File ‹nominal_dt_alpha.ML›
signature NOMINAL_DT_ALPHA =
sig
val comb_binders: Proof.context -> bmode -> term list -> (term option * int) list -> term
val define_raw_alpha: raw_dt_info -> bn_info list -> bclause list list list -> term list ->
Proof.context -> alpha_result * local_theory
val induct_prove: typ list -> (typ * (term -> term)) list -> thm ->
(Proof.context -> int -> tactic) -> Proof.context -> thm list
val alpha_prove: term list -> (term * ((term * term) -> term)) list -> thm ->
(Proof.context -> int -> tactic) -> Proof.context -> thm list
val raw_prove_alpha_distincts: Proof.context -> alpha_result -> raw_dt_info -> thm list
val raw_prove_alpha_eq_iff: Proof.context -> alpha_result -> raw_dt_info -> thm list
val raw_prove_refl: Proof.context -> alpha_result -> thm -> thm list
val raw_prove_sym: Proof.context -> alpha_result -> thm list -> thm list
val raw_prove_trans: Proof.context -> alpha_result -> thm list -> thm list -> thm list
val raw_prove_equivp: Proof.context -> alpha_result -> thm list -> thm list -> thm list ->
thm list * thm list
val raw_prove_bn_imp: Proof.context -> alpha_result -> thm list
val raw_fv_bn_rsp_aux: Proof.context -> alpha_result -> term list -> term list -> term list ->
thm list -> thm list
val raw_size_rsp_aux: Proof.context -> alpha_result -> thm list -> thm list
val raw_constrs_rsp: Proof.context -> alpha_result -> term list list -> thm list -> thm list list
val raw_alpha_bn_rsp: alpha_result -> thm list -> thm list -> thm list
val raw_perm_bn_rsp: Proof.context -> alpha_result -> term list -> thm list -> thm list
val mk_funs_rsp: Proof.context -> thm -> thm
val mk_alpha_permute_rsp: Proof.context -> thm -> thm
end
structure Nominal_Dt_Alpha: NOMINAL_DT_ALPHA =
struct
open Nominal_Permeq
open Nominal_Dt_Data
fun lookup xs x = the (AList.lookup (op=) xs x)
fun group xs = AList.group (op=) xs
fun mk_prod_fv (t1, t2) =
let
val A = domain_type (fastype_of t1)
val B = domain_type (fastype_of t2)
in \<^Const>‹prod_fv A B for t1 t2› end
fun mk_prod_alpha (t1, t2) =
let
val A = domain_type (fastype_of t1)
val B = domain_type (fastype_of t2)
in \<^Const>‹prod_alpha A B for t1 t2› end
fun comb_binders lthy bmode args binders =
let
fun bind_set lthy args (NONE, i) = setify lthy (nth args i)
| bind_set _ args (SOME bn, i) = bn $ (nth args i)
fun bind_lst lthy args (NONE, i) = listify lthy (nth args i)
| bind_lst _ args (SOME bn, i) = bn $ (nth args i)
val (combine_fn, bind_fn) =
case bmode of
Lst => (mk_append, bind_lst)
| Set => (mk_union, bind_set)
| Res => (mk_union, bind_set)
in
binders
|> map (bind_fn lthy args)
|> foldl1 combine_fn
end
fun mk_alpha_term bmode fv alpha args args' binders binders' =
let
val (alpha_name, binder_ty) =
case bmode of
Lst => (@{const_name "alpha_lst"}, @{typ "atom list"})
| Set => (@{const_name "alpha_set"}, @{typ "atom set"})
| Res => (@{const_name "alpha_res"}, @{typ "atom set"})
val ty = fastype_of args
val pair_ty = HOLogic.mk_prodT (binder_ty, ty)
val alpha_ty = [ty, ty] ---> @{typ "bool"}
val fv_ty = ty --> @{typ "atom set"}
val pair_lhs = HOLogic.mk_prod (binders, args)
val pair_rhs = HOLogic.mk_prod (binders', args')
in
HOLogic.exists_const \<^Type>‹perm› $ Abs ("p", \<^Type>‹perm›,
