.thy "Compl(A Int B) = Compl(A) Un Compl(B)";
by (Fast_tac 1);
qed "Compl_Int";
goal Set.thy "Compl(UN x:A. B(x)) = (INT x:A. Compl(B(x)))";
by (Fast_tac 1);
qed "Compl_UN";
goal Set.thy "Compl(INT x:A. B(x)) = (UN x:A. Compl(B(x)))";
by (Fast_tac 1);
qed "Compl_INT";
(*Halmos, Naive Set Theory, page 16.*)
goal Set.thy "((A Int B) Un C = A Int (B Un C)) = (C<=A)";
by (fast_tac (!claset addSEs [equalityE]) 1);
qed "Un_Int_assoc_eq";
section "Union";
goal Set.thy "Union({}) = {}";
by (Fast_tac 1);
qed "Union_empty";
Addsimps[Union_empty];
goal Set.thy "Union(UNIV) = UNIV";
by (Fast_tac 1);
qed "Union_UNIV";
Addsimps[Union_UNIV];
goal Set.thy "Union(insert a B) = a Un Union(B)";
by (Fast_tac 1);
qed "Union_insert";
Addsimps[Union_insert];
goal Set.thy "Union(A Un B) = Union(A) Un Union(B)";
by (Fast_tac 1);
qed "Union_Un_distrib";
Addsimps[Union_Un_distrib];
goal Set.thy "Union(A Int B) <= Union(A) Int Union(B)";
by (Fast_tac 1);
qed "Union_Int_subset";
val prems = goal Set.thy
"(Union(C) Int A = {}) = (! B:C. B Int A = {})";
by (fast_tac (!claset addSEs [equalityE]) 1);
qed "Union_disjoint";
section "Inter";
goal Set.thy "Inter({}) = UNIV";
by (Fast_tac 1);
qed "Inter_empty";
Addsimps[Inter_empty];
goal Set.thy "Inter(UNIV) = {}";
by (Fast_tac 1);
qed "Inter_UNIV";
Addsimps[Inter_UNIV];
goal Set.thy "Inter(insert a B) = a Int Inter(B)";
by (Fast_tac 1);
qed "Inter_insert";
Addsimps[Inter_insert];
goal Set.thy "Inter(A) Un Inter(B) <= Inter(A Int B)";
by (Fast_tac 1);
qed "Inter_Un_subset";
goal Set.thy "Inter(A Un B) = Inter(A) Int Inter(B)";
by (best_tac (!claset) 1);
qed "Inter_Un_distrib";
section "UN and INT";
(*Basic identities*)
goal Set.thy "(UN x:{}. B x) = {}";
by (Fast_tac 1);
qed "UN_empty";
Addsimps[UN_empty];
goal Set.thy "(UN x:UNIV. B x) = (UN x. B x)";
by (Fast_tac 1);
qed "UN_UNIV";
Addsimps[UN_UNIV];
goal Set.thy "(INT x:{}. B x) = UNIV";
by (Fast_tac 1);
qed "INT_empty";
Addsimps[INT_empty];
goal Set.thy "(INT x:UNIV. B x) = (INT x. B x)";
by (Fast_tac 1);
qed "INT_UNIV";
Addsimps[INT_UNIV];
goal Set.thy "(UN x:insert a A. B x) = B a Un UNION A B";
by (Fast_tac 1);
qed "UN_insert";
Addsimps[UN_insert];
goal Set.thy "(INT x:insert a A. B x) = B a Int INTER A B";
by (Fast_tac 1);
qed "INT_insert";
Addsimps[INT_insert];
goal Set.thy "Union(range(f)) = (UN x.f(x))";
by (Fast_tac 1);
qed "Union_range_eq";
goal Set.thy "Inter(range(f)) = (INT x.f(x))";
by (Fast_tac 1);
qed "Inter_range_eq";
goal Set.thy "Union(B``A) = (UN x:A. B(x))";
by (Fast_tac 1);
qed "Union_image_eq";
goal Set.thy "Inter(B``A) = (INT x:A. B(x))";
by (Fast_tac 1);
qed "Inter_image_eq";
goal Set.thy "!!A. a: A ==> (UN y:A. c) = c";
by (Fast_tac 1);
qed "UN_constant";
goal Set.thy "!!A. a: A ==> (INT y:A. c) = c";
by (Fast_tac 1);
qed "INT_constant";
goal Set.thy "(UN x.B) = B";
by (Fast_tac 1);
qed "UN1_constant";
Addsimps[UN1_constant];
goal Set.thy "(INT x.B) = B";
by (Fast_tac 1);
qed "INT1_constant";
Addsimps[INT1_constant];
goal Set.thy "(UN x:A. B(x)) = Union({Y. ? x:A. Y=B(x)})";
by (Fast_tac 1);
qed "UN_eq";
