(* Author: Lukas Bulwahn, TU Muenchen
Preprocessing functions to predicates
*)
signature PREDICATE_COMPILE_FUN =
sig
val define_predicates : (string * thm list) list -> theory -> (string * thm list) list * theory
val rewrite_intro : theory -> thm -> thm list
val setup_oracle : theory -> theory
val pred_of_function : theory -> string -> string option
end;
structure Predicate_Compile_Fun : PREDICATE_COMPILE_FUN =
struct
(* Oracle for preprocessing *)
val (oracle : (string * (cterm -> thm)) option Unsynchronized.ref) = Unsynchronized.ref NONE;
fun the_oracle () =
case !oracle of
NONE => error "Oracle is not setup"
| SOME (_, oracle) => oracle
val setup_oracle = Thm.add_oracle (Binding.name "pred_compile_preprocessing", I) #->
(fn ora => fn thy => let val _ = (oracle := SOME ora) in thy end)
fun is_funtype (Type ("fun", [_, _])) = true
| is_funtype _ = false;
fun is_Type (Type _) = true
| is_Type _ = false
(* returns true if t is an application of an datatype constructor *)
(* which then consequently would be splitted *)
(* else false *)
(*
fun is_constructor thy t =
if (is_Type (fastype_of t)) then
(case DatatypePackage.get_datatype thy ((fst o dest_Type o fastype_of) t) of
NONE => false
| SOME info => (let
val constr_consts = maps (fn (_, (_, _, constrs)) => map fst constrs) (#descr info)
val (c, _) = strip_comb t
in (case c of
Const (name, _) => name mem_string constr_consts
| _ => false) end))
else false
*)
(* must be exported in code.ML *)
fun is_constr thy = is_some o Code.get_datatype_of_constr thy;
(* Table from constant name (string) to term of inductive predicate *)
structure Pred_Compile_Preproc = TheoryDataFun
(
type T = string Symtab.table;
val empty = Symtab.empty;
val copy = I;
val extend = I;
fun merge _ = Symtab.merge (op =);
)
fun pred_of_function thy name = Symtab.lookup (Pred_Compile_Preproc.get thy) name
fun defined thy = Symtab.defined (Pred_Compile_Preproc.get thy)
fun transform_ho_typ (T as Type ("fun", _)) =
let
val (Ts, T') = strip_type T
in if T' = @{typ "bool"} then T else (Ts @ [T']) ---> HOLogic.boolT end
| transform_ho_typ t = t
fun transform_ho_arg arg =
case (fastype_of arg) of
(T as Type ("fun", _)) =>
(case arg of
Free (name, _) => Free (name, transform_ho_typ T)
| _ => error "I am surprised")
| _ => arg
fun pred_type T =
let
val (Ts, T') = strip_type T
val Ts' = map transform_ho_typ Ts
in
(Ts' @ [T']) ---> HOLogic.boolT
end;
(* FIXME: create new predicate name -- does not avoid nameclashing *)
fun pred_of f =
let
val (name, T) = dest_Const f
in
if (body_type T = @{typ bool}) then
(Free (Long_Name.base_name name ^ "P", T))
else
(Free (Long_Name.base_name name ^ "P", pred_type T))
end
fun mk_param thy lookup_pred (t as Free (v, _)) = lookup_pred t
| mk_param thy lookup_pred t =
let
val _ = tracing ("called param with " ^ (Syntax.string_of_term_global thy t))
in if Predicate_Compile_Aux.is_predT (fastype_of t) then
t
else
let
val (vs, body) = strip_abs t
val names = Term.add_free_names body []
val vs_names = Name.variant_list names (map fst vs)
val vs' = map2 (curry Free) vs_names (map snd vs)