Const (alpha_name, [pair_ty, alpha_ty, fv_ty, @{typ "perm"}, pair_ty] ---> @{typ bool})
$ pair_lhs $ alpha $ fv $ (Bound 0) $ pair_rhs)
end
fun mk_alpha_bn_prem alpha_bn_map args args' bodies binder =
case binder of
(NONE, _) => []
| (SOME bn, i) =>
if member (op=) bodies i then []
else [lookup alpha_bn_map bn $ nth args i $ nth args' i]
fun mk_alpha_prems lthy alpha_map alpha_bn_map is_rec (args, args') bclause =
let
fun mk_frees i =
let
val arg = nth args i
val arg' = nth args' i
val ty = fastype_of arg
in
if nth is_rec i
then fst (lookup alpha_map ty) $ arg $ arg'
else HOLogic.mk_eq (arg, arg')
end
fun mk_alpha_fv i =
let
val ty = fastype_of (nth args i)
in
case AList.lookup (op=) alpha_map ty of
NONE => (HOLogic.eq_const ty, supp_const ty)
| SOME (alpha, fv) => (alpha, fv)
end
in
case bclause of
BC (_, [], bodies) => map (HOLogic.mk_Trueprop o mk_frees) bodies
| BC (bmode, binders, bodies) =>
let
val (alphas, fvs) = split_list (map mk_alpha_fv bodies)
val comp_fv = foldl1 mk_prod_fv fvs
val comp_alpha = foldl1 mk_prod_alpha alphas
val comp_args = foldl1 HOLogic.mk_prod (map (nth args) bodies)
val comp_args' = foldl1 HOLogic.mk_prod (map (nth args') bodies)
val comp_binders = comb_binders lthy bmode args binders
val comp_binders' = comb_binders lthy bmode args' binders
val alpha_prem =
mk_alpha_term bmode comp_fv comp_alpha comp_args comp_args' comp_binders comp_binders'
val alpha_bn_prems = flat (map (mk_alpha_bn_prem alpha_bn_map args args' bodies) binders)
in
map HOLogic.mk_Trueprop (alpha_prem::alpha_bn_prems)
end
end
fun mk_alpha_intros lthy alpha_map alpha_bn_map (constr, ty, arg_tys, is_rec) bclauses =
let
val arg_names = Old_Datatype_Prop.make_tnames arg_tys
val arg_names' = Name.variant_list arg_names arg_names
val args = map Free (arg_names ~~ arg_tys)
val args' = map Free (arg_names' ~~ arg_tys)
val alpha = fst (lookup alpha_map ty)
val concl = HOLogic.mk_Trueprop (alpha $ list_comb (constr, args) $ list_comb (constr, args'))
val prems = map (mk_alpha_prems lthy alpha_map alpha_bn_map is_rec (args, args')) bclauses
in
Library.foldr Logic.mk_implies (flat prems, concl)
end
fun mk_alpha_bn lthy alpha_map alpha_bn_map bn_args is_rec (args, args') bclause =
let
fun mk_alpha_bn_prem i =
let
val arg = nth args i
val arg' = nth args' i
val ty = fastype_of arg
in
case AList.lookup (op=) bn_args i of
NONE => (case (AList.lookup (op=) alpha_map ty) of
NONE => [HOLogic.mk_eq (arg, arg')]
| SOME (alpha, _) => [alpha $ arg $ arg'])
| SOME (NONE) => []
| SOME (SOME bn) => [lookup alpha_bn_map bn $ arg $ arg']
end
in
case bclause of
BC (_, [], bodies) =>
map HOLogic.mk_Trueprop (flat (map mk_alpha_bn_prem bodies))
| _ => mk_alpha_prems lthy alpha_map alpha_bn_map is_rec (args, args') bclause
end
fun mk_alpha_bn_intro lthy bn_trm alpha_map alpha_bn_map (bn_args, (constr, _, arg_tys, is_rec)) bclauses =
let
val arg_names = Old_Datatype_Prop.make_tnames arg_tys
val arg_names' = Name.variant_list arg_names arg_names
val args = map Free (arg_names ~~ arg_tys)
val args' = map Free (arg_names' ~~ arg_tys)
val alpha_bn = lookup alpha_bn_map bn_trm
val concl = HOLogic.mk_Trueprop (alpha_bn $ list_comb (constr, args) $ list_comb (constr, args'))
