--- a/src/HOL/Univ.ML Thu Oct 12 18:38:23 2000 +0200
+++ /dev/null Thu Jan 01 00:00:00 1970 +0000
@@ -1,595 +0,0 @@
-(* Title: HOL/Univ
- ID: $Id$
- Author: Lawrence C Paulson, Cambridge University Computer Laboratory
- Copyright 1991 University of Cambridge
-*)
-
-(** apfst -- can be used in similar type definitions **)
-
-Goalw [apfst_def] "apfst f (a,b) = (f(a),b)";
-by (rtac split 1);
-qed "apfst_conv";
-
-val [major,minor] = Goal
- "[| q = apfst f p; !!x y. [| p = (x,y); q = (f(x),y) |] ==> R \
-\ |] ==> R";
-by (rtac PairE 1);
-by (rtac minor 1);
-by (assume_tac 1);
-by (rtac (major RS trans) 1);
-by (etac ssubst 1);
-by (rtac apfst_conv 1);
-qed "apfst_convE";
-
-(** Push -- an injection, analogous to Cons on lists **)
-
-Goalw [Push_def] "Push i f = Push j g ==> i=j";
-by (etac (fun_cong RS box_equals) 1);
-by (rtac nat_case_0 1);
-by (rtac nat_case_0 1);
-qed "Push_inject1";
-
-Goalw [Push_def] "Push i f = Push j g ==> f=g";
-by (rtac (ext RS box_equals) 1);
-by (etac fun_cong 1);
-by (rtac (nat_case_Suc RS ext) 1);
-by (rtac (nat_case_Suc RS ext) 1);
-qed "Push_inject2";
-
-val [major,minor] = Goal
- "[| Push i f =Push j g; [| i=j; f=g |] ==> P \
-\ |] ==> P";
-by (rtac ((major RS Push_inject2) RS ((major RS Push_inject1) RS minor)) 1);
-qed "Push_inject";
-
-Goalw [Push_def] "Push (Inr (Suc k)) f = (%z. Inr 0) ==> P";
-by (rtac Suc_neq_Zero 1);
-by (etac (fun_cong RS box_equals RS Inr_inject) 1);
-by (rtac nat_case_0 1);
-by (rtac refl 1);
-qed "Push_neq_K0";
-
-(*** Isomorphisms ***)
-
-Goal "inj(Rep_Node)";
-by (rtac inj_inverseI 1); (*cannot combine by RS: multiple unifiers*)
-by (rtac Rep_Node_inverse 1);
-qed "inj_Rep_Node";
-
-Goal "inj_on Abs_Node Node";
-by (rtac inj_on_inverseI 1);
-by (etac Abs_Node_inverse 1);
-qed "inj_on_Abs_Node";
-
-bind_thm ("Abs_Node_inject", inj_on_Abs_Node RS inj_onD);
-
-
-(*** Introduction rules for Node ***)
-
-Goalw [Node_def] "(%k. Inr 0, a) : Node";
-by (Blast_tac 1);
-qed "Node_K0_I";
-
-Goalw [Node_def,Push_def]
- "p: Node ==> apfst (Push i) p : Node";
-by (fast_tac (claset() addSIs [apfst_conv, nat_case_Suc RS trans]) 1);
-qed "Node_Push_I";
-
-
-(*** Distinctness of constructors ***)
-
-(** Scons vs Atom **)
-
-Goalw [Atom_def,Scons_def,Push_Node_def] "Scons M N ~= Atom(a)";
-by (rtac notI 1);
-by (etac (equalityD2 RS subsetD RS UnE) 1);
-by (rtac singletonI 1);
-by (REPEAT (eresolve_tac [imageE, Abs_Node_inject RS apfst_convE,
- Pair_inject, sym RS Push_neq_K0] 1
- ORELSE resolve_tac [Node_K0_I, Rep_Node RS Node_Push_I] 1));
-qed "Scons_not_Atom";
-bind_thm ("Atom_not_Scons", Scons_not_Atom RS not_sym);
-
-
-(*** Injectiveness ***)
-
