| author | paulson |
| Wed, 27 Mar 1996 18:46:42 +0100 | |
| changeset 1619 | cb62d89b7adb |
| parent 1461 | 6bcb44e4d6e5 |
| child 1736 | fe0b459273f2 |
| permissions | -rw-r--r-- |
| 1461 | 1 |
(* Title: ZF/indrule.ML |
| 0 | 2 |
ID: $Id$ |
| 1461 | 3 |
Author: Lawrence C Paulson, Cambridge University Computer Laboratory |
| 516 | 4 |
Copyright 1994 University of Cambridge |
| 0 | 5 |
|
6 |
Induction rule module -- for Inductive/Coinductive Definitions |
|
7 |
||
8 |
Proves a strong induction rule and a mutual induction rule |
|
9 |
*) |
|
10 |
||
11 |
signature INDRULE = |
|
12 |
sig |
|
| 1461 | 13 |
val induct : thm (*main induction rule*) |
14 |
val mutual_induct : thm (*mutual induction rule*) |
|
| 0 | 15 |
end; |
16 |
||
17 |
||
| 516 | 18 |
functor Indrule_Fun |
19 |
(structure Inductive: sig include INDUCTIVE_ARG INDUCTIVE_I end |
|
|
1418
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
20 |
and Pr: PR and Su : SU and |
|
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
21 |
Intr_elim: sig include INTR_ELIM INTR_ELIM_AUX end) : INDRULE = |
|
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
22 |
let |
| 516 | 23 |
|
|
1418
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
24 |
val sign = sign_of Inductive.thy; |
| 0 | 25 |
|
|
1418
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
26 |
val (Const(_,recT),rec_params) = strip_comb (hd Inductive.rec_tms); |
| 516 | 27 |
|
|
1418
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
28 |
val big_rec_name = space_implode "_" Intr_elim.rec_names; |
| 516 | 29 |
val big_rec_tm = list_comb(Const(big_rec_name,recT), rec_params); |
30 |
||
|
724
36c0ac2f4935
ZF/indrule/mutual_ind_tac: backtracks using DEPTH_SOLVE to be certain of
lcp
parents:
633
diff
changeset
|
31 |
val _ = writeln " Proving the induction rule..."; |
| 0 | 32 |
|
33 |
(*** Prove the main induction rule ***) |
|
34 |
||
| 1461 | 35 |
val pred_name = "P"; (*name for predicate variables*) |
| 0 | 36 |
|
37 |
val big_rec_def::part_rec_defs = Intr_elim.defs; |
|
38 |
||
39 |
(*Used to make induction rules; |
|
40 |
ind_alist = [(rec_tm1,pred1),...] -- associates predicates with rec ops |
|
41 |
prem is a premise of an intr rule*) |
|
42 |
fun add_induct_prem ind_alist (prem as Const("Trueprop",_) $
|
|
| 1461 | 43 |
(Const("op :",_)$t$X), iprems) =
|
| 0 | 44 |
(case gen_assoc (op aconv) (ind_alist, X) of |
| 1461 | 45 |
Some pred => prem :: Ind_Syntax.mk_tprop (pred $ t) :: iprems |
46 |
| None => (*possibly membership in M(rec_tm), for M monotone*) |
|
47 |
let fun mk_sb (rec_tm,pred) = |
|
48 |
(rec_tm, Ind_Syntax.Collect_const$rec_tm$pred) |
|
49 |
in subst_free (map mk_sb ind_alist) prem :: iprems end) |
|
| 0 | 50 |
| add_induct_prem ind_alist (prem,iprems) = prem :: iprems; |
51 |
||
52 |
(*Make a premise of the induction rule.*) |
|
53 |
fun induct_prem ind_alist intr = |
|
54 |
let val quantfrees = map dest_Free (term_frees intr \\ rec_params) |
|
55 |
val iprems = foldr (add_induct_prem ind_alist) |
|
| 1461 | 56 |
(Logic.strip_imp_prems intr,[]) |
|
1418
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
57 |
val (t,X) = Ind_Syntax.rule_concl intr |
| 0 | 58 |
val (Some pred) = gen_assoc (op aconv) (ind_alist, X) |
|
1418
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
