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(* Title: ZF/subset


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ID: $Id$


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Author: Lawrence C Paulson, Cambridge University Computer Laboratory


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Copyright 1991 University of Cambridge


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Derived rules involving subsets


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Union and Intersection as lattice operations


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*)


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(*** cons ***)


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val cons_subsetI = prove_goal ZF.thy "[ a:C; B<=C ] ==> cons(a,B) <= C"


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(fn prems=>


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[ (cut_facts_tac prems 1),


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(REPEAT (ares_tac [subsetI] 1


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ORELSE eresolve_tac [consE,ssubst,subsetD] 1)) ]);


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val subset_consI = prove_goal ZF.thy "B <= cons(a,B)"


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(fn _=> [ (rtac subsetI 1), (etac consI2 1) ]);


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(*Useful for rewriting!*)


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val cons_subset_iff = prove_goal ZF.thy "cons(a,B)<=C <> a:C & B<=C"


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(fn _=> [ (fast_tac upair_cs 1) ]);


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(*A safe special case of subset elimination, adding no new variables


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[ cons(a,B) <= C; [ a : C; B <= C ] ==> R ] ==> R *)


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val cons_subsetE = standard (cons_subset_iff RS iffD1 RS conjE);


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val subset_empty_iff = prove_goal ZF.thy "A<=0 <> A=0"


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(fn _=> [ (fast_tac (upair_cs addIs [equalityI]) 1) ]);


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val subset_cons_iff = prove_goal ZF.thy


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"C<=cons(a,B) <> C<=B  (a:C & C{a} <= B)"


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(fn _=> [ (fast_tac upair_cs 1) ]);


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(*** succ ***)


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val subset_succI = prove_goal ZF.thy "i <= succ(i)"


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(fn _=> [ (rtac subsetI 1), (etac succI2 1) ]);


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(*But if j is an ordinal or is transitive, then i:j implies i<=j!


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See ordinal/Ord_succ_subsetI*)


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val succ_subsetI = prove_goalw ZF.thy [succ_def]


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"[ i:j; i<=j ] ==> succ(i)<=j"


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(fn prems=>


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[ (REPEAT (ares_tac (prems@[cons_subsetI]) 1)) ]);


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val succ_subsetE = prove_goalw ZF.thy [succ_def]


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"[ succ(i) <= j; [ i:j; i<=j ] ==> P \


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\ ] ==> P"


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(fn major::prems=>


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[ (rtac (major RS cons_subsetE) 1),


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(REPEAT (ares_tac prems 1)) ]);


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(*** singletons ***)


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val singleton_subsetI = prove_goal ZF.thy


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"a:C ==> {a} <= C"


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(fn prems=>


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[ (REPEAT (resolve_tac (prems@[cons_subsetI,empty_subsetI]) 1)) ]);


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val singleton_subsetD = prove_goal ZF.thy


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"{a} <= C ==> a:C"


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(fn prems=> [ (REPEAT (ares_tac (prems@[cons_subsetE]) 1)) ]);


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(*** Big Union  least upper bound of a set ***)


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val Union_subset_iff = prove_goal ZF.thy "Union(A) <= C <> (ALL x:A. x <= C)"


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(fn _ => [ fast_tac upair_cs 1 ]);


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val Union_upper = prove_goal ZF.thy


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"B:A ==> B <= Union(A)"


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(fn prems=> [ (REPEAT (ares_tac (prems@[subsetI,UnionI]) 1)) ]);


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val Union_least = prove_goal ZF.thy


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"[ !!x. x:A ==> x<=C ] ==> Union(A) <= C"


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(fn [prem]=>


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[ (rtac (ballI RS (Union_subset_iff RS iffD2)) 1),


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(etac prem 1) ]);


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(*** Union of a family of sets ***)


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goal ZF.thy "A <= (UN i:I. B(i)) <> A = (UN i:I. A Int B(i))";


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by (fast_tac (upair_cs addSIs [equalityI] addSEs [equalityE]) 1);


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val subset_UN_iff_eq = result();


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val UN_subset_iff = prove_goal ZF.thy


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"(UN x:A.B(x)) <= C <> (ALL x:A. B(x) <= C)"


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(fn _ => [ fast_tac upair_cs 1 ]);


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val UN_upper = prove_goal ZF.thy


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"!!x A. x:A ==> B(x) <= (UN x:A.B(x))"


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(fn _ => [ etac (RepFunI RS Union_upper) 1 ]);


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val UN_least = prove_goal ZF.thy


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"[ !!x. x:A ==> B(x)<=C ] ==> (UN x:A.B(x)) <= C"