-(** Atomic nodes **)
-
-Goalw [Atom_def] "inj(Atom)";
-by (blast_tac (claset() addSIs [injI, Node_K0_I] addSDs [Abs_Node_inject]) 1);
-qed "inj_Atom";
-bind_thm ("Atom_inject", inj_Atom RS injD);
-
-Goal "(Atom(a)=Atom(b)) = (a=b)";
-by (blast_tac (claset() addSDs [Atom_inject]) 1);
-qed "Atom_Atom_eq";
-AddIffs [Atom_Atom_eq];
-
-Goalw [Leaf_def,o_def] "inj(Leaf)";
-by (rtac injI 1);
-by (etac (Atom_inject RS Inl_inject) 1);
-qed "inj_Leaf";
-
-bind_thm ("Leaf_inject", inj_Leaf RS injD);
-AddSDs [Leaf_inject];
-
-Goalw [Numb_def,o_def] "inj(Numb)";
-by (rtac injI 1);
-by (etac (Atom_inject RS Inr_inject) 1);
-qed "inj_Numb";
-
-bind_thm ("Numb_inject", inj_Numb RS injD);
-AddSDs [Numb_inject];
-
-(** Injectiveness of Push_Node **)
-
-val [major,minor] = Goalw [Push_Node_def]
- "[| Push_Node i m =Push_Node j n; [| i=j; m=n |] ==> P \
-\ |] ==> P";
-by (rtac (major RS Abs_Node_inject RS apfst_convE) 1);
-by (REPEAT (resolve_tac [Rep_Node RS Node_Push_I] 1));
-by (etac (sym RS apfst_convE) 1);
-by (rtac minor 1);
-by (etac Pair_inject 1);
-by (etac (Push_inject1 RS sym) 1);
-by (rtac (inj_Rep_Node RS injD) 1);
-by (etac trans 1);
-by (safe_tac (claset() addSEs [Push_inject,sym]));
-qed "Push_Node_inject";
-
-
-(** Injectiveness of Scons **)
-
-Goalw [Scons_def] "Scons M N <= Scons M' N' ==> M<=M'";
-by (blast_tac (claset() addSDs [Push_Node_inject]) 1);
-qed "Scons_inject_lemma1";
-
-Goalw [Scons_def] "Scons M N <= Scons M' N' ==> N<=N'";
-by (blast_tac (claset() addSDs [Push_Node_inject]) 1);
-qed "Scons_inject_lemma2";
-
-Goal "Scons M N = Scons M' N' ==> M=M'";
-by (etac equalityE 1);
-by (REPEAT (ares_tac [equalityI, Scons_inject_lemma1] 1));
-qed "Scons_inject1";
-
-Goal "Scons M N = Scons M' N' ==> N=N'";
-by (etac equalityE 1);
-by (REPEAT (ares_tac [equalityI, Scons_inject_lemma2] 1));
-qed "Scons_inject2";
-
-val [major,minor] = Goal
- "[| Scons M N = Scons M' N'; [| M=M'; N=N' |] ==> P \
-\ |] ==> P";
-by (rtac ((major RS Scons_inject2) RS ((major RS Scons_inject1) RS minor)) 1);
-qed "Scons_inject";
-
-Goal "(Scons M N = Scons M' N') = (M=M' & N=N')";
-by (blast_tac (claset() addSEs [Scons_inject]) 1);
-qed "Scons_Scons_eq";
-
-(*** Distinctness involving Leaf and Numb ***)
-
-(** Scons vs Leaf **)
-
-Goalw [Leaf_def,o_def] "Scons M N ~= Leaf(a)";
-by (rtac Scons_not_Atom 1);
-qed "Scons_not_Leaf";
-bind_thm ("Leaf_not_Scons", Scons_not_Leaf RS not_sym);
-
-AddIffs [Scons_not_Leaf, Leaf_not_Scons];
-
-
-(** Scons vs Numb **)
-
-Goalw [Numb_def,o_def] "Scons M N ~= Numb(k)";
-by (rtac Scons_not_Atom 1);
-qed "Scons_not_Numb";
-bind_thm ("Numb_not_Scons", Scons_not_Numb RS not_sym);
-