(*Look: it has an EXISTENTIAL quantifier*)
goal Set.thy "(INT x:A. B(x)) = Inter({Y. ? x:A. Y=B(x)})";
by (Fast_tac 1);
qed "INT_eq";
(*Distributive laws...*)
goal Set.thy "A Int Union(B) = (UN C:B. A Int C)";
by (Fast_tac 1);
qed "Int_Union";
(* Devlin, Fundamentals of Contemporary Set Theory, page 12, exercise 5:
Union of a family of unions **)
goal Set.thy "(UN x:C. A(x) Un B(x)) = Union(A``C) Un Union(B``C)";
by (Fast_tac 1);
qed "Un_Union_image";
(*Equivalent version*)
goal Set.thy "(UN i:I. A(i) Un B(i)) = (UN i:I. A(i)) Un (UN i:I. B(i))";
by (Fast_tac 1);
qed "UN_Un_distrib";
goal Set.thy "A Un Inter(B) = (INT C:B. A Un C)";
by (Fast_tac 1);
qed "Un_Inter";
goal Set.thy "(INT x:C. A(x) Int B(x)) = Inter(A``C) Int Inter(B``C)";
by (best_tac (!claset) 1);
qed "Int_Inter_image";
(*Equivalent version*)
goal Set.thy "(INT i:I. A(i) Int B(i)) = (INT i:I. A(i)) Int (INT i:I. B(i))";
by (Fast_tac 1);
qed "INT_Int_distrib";
(*Halmos, Naive Set Theory, page 35.*)
goal Set.thy "B Int (UN i:I. A(i)) = (UN i:I. B Int A(i))";
by (Fast_tac 1);
qed "Int_UN_distrib";
goal Set.thy "B Un (INT i:I. A(i)) = (INT i:I. B Un A(i))";
by (Fast_tac 1);
qed "Un_INT_distrib";
goal Set.thy
"(UN i:I. A(i)) Int (UN j:J. B(j)) = (UN i:I. UN j:J. A(i) Int B(j))";
by (Fast_tac 1);
qed "Int_UN_distrib2";
goal Set.thy
"(INT i:I. A(i)) Un (INT j:J. B(j)) = (INT i:I. INT j:J. A(i) Un B(j))";
by (Fast_tac 1);
qed "Un_INT_distrib2";
section "-";
goal Set.thy "A-A = {}";
by (Fast_tac 1);
qed "Diff_cancel";
Addsimps[Diff_cancel];
goal Set.thy "{}-A = {}";
by (Fast_tac 1);
qed "empty_Diff";
Addsimps[empty_Diff];
goal Set.thy "A-{} = A";
by (Fast_tac 1);
qed "Diff_empty";
Addsimps[Diff_empty];
goal Set.thy "A-UNIV = {}";
by (Fast_tac 1);
qed "Diff_UNIV";
Addsimps[Diff_UNIV];
goal Set.thy "!!x. x~:A ==> A - insert x B = A-B";
by (Fast_tac 1);
qed "Diff_insert0";
Addsimps [Diff_insert0];
(*NOT SUITABLE FOR REWRITING since {a} == insert a 0*)
goal Set.thy "A - insert a B = A - B - {a}";
by (Fast_tac 1);
qed "Diff_insert";
(*NOT SUITABLE FOR REWRITING since {a} == insert a 0*)
goal Set.thy "A - insert a B = A - {a} - B";
by (Fast_tac 1);
qed "Diff_insert2";
goal Set.thy "insert x A - B = (if x:B then A-B else insert x (A-B))";
by (simp_tac (!simpset setloop split_tac[expand_if]) 1);
by (Fast_tac 1);
qed "insert_Diff_if";
goal Set.thy "!!x. x:B ==> insert x A - B = A-B";
by (Fast_tac 1);
qed "insert_Diff1";
Addsimps [insert_Diff1];
val prems = goal Set.thy "a:A ==> insert a (A-{a}) = A";
by (fast_tac (!claset addSIs prems) 1);
qed "insert_Diff";
goal Set.thy "A Int (B-A) = {}";
by (Fast_tac 1);
qed "Diff_disjoint";
Addsimps[Diff_disjoint];
goal Set.thy "!!A. A<=B ==> A Un (B-A) = B";
by (Fast_tac 1);
qed "Diff_partition";
goal Set.thy "!!A. [| A<=B; B<= C |] ==> (B - (C - A)) = (A :: 'a set)";
by (Fast_tac 1);
qed "double_diff";
goal Set.thy "A - (B Un C) = (A-B) Int (A-C)";
by (Fast_tac 1);
qed "Diff_Un";
goal Set.thy "A - (B Int C) = (A-B) Un (A-C)";
by (Fast_tac 1);
qed "Diff_Int";
Addsimps[subset_UNIV, empty_subsetI, subset_refl];