| author | nipkow |
| Tue, 17 Oct 2000 08:00:46 +0200 | |
| changeset 10228 | e653cb933293 |
| parent 297 | 5ef75ff3baeb |
| permissions | -rw-r--r-- |
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(* Title: HOLCF/dnat.ML |
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ID: $Id$ |
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Author: Franz Regensburger |
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Copyright 1993 Technische Universitaet Muenchen |
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Lemmas for dnat.thy |
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*) |
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open Dnat; |
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(* ------------------------------------------------------------------------*) |
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(* The isomorphisms dnat_rep_iso and dnat_abs_iso are strict *) |
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(* ------------------------------------------------------------------------*) |
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val dnat_iso_strict= dnat_rep_iso RS (dnat_abs_iso RS |
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(allI RSN (2,allI RS iso_strict))); |
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val dnat_rews = [dnat_iso_strict RS conjunct1, |
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dnat_iso_strict RS conjunct2]; |
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(* ------------------------------------------------------------------------*) |
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(* Properties of dnat_copy *) |
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(* ------------------------------------------------------------------------*) |
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fun prover defs thm = prove_goalw Dnat.thy defs thm |
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(fn prems => |
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[ |
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(cut_facts_tac prems 1), |
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(asm_simp_tac (HOLCF_ss addsimps |
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(dnat_rews @ [dnat_abs_iso,dnat_rep_iso])) 1) |
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]); |
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val dnat_copy = |
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[ |
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prover [dnat_copy_def] "dnat_copy[f][UU]=UU", |
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prover [dnat_copy_def,dzero_def] "dnat_copy[f][dzero]= dzero", |
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prover [dnat_copy_def,dsucc_def] |
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"n~=UU ==> dnat_copy[f][dsucc[n]] = dsucc[f[n]]" |
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]; |
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val dnat_rews = dnat_copy @ dnat_rews; |
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(* ------------------------------------------------------------------------*) |
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(* Exhaustion and elimination for dnat *) |
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(* ------------------------------------------------------------------------*) |
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val Exh_dnat = prove_goalw Dnat.thy [dsucc_def,dzero_def] |
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"n = UU | n = dzero | (? x . x~=UU & n = dsucc[x])" |
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(fn prems => |
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[ |
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(simp_tac HOLCF_ss 1), |
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(rtac (dnat_rep_iso RS subst) 1), |
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(res_inst_tac [("p","dnat_rep[n]")] ssumE 1),
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(rtac disjI1 1), |
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(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
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(rtac (disjI1 RS disjI2) 1), |
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(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
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(res_inst_tac [("p","x")] oneE 1),
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(contr_tac 1), |
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(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
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(rtac (disjI2 RS disjI2) 1), |
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(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
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(fast_tac HOL_cs 1) |
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]); |
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val dnatE = prove_goal Dnat.thy |
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"[| n=UU ==> Q; n=dzero ==> Q; !!x.[|n=dsucc[x];x~=UU|]==>Q|]==>Q" |
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(fn prems => |
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[ |
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(rtac (Exh_dnat RS disjE) 1), |
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(eresolve_tac prems 1), |
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(etac disjE 1), |
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(eresolve_tac prems 1), |
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(REPEAT (etac exE 1)), |
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(resolve_tac prems 1), |
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(fast_tac HOL_cs 1), |
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(fast_tac HOL_cs 1) |
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]); |
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(* ------------------------------------------------------------------------*) |
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(* Properties of dnat_when *) |
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(* ------------------------------------------------------------------------*) |
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fun prover defs thm = prove_goalw Dnat.thy defs thm |
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(fn prems => |