val body' = subst_bounds (rev vs', body)
val (f, args) = strip_comb body'
val resname = Name.variant (vs_names @ names) "res"
val resvar = Free (resname, body_type (fastype_of body'))
(*val P = case try lookup_pred f of SOME P => P | NONE => error "mk_param"
val pred_body = list_comb (P, args @ [resvar])
*)
val pred_body = HOLogic.mk_eq (body', resvar)
val param = fold_rev lambda (vs' @ [resvar]) pred_body
in param end
end
(* creates the list of premises for every intro rule *)
(* theory -> term -> (string list, term list list) *)
fun dest_code_eqn eqn = let
val (lhs, rhs) = Logic.dest_equals (Logic.unvarify (Thm.prop_of eqn))
val (func, args) = strip_comb lhs
in ((func, args), rhs) end;
fun string_of_typ T = Syntax.string_of_typ_global @{theory} T
fun string_of_term t =
case t of
Const (c, T) => "Const (" ^ c ^ ", " ^ string_of_typ T ^ ")"
| Free (c, T) => "Free (" ^ c ^ ", " ^ string_of_typ T ^ ")"
| Var ((c, i), T) => "Var ((" ^ c ^ ", " ^ string_of_int i ^ "), " ^ string_of_typ T ^ ")"
| Bound i => "Bound " ^ string_of_int i
| Abs (x, T, t) => "Abs (" ^ x ^ ", " ^ string_of_typ T ^ ", " ^ string_of_term t ^ ")"
| t1 $ t2 => "(" ^ string_of_term t1 ^ ") $ (" ^ string_of_term t2 ^ ")"
fun ind_package_get_nparams thy name =
case try (Inductive.the_inductive (ProofContext.init thy)) name of
SOME (_, result) => length (Inductive.params_of (#raw_induct result))
| NONE => error ("No such predicate: " ^ quote name)
(* TODO: does not work with higher order functions yet *)
fun mk_rewr_eq (func, pred) =
let
val (argTs, resT) = (strip_type (fastype_of func))
val nctxt =
Name.make_context (Term.fold_aterms (fn Free (x, _) => insert (op =) x | _ => I) (func $ pred) [])
val (argnames, nctxt') = Name.variants (replicate (length argTs) "a") nctxt
val ([resname], nctxt'') = Name.variants ["r"] nctxt'
val args = map Free (argnames ~~ argTs)
val res = Free (resname, resT)
in Logic.mk_equals
(HOLogic.mk_eq (res, list_comb (func, args)), list_comb (pred, args @ [res]))
end;
fun has_split_rule_cname @{const_name "nat_case"} = true
| has_split_rule_cname @{const_name "list_case"} = true
| has_split_rule_cname _ = false
fun has_split_rule_term thy (Const (@{const_name "nat_case"}, _)) = true
| has_split_rule_term thy (Const (@{const_name "list_case"}, _)) = true
| has_split_rule_term thy _ = false
fun has_split_rule_term' thy (Const (@{const_name "If"}, _)) = true
| has_split_rule_term' thy (Const (@{const_name "Let"}, _)) = true
| has_split_rule_term' thy c = has_split_rule_term thy c
fun prepare_split_thm ctxt split_thm =
(split_thm RS @{thm iffD2})
|> LocalDefs.unfold ctxt [@{thm atomize_conjL[symmetric]},
@{thm atomize_all[symmetric]}, @{thm atomize_imp[symmetric]}]
fun find_split_thm thy (Const (name, typ)) =
let
fun split_name str =
case first_field "." str
of (SOME (field, rest)) => field :: split_name rest
| NONE => [str]
val splitted_name = split_name name
in
if length splitted_name > 0 andalso
String.isSuffix "_case" (List.last splitted_name)
then
(List.take (splitted_name, length splitted_name - 1)) @ ["split"]
|> space_implode "."