val prems = map (mk_alpha_bn lthy alpha_map alpha_bn_map bn_args is_rec (args, args')) bclauses
in
Library.foldr Logic.mk_implies (flat prems, concl)
end
fun mk_alpha_bn_intros lthy alpha_map alpha_bn_map constrs_info bclausesss (bn_trm, bn_n, bn_argss) =
let
val nth_constrs_info = nth constrs_info bn_n
val nth_bclausess = nth bclausesss bn_n
in
map2 (mk_alpha_bn_intro lthy bn_trm alpha_map alpha_bn_map) (bn_argss ~~ nth_constrs_info) nth_bclausess
end
fun define_raw_alpha raw_dt_info bn_info bclausesss fvs lthy =
let
val RawDtInfo {raw_dt_names, raw_tys, raw_cns_info, ...} = raw_dt_info
val alpha_names = map (prefix "alpha_" o Long_Name.base_name) raw_dt_names
val alpha_tys = map (fn ty => [ty, ty] ---> @{typ bool}) raw_tys
val alpha_frees = map Free (alpha_names ~~ alpha_tys)
val alpha_map = raw_tys ~~ (alpha_frees ~~ fvs)
val (bns, bn_tys) = split_list (map (fn (bn, i, _) => (bn, i)) bn_info)
val bn_names = map (fn bn => Long_Name.base_name (fst (dest_Const bn))) bns
val alpha_bn_names = map (prefix "alpha_") bn_names
val alpha_bn_arg_tys = map (nth raw_tys) bn_tys
val alpha_bn_tys = map (fn ty => [ty, ty] ---> @{typ "bool"}) alpha_bn_arg_tys
val alpha_bn_frees = map Free (alpha_bn_names ~~ alpha_bn_tys)
val alpha_bn_map = bns ~~ alpha_bn_frees
val alpha_intros = map2 (map2 (mk_alpha_intros lthy alpha_map alpha_bn_map)) raw_cns_info bclausesss
val alpha_bn_intros = map (mk_alpha_bn_intros lthy alpha_map alpha_bn_map raw_cns_info bclausesss) bn_info
val all_alpha_names = map (fn (a, ty) => ((Binding.name a, ty), NoSyn))
(alpha_names @ alpha_bn_names ~~ alpha_tys @ alpha_bn_tys)
val all_alpha_intros = map (pair Binding.empty_atts) (flat alpha_intros @ flat alpha_bn_intros)
val (alpha_info, lthy') =
lthy
|> Local_Theory.begin_nested
|> snd
|> Inductive.add_inductive
{quiet_mode = true, verbose = false, alt_name = Binding.empty,
coind = false, no_elim = false, no_ind = false, skip_mono = false}
all_alpha_names [] all_alpha_intros []
|> Local_Theory.end_nested_result Inductive.transform_result;
val phi =
Proof_Context.export_morphism lthy'
(Proof_Context.transfer (Proof_Context.theory_of lthy') lthy);
val alpha_info_global = Inductive.transform_result phi alpha_info;
val all_alpha_trms = #preds alpha_info_global |> map Type.legacy_freeze
val alpha_raw_induct = #raw_induct alpha_info_global
val alpha_intros = #intrs alpha_info_global;
val alpha_cases = #elims alpha_info_global;
val (alpha_trms, alpha_bn_trms) = chop (length fvs) all_alpha_trms
val alpha_tys = map (domain_type o fastype_of) alpha_trms
val alpha_bn_tys = map (domain_type o fastype_of) alpha_bn_trms
val alpha_names = map (fst o dest_Const) alpha_trms
val alpha_bn_names = map (fst o dest_Const) alpha_bn_trms
in
(AlphaResult
{alpha_names = alpha_names,
alpha_trms = alpha_trms,
alpha_tys = alpha_tys,
alpha_bn_names = alpha_bn_names,
alpha_bn_trms = alpha_bn_trms,
alpha_bn_tys = alpha_bn_tys,
alpha_intros = alpha_intros,
alpha_cases = alpha_cases,
alpha_raw_induct = alpha_raw_induct}, lthy')
end
fun induct_prove tys props induct_thm cases_tac ctxt =
let
val (arg_names, ctxt') =
Variable.variant_fixes (replicate (length tys) "x") ctxt
val args = map2 (curry Free) arg_names tys