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[ |
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(cut_facts_tac prems 1), |
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(asm_simp_tac (HOLCF_ss addsimps |
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(dnat_rews @ [dnat_abs_iso,dnat_rep_iso])) 1) |
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]); |
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val dnat_when = [ |
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prover [dnat_when_def] "dnat_when[c][f][UU]=UU", |
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prover [dnat_when_def,dzero_def] "dnat_when[c][f][dzero]=c", |
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prover [dnat_when_def,dsucc_def] |
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"n~=UU ==> dnat_when[c][f][dsucc[n]]=f[n]" |
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]; |
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val dnat_rews = dnat_when @ dnat_rews; |
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(* ------------------------------------------------------------------------*) |
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(* Rewrites for discriminators and selectors *) |
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(* ------------------------------------------------------------------------*) |
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fun prover defs thm = prove_goalw Dnat.thy defs thm |
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(fn prems => |
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[ |
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(simp_tac (HOLCF_ss addsimps dnat_rews) 1) |
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]); |
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val dnat_discsel = [ |
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prover [is_dzero_def] "is_dzero[UU]=UU", |
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prover [is_dsucc_def] "is_dsucc[UU]=UU", |
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prover [dpred_def] "dpred[UU]=UU" |
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]; |
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fun prover defs thm = prove_goalw Dnat.thy defs thm |
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(fn prems => |
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[ |
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(cut_facts_tac prems 1), |
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(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1) |
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]); |
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125 |
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val dnat_discsel = [ |
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prover [is_dzero_def] "is_dzero[dzero]=TT", |
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prover [is_dzero_def] "n~=UU ==>is_dzero[dsucc[n]]=FF", |
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prover [is_dsucc_def] "is_dsucc[dzero]=FF", |
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prover [is_dsucc_def] "n~=UU ==> is_dsucc[dsucc[n]]=TT", |
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prover [dpred_def] "dpred[dzero]=UU", |
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prover [dpred_def] "n~=UU ==> dpred[dsucc[n]]=n" |
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] @ dnat_discsel; |
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134 |
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val dnat_rews = dnat_discsel @ dnat_rews; |
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136 |
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(* ------------------------------------------------------------------------*) |
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(* Definedness and strictness *) |
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(* ------------------------------------------------------------------------*) |
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140 |
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fun prover contr thm = prove_goal Dnat.thy thm |
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(fn prems => |
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[ |
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(res_inst_tac [("P1",contr)] classical3 1),
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(simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
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(dtac sym 1), |
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(asm_simp_tac HOLCF_ss 1), |
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148 |
(simp_tac (HOLCF_ss addsimps (prems @ dnat_rews)) 1) |
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149 |
]); |
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150 |
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val dnat_constrdef = [ |
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prover "is_dzero[UU] ~= UU" "dzero~=UU", |
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prover "is_dsucc[UU] ~= UU" "n~=UU ==> dsucc[n]~=UU" |
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154 |
]; |
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155 |
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156 |
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fun prover defs thm = prove_goalw Dnat.thy defs thm |
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158 |
(fn prems => |
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159 |
[ |
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160 |
(simp_tac (HOLCF_ss addsimps dnat_rews) 1) |
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161 |
]); |
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162 |
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val dnat_constrdef = [ |
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prover [dsucc_def] "dsucc[UU]=UU" |
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] @ dnat_constrdef; |
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166 |
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val dnat_rews = dnat_constrdef @ dnat_rews; |
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168 |
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169 |
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(* ------------------------------------------------------------------------*) |