-AddIffs [Scons_not_Numb, Numb_not_Scons];
-
-
-(** Leaf vs Numb **)
-
-Goalw [Leaf_def,Numb_def] "Leaf(a) ~= Numb(k)";
-by (simp_tac (simpset() addsimps [Inl_not_Inr]) 1);
-qed "Leaf_not_Numb";
-bind_thm ("Numb_not_Leaf", Leaf_not_Numb RS not_sym);
-
-AddIffs [Leaf_not_Numb, Numb_not_Leaf];
-
-
-(*** ndepth -- the depth of a node ***)
-
-Addsimps [apfst_conv];
-AddIffs [Scons_not_Atom, Atom_not_Scons, Scons_Scons_eq];
-
-
-Goalw [ndepth_def] "ndepth (Abs_Node(%k. Inr 0, x)) = 0";
-by (EVERY1[stac (Node_K0_I RS Abs_Node_inverse), stac split]);
-by (rtac Least_equality 1);
-by (rtac refl 1);
-by (etac less_zeroE 1);
-qed "ndepth_K0";
-
-Goal "k < Suc(LEAST x. f x = Inr 0) --> nat_case (Inr (Suc i)) f k ~= Inr 0";
-by (induct_tac "k" 1);
-by (ALLGOALS Simp_tac);
-by (rtac impI 1);
-by (etac not_less_Least 1);
-val lemma = result();
-
-Goalw [ndepth_def,Push_Node_def]
- "ndepth (Push_Node (Inr (Suc i)) n) = Suc(ndepth(n))";
-by (stac (Rep_Node RS Node_Push_I RS Abs_Node_inverse) 1);
-by (cut_facts_tac [rewrite_rule [Node_def] Rep_Node] 1);
-by Safe_tac;
-by (etac ssubst 1); (*instantiates type variables!*)
-by (Simp_tac 1);
-by (rtac Least_equality 1);
-by (rewtac Push_def);
-by (rtac (nat_case_Suc RS trans) 1);
-by (etac LeastI 1);
-by (asm_simp_tac (simpset() addsimps [lemma]) 1);
-qed "ndepth_Push_Node";
-
-
-(*** ntrunc applied to the various node sets ***)
-
-Goalw [ntrunc_def] "ntrunc 0 M = {}";
-by (Blast_tac 1);
-qed "ntrunc_0";
-
-Goalw [Atom_def,ntrunc_def] "ntrunc (Suc k) (Atom a) = Atom(a)";
-by (fast_tac (claset() addss (simpset() addsimps [ndepth_K0])) 1);
-qed "ntrunc_Atom";
-
-Goalw [Leaf_def,o_def] "ntrunc (Suc k) (Leaf a) = Leaf(a)";
-by (rtac ntrunc_Atom 1);
-qed "ntrunc_Leaf";
-
-Goalw [Numb_def,o_def] "ntrunc (Suc k) (Numb i) = Numb(i)";
-by (rtac ntrunc_Atom 1);
-qed "ntrunc_Numb";
-
-Goalw [Scons_def,ntrunc_def]
- "ntrunc (Suc k) (Scons M N) = Scons (ntrunc k M) (ntrunc k N)";
-by (safe_tac (claset() addSIs [imageI]));
-by (REPEAT (stac ndepth_Push_Node 3 THEN etac Suc_mono 3));
-by (REPEAT (rtac Suc_less_SucD 1 THEN
- rtac (ndepth_Push_Node RS subst) 1 THEN
- assume_tac 1));
-qed "ntrunc_Scons";
-
-Addsimps [ntrunc_0, ntrunc_Atom, ntrunc_Leaf, ntrunc_Numb, ntrunc_Scons];
-
-
-(** Injection nodes **)
-
-Goalw [In0_def] "ntrunc 1 (In0 M) = {}";
-by (Simp_tac 1);
-by (rewtac Scons_def);
-by (Blast_tac 1);
-qed "ntrunc_one_In0";
-
-Goalw [In0_def]
- "ntrunc (Suc (Suc k)) (In0 M) = In0 (ntrunc (Suc k) M)";
-by (Simp_tac 1);
-qed "ntrunc_In0";
-
-Goalw [In1_def] "ntrunc 1 (In1 M) = {}";
-by (Simp_tac 1);
-by (rewtac Scons_def);
-by (Blast_tac 1);
-qed "ntrunc_one_In1";
-
-Goalw [In1_def]