val true_trms = replicate (length tys) (K \<^Const>‹True›)
fun apply_all x fs = map (fn f => f x) fs
val goals =
group (props @ (tys ~~ true_trms))
|> map snd
|> map2 apply_all args
|> map fold_conj
|> foldr1 HOLogic.mk_conj
|> HOLogic.mk_Trueprop
fun tac ctxt =
HEADGOAL
(DETERM o (resolve_tac ctxt [induct_thm])
THEN_ALL_NEW
(REPEAT_ALL_NEW (FIRST' [resolve_tac ctxt @{thms TrueI conjI}, cases_tac ctxt])))
in
Goal.prove ctxt' [] [] goals (tac o #context)
|> singleton (Proof_Context.export ctxt' ctxt)
|> Old_Datatype_Aux.split_conj_thm
|> map Old_Datatype_Aux.split_conj_thm
|> flat
|> filter_out (is_true o Thm.concl_of)
|> map zero_var_indexes
end
fun alpha_prove alphas props alpha_induct_thm cases_tac ctxt =
let
val arg_tys = map (domain_type o fastype_of) alphas
val ((arg_names1, arg_names2), ctxt') =
ctxt
|> Variable.variant_fixes (replicate (length alphas) "x")
||>> Variable.variant_fixes (replicate (length alphas) "y")
val args1 = map2 (curry Free) arg_names1 arg_tys
val args2 = map2 (curry Free) arg_names2 arg_tys
val true_trms = replicate (length alphas) (K \<^Const>‹True›)
fun apply_all x fs = map (fn f => f x) fs
val goals_rhs =
group (props @ (alphas ~~ true_trms))
|> map snd
|> map2 apply_all (args1 ~~ args2)
|> map fold_conj
fun apply_trm_pair t (ar1, ar2) = t $ ar1 $ ar2
val goals_lhs = map2 apply_trm_pair alphas (args1 ~~ args2)
val goals =
(map2 (curry HOLogic.mk_imp) goals_lhs goals_rhs)
|> foldr1 HOLogic.mk_conj
|> HOLogic.mk_Trueprop
fun tac ctxt =
HEADGOAL
(DETERM o (resolve_tac ctxt [alpha_induct_thm])
THEN_ALL_NEW FIRST' [resolve_tac ctxt @{thms TrueI}, cases_tac ctxt])
in
Goal.prove ctxt' [] [] goals (tac o #context)
|> singleton (Proof_Context.export ctxt' ctxt)
|> Old_Datatype_Aux.split_conj_thm
|> map (fn th => th RS mp)
|> map Old_Datatype_Aux.split_conj_thm
|> flat
|> filter_out (is_true o Thm.concl_of)
|> map zero_var_indexes
end
fun mk_distinct_goal ty_trm_assoc neq =
let
val (Const (@{const_name "HOL.eq"}, ty_eq) $ lhs $ rhs) =
HOLogic.dest_not (HOLogic.dest_Trueprop neq)
val ty_str = fst (dest_Type (domain_type ty_eq))
in
Const (lookup ty_trm_assoc ty_str, ty_eq) $ lhs $ rhs
|> HOLogic.mk_not
|> HOLogic.mk_Trueprop
end
fun distinct_tac ctxt cases_thms distinct_thms =
resolve_tac ctxt [notI] THEN' eresolve_tac ctxt cases_thms
THEN_ALL_NEW asm_full_simp_tac (put_simpset HOL_ss ctxt addsimps distinct_thms)
fun raw_prove_alpha_distincts ctxt alpha_result raw_dt_info =
let
val AlphaResult {alpha_names, alpha_cases, ...} = alpha_result
val RawDtInfo {raw_dt_names, raw_distinct_thms, ...} = raw_dt_info
val ty_trm_assoc = raw_dt_names ~~ alpha_names
fun mk_alpha_distinct raw_distinct_trm =
let
val goal = mk_distinct_goal ty_trm_assoc raw_distinct_trm
in
Goal.prove ctxt [] [] goal
(fn {context = ctxt', ...} => distinct_tac ctxt' alpha_cases raw_distinct_thms 1)
end
in
map (mk_alpha_distinct o Thm.prop_of) raw_distinct_thms
end
fun mk_simp_rule thm =
case Thm.prop_of thm of
\<^Const_>‹Trueprop for ‹_ $ Const _ $ Const _›› => thm RS @{thm eqTrueI}
| _ => thm
fun alpha_eq_iff_tac ctxt dist_inj intros elims =
SOLVED' (asm_full_simp_tac (put_simpset HOL_ss ctxt addsimps intros)) ORELSE'
(resolve_tac ctxt @{thms iffI} THEN'