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(* Distinctness wrt. << and = *) |
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(* ------------------------------------------------------------------------*) |
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173 |
|
| 297 | 174 |
val temp = prove_goal Dnat.thy "~dzero << dsucc[n]" |
175 |
(fn prems => |
|
176 |
[ |
|
177 |
(res_inst_tac [("P1","TT << FF")] classical3 1),
|
|
178 |
(resolve_tac dist_less_tr 1), |
|
179 |
(dres_inst_tac [("fo5","is_dzero")] monofun_cfun_arg 1),
|
|
180 |
(etac box_less 1), |
|
181 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
|
182 |
(res_inst_tac [("Q","n=UU")] classical2 1),
|
|
183 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
|
184 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1) |
|
185 |
]); |
|
186 |
||
187 |
val dnat_dist_less = [temp]; |
|
188 |
||
189 |
val temp = prove_goal Dnat.thy "n~=UU ==> ~dsucc[n] << dzero" |
|
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190 |
(fn prems => |
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191 |
[ |
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192 |
(cut_facts_tac prems 1), |
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193 |
(res_inst_tac [("P1","TT << FF")] classical3 1),
|
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194 |
(resolve_tac dist_less_tr 1), |
| 297 | 195 |
(dres_inst_tac [("fo5","is_dsucc")] monofun_cfun_arg 1),
|
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243
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196 |
(etac box_less 1), |
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197 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
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198 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1) |
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199 |
]); |
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|
200 |
|
| 297 | 201 |
val dnat_dist_less = temp::dnat_dist_less; |
|
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|
202 |
|
| 297 | 203 |
val temp = prove_goal Dnat.thy "dzero ~= dsucc[n]" |
|
243
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204 |
(fn prems => |
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205 |
[ |
| 297 | 206 |
(res_inst_tac [("Q","n=UU")] classical2 1),
|
207 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
|
|
243
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|
208 |
(res_inst_tac [("P1","TT = FF")] classical3 1),
|
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|
209 |
(resolve_tac dist_eq_tr 1), |
| 297 | 210 |
(dres_inst_tac [("f","is_dzero")] cfun_arg_cong 1),
|
|
243
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211 |
(etac box_equals 1), |
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|
212 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
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|
213 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1) |
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214 |
]); |
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|
215 |
|
| 297 | 216 |
val dnat_dist_eq = [temp, temp RS not_sym]; |
|
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217 |
|
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218 |
val dnat_rews = dnat_dist_less @ dnat_dist_eq @ dnat_rews; |
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219 |
|
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(* ------------------------------------------------------------------------*) |
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221 |
(* Invertibility *) |
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222 |
(* ------------------------------------------------------------------------*) |
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223 |
|
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224 |
val dnat_invert = |
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225 |
[ |
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226 |
prove_goal Dnat.thy |
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227 |
"[|x1~=UU; y1~=UU; dsucc[x1] << dsucc[y1] |] ==> x1<< y1" |
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228 |
(fn prems => |
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229 |
[ |
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230 |
(cut_facts_tac prems 1), |
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|
231 |
(dres_inst_tac [("fo5","dnat_when[c][LAM x.x]")] monofun_cfun_arg 1),
|
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|
232 |
(etac box_less 1), |
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233 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
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234 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1) |
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235 |
]) |
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236 |
]; |
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237 |
|
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238 |
(* ------------------------------------------------------------------------*) |
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239 |
(* Injectivity *) |
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240 |
(* ------------------------------------------------------------------------*) |
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|
241 |
|
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val dnat_inject = |
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243 |
[ |
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244 |
prove_goal Dnat.thy |
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245 |
"[|x1~=UU; y1~=UU; dsucc[x1] = dsucc[y1] |] ==> x1= y1" |
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246 |
(fn prems => |
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247 |
[ |
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248 |
(cut_facts_tac prems 1), |
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249 |
(dres_inst_tac [("f","dnat_when[c][LAM x.x]")] cfun_arg_cong 1),
|
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250 |
(etac box_equals 1), |
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251 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
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252 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1) |
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253 |
]) |
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254 |
]; |