59 |
val concl = Ind_Syntax.mk_tprop (pred $ t) |
|
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
60 |
in list_all_free (quantfrees, Logic.list_implies (iprems,concl)) end |
| 0 | 61 |
handle Bind => error"Recursion term not found in conclusion"; |
62 |
||
|
633
9e4d4f3eb812
{HOL,ZF}/indrule/ind_tac: now calls DEPTH_SOLVE_1 instead of REPEAT, to
lcp
parents:
590
diff
changeset
|
63 |
(*Reduces backtracking by delivering the correct premise to each goal. |
|
9e4d4f3eb812
{HOL,ZF}/indrule/ind_tac: now calls DEPTH_SOLVE_1 instead of REPEAT, to
lcp
parents:
590
diff
changeset
|
64 |
Intro rules with extra Vars in premises still cause some backtracking *) |
| 0 | 65 |
fun ind_tac [] 0 = all_tac |
|
633
9e4d4f3eb812
{HOL,ZF}/indrule/ind_tac: now calls DEPTH_SOLVE_1 instead of REPEAT, to
lcp
parents:
590
diff
changeset
|
66 |
| ind_tac(prem::prems) i = |
| 1461 | 67 |
DEPTH_SOLVE_1 (ares_tac [prem, refl] i) THEN |
68 |
ind_tac prems (i-1); |
|
| 0 | 69 |
|
|
1418
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
70 |
val pred = Free(pred_name, Ind_Syntax.iT --> Ind_Syntax.oT); |
| 0 | 71 |
|
|
1418
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
72 |
val ind_prems = map (induct_prem (map (rpair pred) Inductive.rec_tms)) |
|
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
73 |
Inductive.intr_tms; |
| 0 | 74 |
|
75 |
val quant_induct = |
|
|
543
e961b2092869
ZF/ind_syntax/unvarifyT, unvarify: moved to Pure/logic.ML
lcp
parents:
516
diff
changeset
|
76 |
prove_goalw_cterm part_rec_defs |
|
1418
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
77 |
(cterm_of sign |
|
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
78 |
(Logic.list_implies (ind_prems, |
| 1461 | 79 |
Ind_Syntax.mk_tprop (Ind_Syntax.mk_all_imp(big_rec_tm,pred))))) |
|
543
e961b2092869
ZF/ind_syntax/unvarifyT, unvarify: moved to Pure/logic.ML
lcp
parents:
516
diff
changeset
|
80 |
(fn prems => |
| 0 | 81 |
[rtac (impI RS allI) 1, |
| 1461 | 82 |
DETERM (etac Intr_elim.raw_induct 1), |
83 |
(*Push Part inside Collect*) |
|
84 |
asm_full_simp_tac (FOL_ss addsimps [Part_Collect]) 1, |
|
85 |
REPEAT (FIRSTGOAL (eresolve_tac [CollectE, exE, conjE, disjE] ORELSE' |
|
86 |
hyp_subst_tac)), |
|
87 |
ind_tac (rev prems) (length prems) ]); |
|
| 0 | 88 |
|
89 |
(*** Prove the simultaneous induction rule ***) |
|
90 |
||
91 |
(*Make distinct predicates for each inductive set*) |
|
92 |
||
93 |
(*Sigmas and Cartesian products may nest ONLY to the right!*) |
|
|
366
5b6e4340085b
ZF/indrule/mk_pred_typ: corrected pattern to include Abs, allowing it to
lcp
parents:
0
diff
changeset
|
94 |
fun mk_pred_typ (t $ A $ Abs(_,_,B)) = |
|
1418
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
95 |
if t = Pr.sigma then Ind_Syntax.iT --> mk_pred_typ B |
|
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
96 |
else Ind_Syntax.iT --> Ind_Syntax.oT |
|
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
97 |
| mk_pred_typ _ = Ind_Syntax.iT --> Ind_Syntax.oT |
|
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
98 |
|
|
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
99 |
(*For testing whether the inductive set is a relation*) |
|
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
100 |
fun is_sigma (t$_$_) = (t = Pr.sigma) |