RANGE [eresolve_tac ctxt elims THEN_ALL_NEW asm_full_simp_tac (put_simpset HOL_ss ctxt addsimps dist_inj),
asm_full_simp_tac (put_simpset HOL_ss ctxt addsimps intros)])
fun mk_alpha_eq_iff_goal thm =
let
val prop = Thm.prop_of thm;
val concl = HOLogic.dest_Trueprop (Logic.strip_imp_concl prop);
val hyps = map HOLogic.dest_Trueprop (Logic.strip_imp_prems prop);
fun list_conj l = foldr1 HOLogic.mk_conj l;
in
if hyps = [] then HOLogic.mk_Trueprop concl
else HOLogic.mk_Trueprop (HOLogic.mk_eq (concl, list_conj hyps))
end;
fun raw_prove_alpha_eq_iff ctxt alpha_result raw_dt_info =
let
val AlphaResult {alpha_intros, alpha_cases, ...} = alpha_result
val RawDtInfo {raw_distinct_thms, raw_inject_thms, ...} = raw_dt_info
val ((_, thms_imp), ctxt') = Variable.import false alpha_intros ctxt;
val goals = map mk_alpha_eq_iff_goal thms_imp;
fun tac goal_ctxt =
alpha_eq_iff_tac goal_ctxt (raw_distinct_thms @ raw_inject_thms) alpha_intros alpha_cases 1;
val thms = map (fn goal => Goal.prove ctxt' [] [] goal (tac o #context)) goals;
in
Variable.export ctxt' ctxt thms
|> map mk_simp_rule
end
val exi_zero = @{lemma "P (0::perm) ⟹ (∃x. P x)" by auto}
fun cases_tac intros ctxt =
let
val prod_simps = @{thms split_conv prod_alpha_def rel_prod_conv}
val unbound_tac = REPEAT o (eresolve_tac ctxt @{thms conjE}) THEN' assume_tac ctxt
val bound_tac =
EVERY' [ resolve_tac ctxt [exi_zero],
resolve_tac ctxt @{thms alpha_refl},
asm_full_simp_tac (put_simpset HOL_ss ctxt addsimps prod_simps) ]
in
resolve_tac ctxt intros THEN_ALL_NEW
FIRST' [resolve_tac ctxt @{thms refl}, unbound_tac, bound_tac]
end
fun raw_prove_refl ctxt alpha_result raw_dt_induct =
let
val AlphaResult {alpha_trms, alpha_tys, alpha_bn_trms, alpha_bn_tys, alpha_intros, ...} =
alpha_result
val props =
map (fn (ty, c) => (ty, fn x => c $ x $ x))
((alpha_tys ~~ alpha_trms) @ (alpha_bn_tys ~~ alpha_bn_trms))
in
induct_prove alpha_tys props raw_dt_induct (cases_tac alpha_intros) ctxt
end
val exi_neg = @{lemma "(∃(p::perm). P p) ⟹ (⋀q. P q ⟹ Q (- q)) ⟹ ∃p. Q p"
by (erule exE, rule_tac x="-p" in exI, auto)}
fun prem_bound_tac pred_names alpha_eqvt ctxt =
let
fun trans_prem_tac pred_names ctxt =
SUBPROOF (fn {prems, context = ctxt', ...} =>
let
val prems' = map (transform_prem1 ctxt' pred_names) prems
in
resolve_tac ctxt' prems' 1
end) ctxt
val prod_simps = @{thms split_conv permute_prod.simps prod_alpha_def rel_prod_conv alphas}
in
EVERY'
[ eresolve_tac ctxt [exi_neg],
resolve_tac ctxt @{thms alpha_sym_eqvt},
asm_full_simp_tac (put_simpset HOL_ss ctxt addsimps prod_simps),
eqvt_tac ctxt (eqvt_relaxed_config addpres alpha_eqvt) THEN'
resolve_tac ctxt @{thms refl},
trans_prem_tac pred_names ctxt]
end
fun raw_prove_sym ctxt alpha_result alpha_eqvt =
let
val AlphaResult {alpha_names, alpha_trms, alpha_bn_names, alpha_bn_trms,
alpha_intros, alpha_raw_induct, ...} = alpha_result
val alpha_trms = alpha_trms @ alpha_bn_trms
val alpha_names = alpha_names @ alpha_bn_names
val props = map (fn t => fn (x, y) => t $ y $ x) alpha_trms
fun tac ctxt =
resolve_tac ctxt alpha_intros THEN_ALL_NEW
FIRST' [assume_tac ctxt,
resolve_tac ctxt @{thms sym} THEN' assume_tac ctxt,
prem_bound_tac alpha_names alpha_eqvt ctxt]
in
alpha_prove alpha_trms (alpha_trms ~~ props) alpha_raw_induct tac ctxt