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255 |
|
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(* ------------------------------------------------------------------------*) |
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257 |
(* definedness for discriminators and selectors *) |
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(* ------------------------------------------------------------------------*) |
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fun prover thm = prove_goal Dnat.thy thm |
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(fn prems => |
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[ |
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(cut_facts_tac prems 1), |
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(rtac dnatE 1), |
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(contr_tac 1), |
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(REPEAT (asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1)) |
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]); |
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val dnat_discsel_def = |
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[ |
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prover "n~=UU ==> is_dzero[n]~=UU", |
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prover "n~=UU ==> is_dsucc[n]~=UU" |
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]; |
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|
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val dnat_rews = dnat_discsel_def @ dnat_rews; |
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277 |
|
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(* ------------------------------------------------------------------------*) |
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(* Properties dnat_take *) |
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(* ------------------------------------------------------------------------*) |
| 297 | 282 |
val temp = prove_goalw Dnat.thy [dnat_take_def] "dnat_take(n)[UU]=UU" |
|
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(fn prems => |
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[ |
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(res_inst_tac [("n","n")] natE 1),
|
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(asm_simp_tac iterate_ss 1), |
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287 |
(asm_simp_tac iterate_ss 1), |
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|
288 |
(simp_tac (HOLCF_ss addsimps dnat_rews) 1) |
| 297 | 289 |
]); |
290 |
||
291 |
val dnat_take = [temp]; |
|
292 |
||
293 |
val temp = prove_goalw Dnat.thy [dnat_take_def] "dnat_take(0)[xs]=UU" |
|
|
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(fn prems => |
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295 |
[ |
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296 |
(asm_simp_tac iterate_ss 1) |
| 297 | 297 |
]); |
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|
298 |
|
| 297 | 299 |
val dnat_take = temp::dnat_take; |
300 |
||
301 |
val temp = prove_goalw Dnat.thy [dnat_take_def] |
|
302 |
"dnat_take(Suc(n))[dzero]=dzero" |
|
|
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(fn prems => |
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304 |
[ |
| 297 | 305 |
(asm_simp_tac iterate_ss 1), |
306 |
(simp_tac (HOLCF_ss addsimps dnat_rews) 1) |
|
307 |
]); |
|
308 |
||
309 |
val dnat_take = temp::dnat_take; |
|
310 |
||
311 |
val temp = prove_goalw Dnat.thy [dnat_take_def] |
|
312 |
"dnat_take(Suc(n))[dsucc[xs]]=dsucc[dnat_take(n)[xs]]" |
|
313 |
(fn prems => |
|
314 |
[ |
|
315 |
(res_inst_tac [("Q","xs=UU")] classical2 1),
|
|
316 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
|
317 |
(asm_simp_tac iterate_ss 1), |
|
318 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
|
319 |
(res_inst_tac [("n","n")] natE 1),
|
|
320 |
(asm_simp_tac iterate_ss 1), |
|
321 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
|
322 |
(asm_simp_tac iterate_ss 1), |
|
323 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
|
324 |
(asm_simp_tac iterate_ss 1), |
|
|
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325 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1) |
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326 |
]); |
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|
327 |
|
| 297 | 328 |
val dnat_take = temp::dnat_take; |
|
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|
329 |
|
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330 |
val dnat_rews = dnat_take @ dnat_rews; |
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|
331 |
|
| 297 | 332 |
|
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333 |
(* ------------------------------------------------------------------------*) |
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|
334 |
(* take lemma for dnats *) |
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|
335 |
(* ------------------------------------------------------------------------*) |
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|
336 |
|
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|
337 |
fun prover reach defs thm = prove_goalw Dnat.thy defs thm |
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|
338 |
(fn prems => |
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|
339 |
[ |
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|
340 |
(res_inst_tac [("t","s1")] (reach RS subst) 1),
|
|
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|
341 |
(res_inst_tac [("t","s2")] (reach RS subst) 1),
|
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|
342 |
(rtac (fix_def2 RS ssubst) 1), |
|
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|
343 |
(rtac (contlub_cfun_fun RS ssubst) 1), |
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|
344 |
(rtac is_chain_iterate 1), |
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|
345 |
(rtac (contlub_cfun_fun RS ssubst) 1), |
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|
346 |
(rtac is_chain_iterate 1), |
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|
347 |
(rtac lub_equal 1), |
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|
348 |
(rtac (is_chain_iterate RS ch2ch_fappL) 1), |
|
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|
349 |
(rtac (is_chain_iterate RS ch2ch_fappL) 1), |
|
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|
350 |
(rtac allI 1), |
|
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|
351 |
(resolve_tac prems 1) |
|