|
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
101 |
| is_sigma _ = false; |
| 0 | 102 |
|
103 |
(*Given a recursive set and its domain, return the "fsplit" predicate |
|
|
724
36c0ac2f4935
ZF/indrule/mutual_ind_tac: backtracks using DEPTH_SOLVE to be certain of
lcp
parents:
633
diff
changeset
|
104 |
and a conclusion for the simultaneous induction rule. |
|
36c0ac2f4935
ZF/indrule/mutual_ind_tac: backtracks using DEPTH_SOLVE to be certain of
lcp
parents:
633
diff
changeset
|
105 |
NOTE. This will not work for mutually recursive predicates. Previously |
|
36c0ac2f4935
ZF/indrule/mutual_ind_tac: backtracks using DEPTH_SOLVE to be certain of
lcp
parents:
633
diff
changeset
|
106 |
a summand 'domt' was also an argument, but this required the domain of |
|
36c0ac2f4935
ZF/indrule/mutual_ind_tac: backtracks using DEPTH_SOLVE to be certain of
lcp
parents:
633
diff
changeset
|
107 |
mutual recursion to invariably be a disjoint sum.*) |
|
36c0ac2f4935
ZF/indrule/mutual_ind_tac: backtracks using DEPTH_SOLVE to be certain of
lcp
parents:
633
diff
changeset
|
108 |
fun mk_predpair rec_tm = |
| 0 | 109 |
let val rec_name = (#1 o dest_Const o head_of) rec_tm |
|
1418
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
110 |
val T = mk_pred_typ Inductive.dom_sum |
| 0 | 111 |
val pfree = Free(pred_name ^ "_" ^ rec_name, T) |
112 |
val frees = mk_frees "za" (binder_types T) |
|
113 |
val qconcl = |
|
| 1461 | 114 |
foldr Ind_Syntax.mk_all (frees, |
115 |
Ind_Syntax.imp $ |
|
116 |
(Ind_Syntax.mem_const $ foldr1 (app Pr.pair) frees $ |
|
117 |
rec_tm) |
|
118 |
$ (list_comb (pfree,frees))) |
|
|
1418
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
119 |
in (Ind_Syntax.ap_split Pr.fsplit_const pfree (binder_types T), |
| 0 | 120 |
qconcl) |
121 |
end; |
|
122 |
||
|
1418
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
123 |
val (preds,qconcls) = split_list (map mk_predpair Inductive.rec_tms); |
| 0 | 124 |
|
125 |
(*Used to form simultaneous induction lemma*) |
|
126 |
fun mk_rec_imp (rec_tm,pred) = |
|
|
1418
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
127 |
Ind_Syntax.imp $ (Ind_Syntax.mem_const $ Bound 0 $ rec_tm) $ |
|
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
128 |
(pred $ Bound 0); |
| 0 | 129 |
|
130 |
(*To instantiate the main induction rule*) |
|
131 |
val induct_concl = |
|
|
1418
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
132 |
Ind_Syntax.mk_tprop(Ind_Syntax.mk_all_imp(big_rec_tm, |
| 1461 | 133 |
Abs("z", Ind_Syntax.iT,
|
134 |
fold_bal (app Ind_Syntax.conj) |
|
135 |
(map mk_rec_imp (Inductive.rec_tms~~preds))))) |
|
|
1418
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
136 |
and mutual_induct_concl = |
|
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
137 |
Ind_Syntax.mk_tprop(fold_bal (app Ind_Syntax.conj) qconcls); |
| 0 | 138 |
|
139 |
val lemma = (*makes the link between the two induction rules*) |
|
|
543
e961b2092869
ZF/ind_syntax/unvarifyT, unvarify: moved to Pure/logic.ML
lcp
parents:
516
diff
changeset
|
140 |
prove_goalw_cterm part_rec_defs |
| 1461 | 141 |
(cterm_of sign (Logic.mk_implies (induct_concl,mutual_induct_concl))) |
142 |
(fn prems => |
|
143 |
[cut_facts_tac prems 1, |
|
144 |
REPEAT (eresolve_tac [asm_rl, conjE, PartE, mp] 1 |