end
fun ecases_tac cases =
Subgoal.FOCUS (fn {context = ctxt, prems, ...} =>
HEADGOAL (resolve_tac ctxt cases THEN' resolve_tac ctxt [List.last prems]))
fun aatac pred_names =
SUBPROOF (fn {context = ctxt, prems, ...} =>
HEADGOAL (resolve_tac ctxt (map (transform_prem1 ctxt pred_names) prems)))
val perm_inst_tac =
Subgoal.FOCUS (fn {context = ctxt, params, ...} =>
let
val (p, q) = apply2 snd (last2 params)
val pq_inst = foldl1 (uncurry Thm.apply) [@{cterm "plus::perm => perm => perm"}, p, q]
val exi_inst = Thm.instantiate' [SOME (@{ctyp "perm"})] [NONE, SOME pq_inst] @{thm exI}
in
HEADGOAL (resolve_tac ctxt [exi_inst])
end)
fun non_trivial_cases_tac pred_names intros alpha_eqvt ctxt =
let
val prod_simps = @{thms split_conv alphas permute_prod.simps prod_alpha_def rel_prod_conv}
in
resolve_tac ctxt intros
THEN_ALL_NEW (asm_simp_tac (put_simpset HOL_basic_ss ctxt) THEN'
TRY o EVERY'
[ eresolve_tac ctxt @{thms exE},
eresolve_tac ctxt @{thms exE},
perm_inst_tac ctxt,
resolve_tac ctxt @{thms alpha_trans_eqvt},
assume_tac ctxt,
aatac pred_names ctxt,
eqvt_tac ctxt (eqvt_relaxed_config addpres alpha_eqvt) THEN'
resolve_tac ctxt @{thms refl},
asm_full_simp_tac (put_simpset HOL_ss ctxt addsimps prod_simps) ])
end
fun prove_trans_tac alpha_result raw_dt_thms alpha_eqvt ctxt =
let
val AlphaResult {alpha_names, alpha_bn_names, alpha_intros, alpha_cases, ...} = alpha_result
val alpha_names = alpha_names @ alpha_bn_names
fun all_cases ctxt =
asm_full_simp_tac (put_simpset HOL_basic_ss ctxt addsimps raw_dt_thms)
THEN' TRY o non_trivial_cases_tac alpha_names alpha_intros alpha_eqvt ctxt
in
EVERY' [ resolve_tac ctxt @{thms allI},
resolve_tac ctxt @{thms impI},
ecases_tac alpha_cases ctxt THEN_ALL_NEW all_cases ctxt ]
end
fun prep_trans_goal alpha_trm (arg1, arg2) =
let
val arg_ty = fastype_of arg1
val mid = alpha_trm $ arg2 $ (Bound 0)
val rhs = alpha_trm $ arg1 $ (Bound 0)
in
HOLogic.all_const arg_ty $ Abs ("z", arg_ty, HOLogic.mk_imp (mid, rhs))
end
fun raw_prove_trans ctxt alpha_result raw_dt_thms alpha_eqvt =
let
val AlphaResult {alpha_trms, alpha_bn_trms,
alpha_raw_induct, ...} = alpha_result
val alpha_trms = alpha_trms @ alpha_bn_trms
val props = map prep_trans_goal alpha_trms
in
alpha_prove alpha_trms (alpha_trms ~~ props) alpha_raw_induct
(prove_trans_tac alpha_result raw_dt_thms alpha_eqvt) ctxt
end
val reflp_def' =
@{lemma "reflp R == ∀x. R x x" by (simp add: reflp_def refl_on_def)}
val symp_def' =
@{lemma "symp R ≡ ∀x y . R x y --> R y x" by (simp add: symp_def sym_def)}
val transp_def' =
@{lemma "transp R ≡ ∀x y. R x y ⟶ (∀z. R y z ⟶ R x z)"
by (rule eq_reflection, auto simp add: trans_def transp_def)}
fun raw_prove_equivp ctxt alpha_result refl symm trans =
let
val AlphaResult {alpha_trms, alpha_bn_trms, ...} = alpha_result
val refl' = map (fold_rule ctxt [reflp_def'] o atomize ctxt) refl
val symm' = map (fold_rule ctxt [symp_def'] o atomize ctxt) symm
val trans' = map (fold_rule ctxt [transp_def'] o atomize ctxt) trans
fun prep_goal t = \<^Const>‹Trueprop for \<^Const>‹equivp ‹domain_type (fastype_of t)› for t››
in
Goal.prove_common ctxt NONE [] [] (map prep_goal (alpha_trms @ alpha_bn_trms))
(fn {context = ctxt', ...} =>