- "ntrunc (Suc (Suc k)) (In1 M) = In1 (ntrunc (Suc k) M)";
-by (Simp_tac 1);
-qed "ntrunc_In1";
-
-Addsimps [ntrunc_one_In0, ntrunc_In0, ntrunc_one_In1, ntrunc_In1];
-
-
-(*** Cartesian Product ***)
-
-Goalw [uprod_def] "[| M:A; N:B |] ==> Scons M N : uprod A B";
-by (REPEAT (ares_tac [singletonI,UN_I] 1));
-qed "uprodI";
-
-(*The general elimination rule*)
-val major::prems = Goalw [uprod_def]
- "[| c : uprod A B; \
-\ !!x y. [| x:A; y:B; c = Scons x y |] ==> P \
-\ |] ==> P";
-by (cut_facts_tac [major] 1);
-by (REPEAT (eresolve_tac [asm_rl,singletonE,UN_E] 1
- ORELSE resolve_tac prems 1));
-qed "uprodE";
-
-(*Elimination of a pair -- introduces no eigenvariables*)
-val prems = Goal
- "[| Scons M N : uprod A B; [| M:A; N:B |] ==> P \
-\ |] ==> P";
-by (rtac uprodE 1);
-by (REPEAT (ares_tac prems 1 ORELSE eresolve_tac [Scons_inject,ssubst] 1));
-qed "uprodE2";
-
-
-(*** Disjoint Sum ***)
-
-Goalw [usum_def] "M:A ==> In0(M) : usum A B";
-by (Blast_tac 1);
-qed "usum_In0I";
-
-Goalw [usum_def] "N:B ==> In1(N) : usum A B";
-by (Blast_tac 1);
-qed "usum_In1I";
-
-val major::prems = Goalw [usum_def]
- "[| u : usum A B; \
-\ !!x. [| x:A; u=In0(x) |] ==> P; \
-\ !!y. [| y:B; u=In1(y) |] ==> P \
-\ |] ==> P";
-by (rtac (major RS UnE) 1);
-by (REPEAT (rtac refl 1
- ORELSE eresolve_tac (prems@[imageE,ssubst]) 1));
-qed "usumE";
-
-
-(** Injection **)
-
-Goalw [In0_def,In1_def] "In0(M) ~= In1(N)";
-by (rtac notI 1);
-by (etac (Scons_inject1 RS Numb_inject RS Zero_neq_Suc) 1);
-qed "In0_not_In1";
-
-bind_thm ("In1_not_In0", In0_not_In1 RS not_sym);
-
-AddIffs [In0_not_In1, In1_not_In0];
-
-Goalw [In0_def] "In0(M) = In0(N) ==> M=N";
-by (etac (Scons_inject2) 1);
-qed "In0_inject";
-
-Goalw [In1_def] "In1(M) = In1(N) ==> M=N";
-by (etac (Scons_inject2) 1);
-qed "In1_inject";
-
-Goal "(In0 M = In0 N) = (M=N)";
-by (blast_tac (claset() addSDs [In0_inject]) 1);
-qed "In0_eq";
-
-Goal "(In1 M = In1 N) = (M=N)";
-by (blast_tac (claset() addSDs [In1_inject]) 1);
-qed "In1_eq";
-
-AddIffs [In0_eq, In1_eq];
-
-Goal "inj In0";
-by (blast_tac (claset() addSIs [injI]) 1);
-qed "inj_In0";
-
-Goal "inj In1";
-by (blast_tac (claset() addSIs [injI]) 1);
-qed "inj_In1";
-
-
-(*** Function spaces ***)
-
-Goalw [Lim_def] "Lim f = Lim g ==> f = g";
-by (rtac ext 1);
-by (blast_tac (claset() addSEs [Push_Node_inject]) 1);
-qed "Lim_inject";
-
-Goalw [Funs_def] "S <= T ==> Funs S <= Funs T";
-by (Blast_tac 1);
-qed "Funs_mono";
-
-val [prem] = Goalw [Funs_def] "(!!x. f x : S) ==> f : Funs S";
-by (blast_tac (claset() addIs [prem]) 1);
-qed "FunsI";
-
-Goalw [Funs_def] "f : Funs S ==> f x : S";
-by (etac CollectE 1);
-by (etac subsetD 1);
