(* Title: ZF/AC/AC18_AC19.ML
ID: $Id$
Author: Krzysztof Gr`abczewski
The proof of AC1 ==> AC18 ==> AC19 ==> AC1
*)
open AC18_AC19;
(* ********************************************************************** *)
(* AC1 ==> AC18 *)
(* ********************************************************************** *)
goal thy "!!f. [| f: (PROD b:{P(a). a:A}. b); ALL a:A. P(a)<=Q(a) |] \
\ ==> (lam a:A. f`P(a)):(PROD a:A. Q(a))";
by (resolve_tac [lam_type] 1);
by (dresolve_tac [apply_type] 1);
by (resolve_tac [RepFunI] 1 THEN (atac 1));
by (dresolve_tac [bspec] 1 THEN (atac 1));
by (eresolve_tac [subsetD] 1 THEN (atac 1));
val PROD_subsets = result();
goal thy "!!X. [| ALL A. 0 ~: A --> (EX f. f : (PROD X:A. X)); A ~= 0 |] ==> \
\ (INT a:A. UN b:B(a). X(a, b)) <= (UN f:PROD a:A. B(a). INT a:A. X(a, f`a))";
by (resolve_tac [subsetI] 1);
by (eres_inst_tac [("x","{{b:B(a). x:X(a,b)}. a:A}")] allE 1);
by (eresolve_tac [impE] 1);
by (fast_tac (AC_cs addSEs [RepFunE] addSDs [INT_E]
addEs [UN_E, sym RS equals0D]) 1);
by (eresolve_tac [exE] 1);
by (resolve_tac [UN_I] 1);
by (fast_tac (AC_cs addSEs [PROD_subsets]) 1);
by (simp_tac AC_ss 1);
by (fast_tac (FOL_cs addSEs [not_emptyE] addDs [RepFunI RSN (2, apply_type)]
addEs [CollectD2] addSIs [INT_I]) 1);
val lemma_AC18 = result();
val [prem] = goalw thy (AC18_def::AC_defs) "AC1 ==> AC18";
by (resolve_tac [prem RS revcut_rl] 1);
by (fast_tac (AC_cs addSEs [lemma_AC18, UN_E, not_emptyE, apply_type]
addSIs [equalityI, INT_I, UN_I]) 1);
result();
(* ********************************************************************** *)
(* AC18 ==> AC19 *)
(* ********************************************************************** *)
val [prem] = goalw thy [AC18_def, AC19_def] "AC18 ==> AC19";
by (resolve_tac [allI] 1);
by (res_inst_tac [("B1","%x.x")] (forall_elim_vars 0 prem RS revcut_rl) 1);
by (fast_tac AC_cs 1);
result();
(* ********************************************************************** *)
(* AC19 ==> AC1 *)
(* ********************************************************************** *)
goalw thy [u_def]
"!!A. [| A ~= 0; 0 ~: A |] ==> {u_(a). a:A} ~= 0 & 0 ~: {u_(a). a:A}";
by (fast_tac (AC_cs addSIs [not_emptyI, RepFunI]
addSEs [not_emptyE, RepFunE]
addSDs [sym RS (RepFun_eq_0_iff RS iffD1)]) 1);
val RepRep_conj = result();
goal thy "!!c. [|c : a; x = c Un {0}; x ~: a |] ==> x - {0} : a";
by (hyp_subst_tac 1);
by (resolve_tac [subst_elem] 1 THEN (atac 1));
by (resolve_tac [equalityI] 1);
by (fast_tac AC_cs 1);
by (resolve_tac [subsetI] 1);
by (excluded_middle_tac "x=0" 1);
by (fast_tac AC_cs 1);
by (fast_tac (AC_cs addEs [notE, subst_elem] addSIs [equalityI]) 1);
val lemma1_1 = result();
goalw thy [u_def]
"!!a. [| f`(u_(a)) ~: a; f: (PROD B:{u_(a). a:A}. B); a:A |] \
\ ==> f`(u_(a))-{0} : a";
by (fast_tac (AC_cs addSEs [RepFunI, RepFunE, lemma1_1]
addSDs [apply_type]) 1);
val lemma1_2 = result();
goal thy "!!A. EX f. f: (PROD B:{u_(a). a:A}. B) ==> EX f. f: (PROD B:A. B)";
by (eresolve_tac [exE] 1);
by (res_inst_tac
[("x","lam a:A. if(f`(u_(a)) : a, f`(u_(a)), f`(u_(a))-{0})")] exI 1);
by (resolve_tac [lam_type] 1);
by (split_tac [expand_if] 1);
by (resolve_tac [conjI] 1);
by (fast_tac AC_cs 1);
by (fast_tac (AC_cs addSEs [lemma1_2]) 1);
val lemma1 = result();
goalw thy [u_def] "!!a. a~=0 ==> 0: (UN b:u_(a). b)";
by (fast_tac (AC_cs addSEs [not_emptyE] addSIs [UN_I, RepFunI]) 1);
val lemma2_1 = result();
goal thy "!!A C. [| A~=0; 0~:A |] ==> (INT x:{u_(a). a:A}. UN b:x. b) ~= 0";
by (eresolve_tac [not_emptyE] 1);
by (res_inst_tac [("a","0")] not_emptyI 1);
by (fast_tac (AC_cs addSIs [INT_I, RepFunI, lemma2_1] addSEs [RepFunE]) 1);
val lemma2 = result();
goal thy "!!F. (UN f:F. P(f)) ~= 0 ==> F ~= 0";
by (fast_tac (AC_cs addSEs [not_emptyE]) 1);
val lemma3 = result();
goalw thy AC_defs "!!Z. AC19 ==> AC1";
by (REPEAT (resolve_tac [allI,impI] 1));
by (excluded_middle_tac "A=0" 1);
by (fast_tac (AC_cs addSIs [empty_fun]) 2);
by (eres_inst_tac [("x","{u_(a). a:A}")] allE 1);
by (eresolve_tac [impE] 1);
by (eresolve_tac [RepRep_conj] 1 THEN (assume_tac 1));
by (resolve_tac [lemma1] 1);
by (dresolve_tac [lemma2] 1 THEN (assume_tac 1));
by (dres_inst_tac [("P","%x. x~=0")] subst 1 THEN (assume_tac 1));
by (fast_tac (AC_cs addSEs [lemma3 RS not_emptyE]) 1);
result();