HEADGOAL (Goal.conjunction_tac THEN_ALL_NEW (resolve_tac ctxt' @{thms equivpI} THEN'
RANGE [resolve_tac ctxt' refl', resolve_tac ctxt' symm', resolve_tac ctxt' trans'])))
|> chop (length alpha_trms)
end
fun raw_prove_bn_imp_tac alpha_result ctxt =
SUBPROOF (fn {prems, context = ctxt', ...} =>
let
val AlphaResult {alpha_names, alpha_intros, ...} = alpha_result
val prems' = flat (map Old_Datatype_Aux.split_conj_thm prems)
val prems'' = map (transform_prem1 ctxt' alpha_names) prems'
in
HEADGOAL
(REPEAT_ALL_NEW
(FIRST' [ resolve_tac ctxt' @{thms TrueI},
resolve_tac ctxt' @{thms conjI},
resolve_tac ctxt' prems',
resolve_tac ctxt' prems'',
resolve_tac ctxt' alpha_intros ]))
end) ctxt
fun raw_prove_bn_imp ctxt alpha_result =
let
val AlphaResult {alpha_trms, alpha_tys, alpha_bn_trms, alpha_raw_induct, ...} = alpha_result
val arg_ty = domain_type o fastype_of
val ty_assoc = alpha_tys ~~ alpha_trms
val props = map (fn t => (lookup ty_assoc (arg_ty t), fn (x, y) => t $ x $ y)) alpha_bn_trms
in
alpha_prove (alpha_trms @ alpha_bn_trms) props alpha_raw_induct
(raw_prove_bn_imp_tac alpha_result) ctxt
end
fun raw_fv_bn_rsp_aux ctxt alpha_result fvs bns fv_bns simps =
let
val AlphaResult {alpha_trms, alpha_tys, alpha_bn_trms, alpha_raw_induct, ...} = alpha_result
val arg_ty = domain_type o fastype_of
val ty_assoc = alpha_tys ~~ alpha_trms
fun mk_eq' t x y = HOLogic.mk_eq (t $ x, t $ y)
val prop1 = map (fn t => (lookup ty_assoc (arg_ty t), fn (x, y) => mk_eq' t x y)) fvs
val prop2 = map (fn t => (lookup ty_assoc (arg_ty t), fn (x, y) => mk_eq' t x y)) (bns @ fv_bns)
val prop3 = map2 (fn t1 => fn t2 => (t1, fn (x, y) => mk_eq' t2 x y)) alpha_bn_trms fv_bns
val simpset =
put_simpset HOL_ss ctxt addsimps (simps @ @{thms alphas prod_fv.simps set_simps append.simps}
@ @{thms Un_assoc Un_insert_left Un_empty_right Un_empty_left})
in
alpha_prove (alpha_trms @ alpha_bn_trms) (prop1 @ prop2 @ prop3) alpha_raw_induct
(K (asm_full_simp_tac simpset)) ctxt
end
fun raw_size_rsp_aux ctxt alpha_result simps =
let
val AlphaResult {alpha_trms, alpha_tys, alpha_bn_trms, alpha_bn_tys, alpha_raw_induct, ...} =
alpha_result
fun mk_prop ty (x, y) = HOLogic.mk_eq
(HOLogic.size_const ty $ x, HOLogic.size_const ty $ y)
val props = (alpha_trms @ alpha_bn_trms) ~~ (map mk_prop (alpha_tys @ alpha_bn_tys))
val simpset =
put_simpset HOL_ss ctxt addsimps (simps @ @{thms alphas prod_alpha_def rel_prod_conv
permute_prod_def prod.case prod.rec})
val tac = (TRY o REPEAT o eresolve_tac ctxt @{thms exE}) THEN' asm_full_simp_tac simpset
in
alpha_prove (alpha_trms @ alpha_bn_trms) props alpha_raw_induct (K tac) ctxt
end
fun raw_constr_rsp_tac ctxt alpha_intros simps =
let
val pre_simpset = put_simpset HOL_ss ctxt addsimps @{thms rel_fun_def}
val post_simpset = put_simpset HOL_ss ctxt addsimps @{thms alphas prod_alpha_def rel_prod_conv
prod_fv.simps fresh_star_zero permute_zero prod.case} @ simps
in
asm_full_simp_tac pre_simpset
THEN' REPEAT o (resolve_tac ctxt @{thms allI impI})
THEN' resolve_tac ctxt alpha_intros
THEN_ALL_NEW (TRY o (resolve_tac ctxt [exi_zero]) THEN' asm_full_simp_tac post_simpset)
end
fun raw_constrs_rsp ctxt alpha_result constrs simps =
let
val AlphaResult {alpha_trms, alpha_tys, alpha_intros, ...} = alpha_result