|
145 |
ORELSE resolve_tac [allI, impI, conjI, Part_eqI] 1 |
|
146 |
ORELSE dresolve_tac [spec, mp, Pr.fsplitD] 1)]); |
|
| 0 | 147 |
|
148 |
(*Mutual induction follows by freeness of Inl/Inr.*) |
|
149 |
||
|
724
36c0ac2f4935
ZF/indrule/mutual_ind_tac: backtracks using DEPTH_SOLVE to be certain of
lcp
parents:
633
diff
changeset
|
150 |
(*Simplification largely reduces the mutual induction rule to the |
|
36c0ac2f4935
ZF/indrule/mutual_ind_tac: backtracks using DEPTH_SOLVE to be certain of
lcp
parents:
633
diff
changeset
|
151 |
standard rule*) |
|
36c0ac2f4935
ZF/indrule/mutual_ind_tac: backtracks using DEPTH_SOLVE to be certain of
lcp
parents:
633
diff
changeset
|
152 |
val mut_ss = |
|
751
f0aacbcedb77
ZF/indrule/mutual_ind_tac: ensured that asm_full_simp_tac ignores any
lcp
parents:
724
diff
changeset
|
153 |
FOL_ss addsimps [Su.distinct, Su.distinct', Su.inl_iff, Su.inr_iff]; |
|
724
36c0ac2f4935
ZF/indrule/mutual_ind_tac: backtracks using DEPTH_SOLVE to be certain of
lcp
parents:
633
diff
changeset
|
154 |
|
|
1418
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
155 |
val all_defs = Inductive.con_defs @ part_rec_defs; |
|
724
36c0ac2f4935
ZF/indrule/mutual_ind_tac: backtracks using DEPTH_SOLVE to be certain of
lcp
parents:
633
diff
changeset
|
156 |
|
|
36c0ac2f4935
ZF/indrule/mutual_ind_tac: backtracks using DEPTH_SOLVE to be certain of
lcp
parents:
633
diff
changeset
|
157 |
(*Removes Collects caused by M-operators in the intro rules. It is very |
|
36c0ac2f4935
ZF/indrule/mutual_ind_tac: backtracks using DEPTH_SOLVE to be certain of
lcp
parents:
633
diff
changeset
|
158 |
hard to simplify |
|
36c0ac2f4935
ZF/indrule/mutual_ind_tac: backtracks using DEPTH_SOLVE to be certain of
lcp
parents:
633
diff
changeset
|
159 |
list({v: tf. (v : t --> P_t(v)) & (v : f --> P_f(v))})
|
|
36c0ac2f4935
ZF/indrule/mutual_ind_tac: backtracks using DEPTH_SOLVE to be certain of
lcp
parents:
633
diff
changeset
|
160 |
where t==Part(tf,Inl) and f==Part(tf,Inr) to list({v: tf. P_t(v)}).
|
|
36c0ac2f4935
ZF/indrule/mutual_ind_tac: backtracks using DEPTH_SOLVE to be certain of
lcp
parents:
633
diff
changeset
|
161 |
Instead the following rules extract the relevant conjunct. |
|
36c0ac2f4935
ZF/indrule/mutual_ind_tac: backtracks using DEPTH_SOLVE to be certain of
lcp
parents:
633
diff
changeset
|
162 |
*) |
|
1418
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
163 |
val cmonos = [subset_refl RS Collect_mono] RL Inductive.monos RLN (2,[rev_subsetD]); |
| 0 | 164 |
|
165 |
(*Avoids backtracking by delivering the correct premise to each goal*) |
|
166 |
fun mutual_ind_tac [] 0 = all_tac |
|
167 |
| mutual_ind_tac(prem::prems) i = |
|
|
633
9e4d4f3eb812
{HOL,ZF}/indrule/ind_tac: now calls DEPTH_SOLVE_1 instead of REPEAT, to
lcp
parents:
590
diff
changeset
|
168 |
DETERM |
|
9e4d4f3eb812
{HOL,ZF}/indrule/ind_tac: now calls DEPTH_SOLVE_1 instead of REPEAT, to
lcp
parents:
590
diff
changeset
|
169 |
(SELECT_GOAL |
| 1461 | 170 |
( |
171 |
(*Simplify the assumptions and goal by unfolding Part and |
|
172 |
using freeness of the Sum constructors; proves all but one |
|
|
751
f0aacbcedb77
ZF/indrule/mutual_ind_tac: ensured that asm_full_simp_tac ignores any
lcp
parents:
724
diff
changeset
|
173 |