c22b85994e17
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|
352 |
]); |
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|
353 |
|
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|
354 |
val dnat_take_lemma = prover dnat_reach [dnat_take_def] |
|
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|
355 |
"(!!n.dnat_take(n)[s1]=dnat_take(n)[s2]) ==> s1=s2"; |
|
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|
356 |
|
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|
357 |
|
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|
358 |
(* ------------------------------------------------------------------------*) |
|
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|
359 |
(* Co -induction for dnats *) |
|
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|
360 |
(* ------------------------------------------------------------------------*) |
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|
361 |
|
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|
362 |
val dnat_coind_lemma = prove_goalw Dnat.thy [dnat_bisim_def] |
|
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|
363 |
"dnat_bisim(R) ==> ! p q.R(p,q) --> dnat_take(n)[p]=dnat_take(n)[q]" |
|
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Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
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|
364 |
(fn prems => |
|
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Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
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|
365 |
[ |
|
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|
366 |
(cut_facts_tac prems 1), |
|
c22b85994e17
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|
367 |
(nat_ind_tac "n" 1), |
|
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|
368 |
(simp_tac (HOLCF_ss addsimps dnat_take) 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
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|
369 |
(strip_tac 1), |
|
c22b85994e17
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|
370 |
((etac allE 1) THEN (etac allE 1) THEN (etac (mp RS disjE) 1)), |
|
c22b85994e17
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|
371 |
(atac 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
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|
372 |
(asm_simp_tac (HOLCF_ss addsimps dnat_take) 1), |
|
c22b85994e17
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|
373 |
(etac disjE 1), |
|
c22b85994e17
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|
374 |
(asm_simp_tac (HOLCF_ss addsimps dnat_take) 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
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|
375 |
(etac exE 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
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|
376 |
(etac exE 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
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|
377 |
(asm_simp_tac (HOLCF_ss addsimps dnat_take) 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
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|
378 |
(REPEAT (etac conjE 1)), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
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|
379 |
(rtac cfun_arg_cong 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
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|
380 |
(fast_tac HOL_cs 1) |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
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|
381 |
]); |
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|
382 |
|
|
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|
383 |
val dnat_coind = prove_goal Dnat.thy "[|dnat_bisim(R);R(p,q)|] ==> p = q" |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
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|
384 |
(fn prems => |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
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|
385 |
[ |
|
c22b85994e17
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|
386 |
(rtac dnat_take_lemma 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
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|
387 |
(rtac (dnat_coind_lemma RS spec RS spec RS mp) 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
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|
388 |
(resolve_tac prems 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
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|
389 |
(resolve_tac prems 1) |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
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|
390 |
]); |
|
c22b85994e17
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|
391 |
|
|
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|
392 |
|
|
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|
393 |
(* ------------------------------------------------------------------------*) |
|
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|
394 |
(* structural induction for admissible predicates *) |
|
c22b85994e17
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|
395 |
(* ------------------------------------------------------------------------*) |
|
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|
396 |
|
| 297 | 397 |
(* not needed any longer |
|
243
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|
398 |
val dnat_ind = prove_goal Dnat.thy |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
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|
399 |
"[| adm(P);\ |
|
c22b85994e17
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|
400 |
\ P(UU);\ |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
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|
401 |
\ P(dzero);\ |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
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|
402 |
\ !! s1.[|s1~=UU ; P(s1)|] ==> P(dsucc[s1])|] ==> P(s)" |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
403 |
(fn prems => |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
404 |
[ |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
405 |
(rtac (dnat_reach RS subst) 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
406 |
(res_inst_tac [("x","s")] spec 1),
|
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
407 |
(rtac fix_ind 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
408 |
(rtac adm_all2 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
409 |
(rtac adm_subst 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
410 |