fun lookup ty =
case AList.lookup (op=) (alpha_tys ~~ alpha_trms) ty of
NONE => HOLogic.eq_const ty
| SOME alpha => alpha
fun rel_fun_app (t1, t2) =
Const (@{const_name "rel_fun"}, dummyT) $ t1 $ t2
fun prep_goal trm =
trm
|> strip_type o fastype_of
|> (fn (tys, ty) => tys @ [ty])
|> map lookup
|> foldr1 rel_fun_app
|> (fn t => t $ trm $ trm)
|> Syntax.check_term ctxt
|> HOLogic.mk_Trueprop
in
map (fn constrs =>
Goal.prove_common ctxt NONE [] [] (map prep_goal constrs)
(fn {context = ctxt', ...} =>
HEADGOAL
(Goal.conjunction_tac THEN_ALL_NEW raw_constr_rsp_tac ctxt' alpha_intros simps))) constrs
end
val rsp_equivp =
@{lemma "[|equivp Q; !!x y. R x y ==> Q x y|] ==> (R ===> R ===> (=)) Q Q"
by (simp only: rel_fun_def equivp_def, metis)}
fun raw_alpha_bn_rsp alpha_result alpha_bn_equivp alpha_bn_imps =
let
val AlphaResult {alpha_bn_trms, ...} = alpha_result
fun mk_map thm =
thm |> `Thm.prop_of
|>> List.last o snd o strip_comb
|>> HOLogic.dest_Trueprop
|>> head_of
|>> fst o dest_Const
val alpha_bn_imps' =
map (lookup (map mk_map alpha_bn_imps) o fst o dest_Const) alpha_bn_trms
fun mk_thm thm1 thm2 =
(Thm.forall_intr_vars thm2) COMP (thm1 RS rsp_equivp)
in
map2 mk_thm alpha_bn_equivp alpha_bn_imps'
end
val perm_bn_rsp = @{lemma "(∀x y p. R x y ⟶ R (f p x) (f p y)) ⟹ ((=) ===> R ===> R) f f"
by (simp add: rel_fun_def)}
fun raw_prove_perm_bn_tac alpha_result simps ctxt =
SUBPROOF (fn {prems, context = ctxt', ...} =>
let
val AlphaResult {alpha_names, alpha_bn_names, alpha_intros, ...} = alpha_result
val prems' = flat (map Old_Datatype_Aux.split_conj_thm prems)
val prems'' = map (transform_prem1 ctxt' (alpha_names @ alpha_bn_names)) prems'
in
HEADGOAL
(simp_tac (put_simpset HOL_basic_ss ctxt' addsimps (simps @ prems'))
THEN' TRY o REPEAT_ALL_NEW
(FIRST' [ resolve_tac ctxt' @{thms TrueI},
resolve_tac ctxt' @{thms conjI},
resolve_tac ctxt' @{thms refl},
resolve_tac ctxt' prems',
resolve_tac ctxt' prems'',
resolve_tac ctxt' alpha_intros ]))
end) ctxt
fun raw_perm_bn_rsp ctxt alpha_result perm_bns simps =
let
val AlphaResult {alpha_trms, alpha_tys, alpha_bn_trms, alpha_bn_tys, alpha_raw_induct, ...} =
alpha_result
val perm_bn_ty = range_type o range_type o fastype_of
val ty_assoc = (alpha_tys @ alpha_bn_tys) ~~ (alpha_trms @ alpha_bn_trms)
val ([p], ctxt') = Variable.variant_fixes ["p"] ctxt
val p = Free (p, \<^Type>‹perm›)
fun mk_prop t =
let
val alpha_trm = lookup ty_assoc (perm_bn_ty t)
in
(alpha_trm, fn (x, y) => alpha_trm $ (t $ p $ x) $ (t $ p $ y))
end
val goals = map mk_prop perm_bns
in
alpha_prove (alpha_trms @ alpha_bn_trms) goals alpha_raw_induct
(raw_prove_perm_bn_tac alpha_result simps) ctxt
|> Proof_Context.export ctxt' ctxt
|> map (atomize ctxt)
|> map single
|> map (curry (op OF) perm_bn_rsp)
end
val fun_rsp = @{lemma
"(∀x y. R x y ⟶ f x = f y) ⟹ (R ===> (=)) f f" by (simp add: rel_fun_def)}
fun mk_funs_rsp ctxt thm =
thm
|> atomize ctxt
|> single
|> curry (op OF) fun_rsp
val permute_rsp = @{lemma
"(∀x y p. R x y ⟶ R (permute p x) (permute p y))
==> ((=) ===> R ===> R) permute permute" by (simp add: rel_fun_def)}
fun mk_alpha_permute_rsp ctxt thm =
thm
|> atomize ctxt
|> single
|> curry (op OF) permute_rsp
end