-by (rtac rangeI 1);
-qed "FunsD";
-
-val [p1, p2] = Goalw [o_def]
- "[| f : Funs R; !!x. x : R ==> r (a x) = x |] ==> r o (a o f) = f";
-by (rtac (p2 RS ext) 1);
-by (rtac (p1 RS FunsD) 1);
-qed "Funs_inv";
-
-val [p1, p2] = Goalw [o_def]
- "[| f : Funs (range g); !!h. f = g o h ==> P |] ==> P";
-by (res_inst_tac [("h", "%x. @y. (f::'a=>'b) x = g y")] p2 1);
-by (rtac ext 1);
-by (rtac (p1 RS FunsD RS rangeE) 1);
-by (etac (exI RS (some_eq_ex RS iffD2)) 1);
-qed "Funs_rangeE";
-
-Goal "a : S ==> (%x. a) : Funs S";
-by (rtac FunsI 1);
-by (assume_tac 1);
-qed "Funs_nonempty";
-
-
-(*** proving equality of sets and functions using ntrunc ***)
-
-Goalw [ntrunc_def] "ntrunc k M <= M";
-by (Blast_tac 1);
-qed "ntrunc_subsetI";
-
-val [major] = Goalw [ntrunc_def] "(!!k. ntrunc k M <= N) ==> M<=N";
-by (blast_tac (claset() addIs [less_add_Suc1, less_add_Suc2,
- major RS subsetD]) 1);
-qed "ntrunc_subsetD";
-
-(*A generalized form of the take-lemma*)
-val [major] = Goal "(!!k. ntrunc k M = ntrunc k N) ==> M=N";
-by (rtac equalityI 1);
-by (ALLGOALS (rtac ntrunc_subsetD));
-by (ALLGOALS (rtac (ntrunc_subsetI RSN (2, subset_trans))));
-by (rtac (major RS equalityD1) 1);
-by (rtac (major RS equalityD2) 1);
-qed "ntrunc_equality";
-
-val [major] = Goalw [o_def]
- "[| !!k. (ntrunc(k) o h1) = (ntrunc(k) o h2) |] ==> h1=h2";
-by (rtac (ntrunc_equality RS ext) 1);
-by (rtac (major RS fun_cong) 1);
-qed "ntrunc_o_equality";
-
-(*** Monotonicity ***)
-
-Goalw [uprod_def] "[| A<=A'; B<=B' |] ==> uprod A B <= uprod A' B'";
-by (Blast_tac 1);
-qed "uprod_mono";
-
-Goalw [usum_def] "[| A<=A'; B<=B' |] ==> usum A B <= usum A' B'";
-by (Blast_tac 1);
-qed "usum_mono";
-
-Goalw [Scons_def] "[| M<=M'; N<=N' |] ==> Scons M N <= Scons M' N'";
-by (Blast_tac 1);
-qed "Scons_mono";
-
-Goalw [In0_def] "M<=N ==> In0(M) <= In0(N)";
-by (REPEAT (ares_tac [subset_refl,Scons_mono] 1));
-qed "In0_mono";
-
-Goalw [In1_def] "M<=N ==> In1(M) <= In1(N)";
-by (REPEAT (ares_tac [subset_refl,Scons_mono] 1));
-qed "In1_mono";
-
-
-(*** Split and Case ***)
-
-Goalw [Split_def] "Split c (Scons M N) = c M N";
-by (Blast_tac 1);
-qed "Split";
-
-Goalw [Case_def] "Case c d (In0 M) = c(M)";
-by (Blast_tac 1);
-qed "Case_In0";
-
-Goalw [Case_def] "Case c d (In1 N) = d(N)";
-by (Blast_tac 1);
-qed "Case_In1";
-
-Addsimps [Split, Case_In0, Case_In1];
-
-
-(**** UN x. B(x) rules ****)
-
-Goalw [ntrunc_def] "ntrunc k (UN x. f(x)) = (UN x. ntrunc k (f x))";
-by (Blast_tac 1);
-qed "ntrunc_UN1";
-
-Goalw [Scons_def] "Scons (UN x. f x) M = (UN x. Scons (f x) M)";
-by (Blast_tac 1);
-qed "Scons_UN1_x";
-
-Goalw [Scons_def] "Scons M (UN x. f x) = (UN x. Scons M (f x))";