(contX_tacR 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
411 |
(resolve_tac prems 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
412 |
(simp_tac HOLCF_ss 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
413 |
(resolve_tac prems 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
414 |
(strip_tac 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
415 |
(res_inst_tac [("n","xa")] dnatE 1),
|
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
416 |
(asm_simp_tac (HOLCF_ss addsimps dnat_copy) 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
417 |
(resolve_tac prems 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
418 |
(asm_simp_tac (HOLCF_ss addsimps dnat_copy) 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
419 |
(resolve_tac prems 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
420 |
(asm_simp_tac (HOLCF_ss addsimps dnat_copy) 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
421 |
(res_inst_tac [("Q","x[xb]=UU")] classical2 1),
|
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
422 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
423 |
(resolve_tac prems 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
424 |
(eresolve_tac prems 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
425 |
(etac spec 1) |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
426 |
]); |
| 297 | 427 |
*) |
428 |
||
429 |
val dnat_finite_ind = prove_goal Dnat.thy |
|
430 |
"[|P(UU);P(dzero);\ |
|
431 |
\ !! s1.[|s1~=UU;P(s1)|] ==> P(dsucc[s1])\ |
|
432 |
\ |] ==> !s.P(dnat_take(n)[s])" |
|
433 |
(fn prems => |
|
434 |
[ |
|
435 |
(nat_ind_tac "n" 1), |
|
436 |
(simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
|
437 |
(resolve_tac prems 1), |
|
438 |
(rtac allI 1), |
|
439 |
(res_inst_tac [("n","s")] dnatE 1),
|
|
440 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
|
441 |
(resolve_tac prems 1), |
|
442 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
|
443 |
(resolve_tac prems 1), |
|
444 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
|
445 |
(res_inst_tac [("Q","dnat_take(n1)[x]=UU")] classical2 1),
|
|
446 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
|
447 |
(resolve_tac prems 1), |
|
448 |
(resolve_tac prems 1), |
|
449 |
(atac 1), |
|
450 |
(etac spec 1) |
|
451 |
]); |
|
452 |
||
453 |
val dnat_all_finite_lemma1 = prove_goal Dnat.thy |
|
454 |
"!s.dnat_take(n)[s]=UU |dnat_take(n)[s]=s" |
|
455 |
(fn prems => |
|
456 |
[ |
|
457 |
(nat_ind_tac "n" 1), |
|
458 |
(simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
|
459 |
(rtac allI 1), |
|
460 |
(res_inst_tac [("n","s")] dnatE 1),
|
|
461 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
|
462 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
|
463 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
|
464 |
(eres_inst_tac [("x","x")] allE 1),
|
|
465 |
(etac disjE 1), |
|
466 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
|
467 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1) |
|
468 |
]); |
|
469 |
||
470 |
val dnat_all_finite_lemma2 = prove_goal Dnat.thy "? n.dnat_take(n)[s]=s" |
|
471 |
(fn prems => |
|
472 |
[ |
|
473 |
(res_inst_tac [("Q","s=UU")] classical2 1),
|
|
474 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
|
475 |
(subgoal_tac "(!n.dnat_take(n)[s]=UU) |(? n.dnat_take(n)[s]=s)" 1), |
|
476 |
(etac disjE 1), |
|
477 |
(eres_inst_tac [("P","s=UU")] notE 1),
|
|
478 |
(rtac dnat_take_lemma 1), |
|
479 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
|
480 |
(atac 1), |
|
481 |
(subgoal_tac "!n.!s.dnat_take(n)[s]=UU |dnat_take(n)[s]=s" 1), |
|
482 |
(fast_tac HOL_cs 1), |
|
483 |
(rtac allI 1), |
|
484 |
(rtac dnat_all_finite_lemma1 1) |
|
485 |
]); |
|
486 |
||
487 |
||
488 |
val dnat_ind = prove_goal Dnat.thy |
|
489 |
"[|P(UU);P(dzero);\ |
|
490 |
\ !! s1.[|s1~=UU;P(s1)|] ==> P(dsucc[s1])\ |
|
491 |
\ |] ==> P(s)" |
|
492 |
(fn prems => |
|
493 |
[ |
|
494 |
(rtac (dnat_all_finite_lemma2 RS exE) 1), |
|
495 |
(etac subst 1), |
|
496 |
(rtac (dnat_finite_ind RS spec) 1), |
|
497 |
(REPEAT (resolve_tac prems 1)), |
|
498 |
(REPEAT (atac 1)) |
|
499 |
]); |
|
|
243
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
500 |
|
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
501 |
|
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
502 |
val dnat_flat = prove_goalw Dnat.thy [flat_def] "flat(dzero)" |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
503 |
(fn prems => |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
504 |
[ |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
505 |
(rtac allI 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
506 |
(res_inst_tac [("s","x")] dnat_ind 1),
|
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
507 |
(fast_tac HOL_cs 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
508 |
(rtac allI 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
509 |
(res_inst_tac [("n","y")] dnatE 1),
|
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
510 |
(fast_tac (HOL_cs addSIs [UU_I]) 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
511 |
(asm_simp_tac HOLCF_ss 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
512 |
(asm_simp_tac (HOLCF_ss addsimps dnat_dist_less) 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
513 |
(rtac allI 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
514 |
(res_inst_tac [("n","y")] dnatE 1),
|
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
515 |
(fast_tac (HOL_cs addSIs [UU_I]) 1), |
| 297 | 516 |
(asm_simp_tac (HOLCF_ss addsimps dnat_dist_less) 1), |
|
243
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
517 |
(asm_simp_tac (HOLCF_ss addsimps dnat_rews) 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
518 |
(strip_tac 1), |
| 297 | 519 |
(subgoal_tac "s1<<xa" 1), |
|
243
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
520 |
(etac allE 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
521 |
(dtac mp 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
522 |
(atac 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
523 |
(etac disjE 1), |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
524 |
(contr_tac 1), |
| 297 | 525 |
(asm_simp_tac HOLCF_ss 1), |
526 |
(resolve_tac dnat_invert 1), |
|
527 |
(REPEAT (atac 1)) |
|
|
243
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
528 |
]); |
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
529 |
|
| 297 | 530 |
|
|
243
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
531 |
|
|
c22b85994e17
Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF
nipkow
parents:
diff
changeset
|
532 |