|> PureThy.get_thm thy
|> SOME
handle ERROR msg => NONE
else NONE
end
| find_split_thm _ _ = NONE
fun find_split_thm' thy (Const (@{const_name "If"}, _)) = SOME @{thm split_if}
| find_split_thm' thy (Const (@{const_name "Let"}, _)) = SOME @{thm refl} (* TODO *)
| find_split_thm' thy c = find_split_thm thy c
fun strip_all t = (Term.strip_all_vars t, Term.strip_all_body t)
fun folds_map f xs y =
let
fun folds_map' acc [] y = [(rev acc, y)]
| folds_map' acc (x :: xs) y =
maps (fn (x, y) => folds_map' (x :: acc) xs y) (f x y)
in
folds_map' [] xs y
end;
fun mk_prems thy (lookup_pred, get_nparams) t (names, prems) =
let
fun mk_prems' (t as Const (name, T)) (names, prems) =
if is_constr thy name orelse (is_none (try lookup_pred t)) then
[(t, (names, prems))]
else [(lookup_pred t, (names, prems))]
| mk_prems' (t as Free (f, T)) (names, prems) =
[(lookup_pred t, (names, prems))]
| mk_prems' (t as Abs _) (names, prems) =
if Predicate_Compile_Aux.is_predT (fastype_of t) then
[(t, (names, prems))] else error "mk_prems': Abs "
(* mk_param *)
| mk_prems' t (names, prems) =
if Predicate_Compile_Aux.is_constrt thy t then
[(t, (names, prems))]
else
if has_split_rule_term' thy (fst (strip_comb t)) then
let
val (f, args) = strip_comb t
val split_thm = prepare_split_thm (ProofContext.init thy) (the (find_split_thm' thy f))
(* TODO: contextify things - this line is to unvarify the split_thm *)
(*val ((_, [isplit_thm]), _) = Variable.import true [split_thm] (ProofContext.init thy)*)
val (assms, concl) = Logic.strip_horn (Thm.prop_of split_thm)
val (P, [split_t]) = strip_comb (HOLogic.dest_Trueprop concl)
val subst = Pattern.match thy (split_t, t) (Vartab.empty, Vartab.empty)
val (_, split_args) = strip_comb split_t
val match = split_args ~~ args
fun mk_prems_of_assm assm =
let
val (vTs, assm') = strip_all (Envir.beta_norm (Envir.subst_term subst assm))
val var_names = Name.variant_list names (map fst vTs)
val vars = map Free (var_names ~~ (map snd vTs))
val (prems', pre_res) = Logic.strip_horn (subst_bounds (rev vars, assm'))
val (_, [inner_t]) = strip_comb (HOLogic.dest_Trueprop pre_res)
in
mk_prems' inner_t (var_names @ names, prems' @ prems)
end
in
maps mk_prems_of_assm assms
end
else
let
val (f, args) = strip_comb t
(* TODO: special procedure for higher-order functions: split arguments in
simple types and function types *)
val resname = Name.variant names "res"
val resvar = Free (resname, body_type (fastype_of t))
val names' = resname :: names
fun mk_prems'' (t as Const (c, _)) =
if is_constr thy c orelse (is_none (try lookup_pred t)) then
folds_map mk_prems' args (names', prems) |>
map
(fn (argvs, (names'', prems')) =>
let
val prem = HOLogic.mk_Trueprop (HOLogic.mk_eq (resvar, list_comb (f, argvs)))
in (names'', prem :: prems') end)
else
let
val pred = lookup_pred t
val nparams = get_nparams pred
val (params, args) = chop nparams args
val params' = map (mk_param thy lookup_pred) params
in
folds_map mk_prems' args (names', prems)
|> map (fn (argvs, (names'', prems')) =>
let
val prem = HOLogic.mk_Trueprop (list_comb (pred, params' @ argvs @ [resvar]))
in (names'', prem :: prems') end)
end
| mk_prems'' (t as Free (_, _)) =
let
(* higher order argument call *)
val pred = lookup_pred t
in
folds_map mk_prems' args (resname :: names, prems)
|> map (fn (argvs, (names', prems')) =>
let
val prem = HOLogic.mk_Trueprop (list_comb (pred, argvs @ [resvar]))
in (names', prem :: prems') end)
end
| mk_prems'' t =
error ("Invalid term: " ^ Syntax.string_of_term_global thy t)
in
map (pair resvar) (mk_prems'' f)
end
in
mk_prems' t (names, prems)
end;
(* assumption: mutual recursive predicates all have the same parameters. *)
fun define_predicates specs thy =
if forall (fn (const, _) => member (op =) (Symtab.keys (Pred_Compile_Preproc.get thy)) const) specs then