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(fn [prem]=>


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[ (rtac (ballI RS (UN_subset_iff RS iffD2)) 1),


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(etac prem 1) ]);


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(*** Big Intersection  greatest lower bound of a nonempty set ***)


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val Inter_subset_iff = prove_goal ZF.thy


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"!!a A. a: A ==> C <= Inter(A) <> (ALL x:A. C <= x)"


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(fn _ => [ fast_tac upair_cs 1 ]);


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val Inter_lower = prove_goal ZF.thy "B:A ==> Inter(A) <= B"


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(fn prems=>


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[ (REPEAT (resolve_tac (prems@[subsetI]) 1


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ORELSE etac InterD 1)) ]);


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val Inter_greatest = prove_goal ZF.thy


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"[ a:A; !!x. x:A ==> C<=x ] ==> C <= Inter(A)"


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(fn [prem1,prem2]=>


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[ (rtac ([prem1, ballI] MRS (Inter_subset_iff RS iffD2)) 1),


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(etac prem2 1) ]);


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(*** Intersection of a family of sets ***)


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val INT_lower = prove_goal ZF.thy


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"x:A ==> (INT x:A.B(x)) <= B(x)"


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(fn [prem] =>


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[ rtac (prem RS RepFunI RS Inter_lower) 1 ]);


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val INT_greatest = prove_goal ZF.thy


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"[ a:A; !!x. x:A ==> C<=B(x) ] ==> C <= (INT x:A.B(x))"


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(fn [nonempty,prem] =>


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[ rtac (nonempty RS RepFunI RS Inter_greatest) 1,


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REPEAT (eresolve_tac [RepFunE, prem, ssubst] 1) ]);


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(*** Finite Union  the least upper bound of 2 sets ***)


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val Un_subset_iff = prove_goal ZF.thy "A Un B <= C <> A <= C & B <= C"


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(fn _ => [ fast_tac upair_cs 1 ]);


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val Un_upper1 = prove_goal ZF.thy "A <= A Un B"


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(fn _ => [ (REPEAT (ares_tac [subsetI,UnI1] 1)) ]);


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val Un_upper2 = prove_goal ZF.thy "B <= A Un B"


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(fn _ => [ (REPEAT (ares_tac [subsetI,UnI2] 1)) ]);


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val Un_least = prove_goal ZF.thy "!!A B C. [ A<=C; B<=C ] ==> A Un B <= C"


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(fn _ =>


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[ (rtac (Un_subset_iff RS iffD2) 1),


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(REPEAT (ares_tac [conjI] 1)) ]);


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(*** Finite Intersection  the greatest lower bound of 2 sets *)


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val Int_subset_iff = prove_goal ZF.thy "C <= A Int B <> C <= A & C <= B"


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(fn _ => [ fast_tac upair_cs 1 ]);


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val Int_lower1 = prove_goal ZF.thy "A Int B <= A"


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(fn _ => [ (REPEAT (ares_tac [subsetI] 1 ORELSE etac IntE 1)) ]);


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val Int_lower2 = prove_goal ZF.thy "A Int B <= B"


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(fn _ => [ (REPEAT (ares_tac [subsetI] 1 ORELSE etac IntE 1)) ]);


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val Int_greatest = prove_goal ZF.thy


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"!!A B C. [ C<=A; C<=B ] ==> C <= A Int B"


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(fn prems=>


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[ (rtac (Int_subset_iff RS iffD2) 1),


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(REPEAT (ares_tac [conjI] 1)) ]);


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(*** Set difference *)


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val Diff_subset = prove_goal ZF.thy "AB <= A"


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(fn _ => [ (REPEAT (ares_tac [subsetI] 1 ORELSE etac DiffE 1)) ]);


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val Diff_contains = prove_goal ZF.thy


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"[ C<=A; C Int B = 0 ] ==> C <= AB"


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(fn prems=>


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[ (cut_facts_tac prems 1),


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(rtac subsetI 1),


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(REPEAT (ares_tac [DiffI,IntI,notI] 1


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ORELSE eresolve_tac [subsetD,equals0D] 1)) ]);


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(** Collect **)


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val Collect_subset = prove_goal ZF.thy "Collect(A,P) <= A"


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(fn _ => [ (REPEAT (ares_tac [subsetI] 1 ORELSE etac CollectD1 1)) ]);


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(** RepFun **)


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val prems = goal ZF.thy "[ !!x. x:A ==> f(x): B ] ==> {f(x). x:A} <= B";


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by (rtac subsetI 1);


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by (etac RepFunE 1);


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by (etac ssubst 1);


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by (eresolve_tac prems 1);


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val RepFun_subset = result();