conjunct by contradiction*) |
| 1461 | 174 |
rewrite_goals_tac all_defs THEN |
175 |
simp_tac (mut_ss addsimps [Part_iff]) 1 THEN |
|
176 |
IF_UNSOLVED (*simp_tac may have finished it off!*) |
|
177 |
((*simplify assumptions, but don't accept new rewrite rules!*) |
|
178 |
asm_full_simp_tac (mut_ss setmksimps (fn _=>[])) 1 THEN |
|
179 |
(*unpackage and use "prem" in the corresponding place*) |
|
180 |
REPEAT (rtac impI 1) THEN |
|
181 |
rtac (rewrite_rule all_defs prem) 1 THEN |
|
182 |
(*prem must not be REPEATed below: could loop!*) |
|
183 |
DEPTH_SOLVE (FIRSTGOAL (ares_tac [impI] ORELSE' |
|
184 |
eresolve_tac (conjE::mp::cmonos)))) |
|
185 |
) i) |
|
|
633
9e4d4f3eb812
{HOL,ZF}/indrule/ind_tac: now calls DEPTH_SOLVE_1 instead of REPEAT, to
lcp
parents:
590
diff
changeset
|
186 |
THEN mutual_ind_tac prems (i-1); |
| 0 | 187 |
|
|
724
36c0ac2f4935
ZF/indrule/mutual_ind_tac: backtracks using DEPTH_SOLVE to be certain of
lcp
parents:
633
diff
changeset
|
188 |
val _ = writeln " Proving the mutual induction rule..."; |
|
36c0ac2f4935
ZF/indrule/mutual_ind_tac: backtracks using DEPTH_SOLVE to be certain of
lcp
parents:
633
diff
changeset
|
189 |
|
| 0 | 190 |
val mutual_induct_fsplit = |
|
543
e961b2092869
ZF/ind_syntax/unvarifyT, unvarify: moved to Pure/logic.ML
lcp
parents:
516
diff
changeset
|
191 |
prove_goalw_cterm [] |
| 1461 | 192 |
(cterm_of sign |
193 |
(Logic.list_implies |
|
194 |
(map (induct_prem (Inductive.rec_tms~~preds)) Inductive.intr_tms, |
|
195 |
mutual_induct_concl))) |
|
196 |
(fn prems => |
|
197 |
[rtac (quant_induct RS lemma) 1, |
|
198 |
mutual_ind_tac (rev prems) (length prems)]); |
|
| 0 | 199 |
|
200 |
(*Attempts to remove all occurrences of fsplit*) |
|
201 |
val fsplit_tac = |
|
202 |
REPEAT (SOMEGOAL (FIRST' [rtac Pr.fsplitI, |
|
| 1461 | 203 |
dtac Pr.fsplitD, |
204 |
etac Pr.fsplitE, (*apparently never used!*) |
|
205 |
bound_hyp_subst_tac])) |
|
|
1418
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
206 |
THEN prune_params_tac |
|
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
207 |
|
|
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
208 |
in |
|
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
209 |
struct |
|
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
210 |
(*strip quantifier*) |
|
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
211 |
val induct = standard (quant_induct RS spec RSN (2,rev_mp)); |
| 0 | 212 |
|
|
1418
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
213 |
(*Just "True" unless significantly different from induct, with mutual |
|
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
214 |
recursion or because it involves tuples. This saves storage.*) |
|
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
215 |
val mutual_induct = |
|
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
216 |
if length Intr_elim.rec_names > 1 orelse |
| 1461 | 217 |
is_sigma Inductive.dom_sum |
|
1418
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
218 |
then rule_by_tactic fsplit_tac mutual_induct_fsplit |
|
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
219 |
else TrueI; |
|
f5f97ee67cbb
Improving space efficiency of inductive/datatype definitions.
paulson
parents:
1104
diff
changeset
|
220 |
end |
| 0 | 221 |
end; |