-by (Blast_tac 1);
-qed "Scons_UN1_y";
-
-Goalw [In0_def] "In0(UN x. f(x)) = (UN x. In0(f(x)))";
-by (rtac Scons_UN1_y 1);
-qed "In0_UN1";
-
-Goalw [In1_def] "In1(UN x. f(x)) = (UN x. In1(f(x)))";
-by (rtac Scons_UN1_y 1);
-qed "In1_UN1";
-
-
-(*** Equality for Cartesian Product ***)
-
-Goalw [dprod_def]
- "[| (M,M'):r; (N,N'):s |] ==> (Scons M N, Scons M' N') : dprod r s";
-by (Blast_tac 1);
-qed "dprodI";
-
-(*The general elimination rule*)
-val major::prems = Goalw [dprod_def]
- "[| c : dprod r s; \
-\ !!x y x' y'. [| (x,x') : r; (y,y') : s; c = (Scons x y, Scons x' y') |] ==> P \
-\ |] ==> P";
-by (cut_facts_tac [major] 1);
-by (REPEAT_FIRST (eresolve_tac [asm_rl, UN_E, mem_splitE, singletonE]));
-by (REPEAT (ares_tac prems 1 ORELSE hyp_subst_tac 1));
-qed "dprodE";
-
-
-(*** Equality for Disjoint Sum ***)
-
-Goalw [dsum_def] "(M,M'):r ==> (In0(M), In0(M')) : dsum r s";
-by (Blast_tac 1);
-qed "dsum_In0I";
-
-Goalw [dsum_def] "(N,N'):s ==> (In1(N), In1(N')) : dsum r s";
-by (Blast_tac 1);
-qed "dsum_In1I";
-
-val major::prems = Goalw [dsum_def]
- "[| w : dsum r s; \
-\ !!x x'. [| (x,x') : r; w = (In0(x), In0(x')) |] ==> P; \
-\ !!y y'. [| (y,y') : s; w = (In1(y), In1(y')) |] ==> P \
-\ |] ==> P";
-by (cut_facts_tac [major] 1);
-by (REPEAT_FIRST (eresolve_tac [asm_rl, UN_E, UnE, mem_splitE, singletonE]));
-by (DEPTH_SOLVE (ares_tac prems 1 ORELSE hyp_subst_tac 1));
-qed "dsumE";
-
-AddSIs [uprodI, dprodI];
-AddIs [usum_In0I, usum_In1I, dsum_In0I, dsum_In1I];
-AddSEs [uprodE, dprodE, usumE, dsumE];
-
-
-(*** Monotonicity ***)
-
-Goal "[| r<=r'; s<=s' |] ==> dprod r s <= dprod r' s'";
-by (Blast_tac 1);
-qed "dprod_mono";
-
-Goal "[| r<=r'; s<=s' |] ==> dsum r s <= dsum r' s'";
-by (Blast_tac 1);
-qed "dsum_mono";
-
-
-(*** Bounding theorems ***)
-
-Goal "(dprod (A <*> B) (C <*> D)) <= (uprod A C) <*> (uprod B D)";
-by (Blast_tac 1);
-qed "dprod_Sigma";
-
-bind_thm ("dprod_subset_Sigma", [dprod_mono, dprod_Sigma] MRS subset_trans |> standard);
-
-(*Dependent version*)
-Goal "(dprod (Sigma A B) (Sigma C D)) <= Sigma (uprod A C) (Split (%x y. uprod (B x) (D y)))";
-by Safe_tac;
-by (stac Split 1);
-by (Blast_tac 1);
-qed "dprod_subset_Sigma2";
-
-Goal "(dsum (A <*> B) (C <*> D)) <= (usum A C) <*> (usum B D)";
-by (Blast_tac 1);
-qed "dsum_Sigma";
-
-bind_thm ("dsum_subset_Sigma", [dsum_mono, dsum_Sigma] MRS subset_trans |> standard);
-
-
-(*** Domain ***)
-
-Goal "Domain (dprod r s) = uprod (Domain r) (Domain s)";
-by Auto_tac;
-qed "Domain_dprod";
-
-Goal "Domain (dsum r s) = usum (Domain r) (Domain s)";
-by Auto_tac;
-qed "Domain_dsum";
-
-Addsimps [Domain_dprod, Domain_dsum];