([], thy)
else
let
val consts = map fst specs
val eqns = maps snd specs
(*val eqns = maps (Predicate_Compile_Preproc_Data.get_specification thy) consts*)
(* create prednames *)
val ((funs, argss), rhss) = map_split dest_code_eqn eqns |>> split_list
val argss' = map (map transform_ho_arg) argss
val pnames = map dest_Free (distinct (op =) (maps (filter (is_funtype o fastype_of)) argss'))
val preds = map pred_of funs
val prednames = map (fst o dest_Free) preds
val funnames = map (fst o dest_Const) funs
val fun_pred_names = (funnames ~~ prednames)
(* mapping from term (Free or Const) to term *)
fun lookup_pred (Const (name, T)) =
(case (Symtab.lookup (Pred_Compile_Preproc.get thy) name) of
SOME c => Const (c, pred_type T)
| NONE =>
(case AList.lookup op = fun_pred_names name of
SOME f => Free (f, pred_type T)
| NONE => Const (name, T)))
| lookup_pred (Free (name, T)) =
if member op = (map fst pnames) name then
Free (name, transform_ho_typ T)
else
Free (name, T)
| lookup_pred t =
error ("lookup function is not defined for " ^ Syntax.string_of_term_global thy t)
(* mapping from term (predicate term, not function term!) to int *)
fun get_nparams (Const (name, _)) =
the_default 0 (try (ind_package_get_nparams thy) name)
| get_nparams (Free (name, _)) =
(if member op = prednames name then
length pnames
else 0)
| get_nparams t = error ("No parameters for " ^ (Syntax.string_of_term_global thy t))
(* create intro rules *)
fun mk_intros ((func, pred), (args, rhs)) =
if (body_type (fastype_of func) = @{typ bool}) then
(*TODO: preprocess predicate definition of rhs *)
[Logic.list_implies ([HOLogic.mk_Trueprop rhs], HOLogic.mk_Trueprop (list_comb (pred, args)))]
else
let
val names = Term.add_free_names rhs []
in mk_prems thy (lookup_pred, get_nparams) rhs (names, [])
|> map (fn (resultt, (names', prems)) =>
Logic.list_implies (prems, HOLogic.mk_Trueprop (list_comb (pred, args @ [resultt]))))
end
fun mk_rewr_thm (func, pred) = @{thm refl}
in
case try (maps mk_intros) ((funs ~~ preds) ~~ (argss' ~~ rhss)) of
NONE => ([], thy)
| SOME intr_ts =>
if is_some (try (map (cterm_of thy)) intr_ts) then
let
val (ind_result, thy') =
Inductive.add_inductive_global (serial ())
{quiet_mode = false, verbose = false, kind = Thm.internalK,
alt_name = Binding.empty, coind = false, no_elim = false,
no_ind = false, skip_mono = false, fork_mono = false}
(map (fn (s, T) => ((Binding.name s, T), NoSyn)) (distinct (op =) (map dest_Free preds)))
pnames
(map (fn x => (Attrib.empty_binding, x)) intr_ts)
[] thy
val prednames = map (fst o dest_Const) (#preds ind_result)
(* val rewr_thms = map mk_rewr_eq ((distinct (op =) funs) ~~ (#preds ind_result)) *)
(* add constants to my table *)
val specs = map (fn predname => (predname, filter (Predicate_Compile_Aux.is_intro predname) (#intrs ind_result))) prednames
val thy'' = Pred_Compile_Preproc.map (fold Symtab.update_new (consts ~~ prednames)) thy'
in
(specs, thy'')
end
else
let
val _ = tracing "Introduction rules of function_predicate are not welltyped"
in ([], thy) end
end
(* preprocessing intro rules - uses oracle *)
(* theory -> thm -> thm *)
fun rewrite_intro thy intro =
let
fun lookup_pred (Const (name, T)) =
(case (Symtab.lookup (Pred_Compile_Preproc.get thy) name) of
SOME c => Const (c, pred_type T)
| NONE => error ("Function " ^ name ^ " is not inductified"))
| lookup_pred (Free (name, T)) = Free (name, T)
| lookup_pred _ = error "lookup function is not defined!"
fun get_nparams (Const (name, _)) =
the_default 0 (try (ind_package_get_nparams thy) name)
| get_nparams (Free _) = 0
| get_nparams t = error ("No parameters for " ^ (Syntax.string_of_term_global thy t))
val intro_t = (Logic.unvarify o prop_of) intro
val (prems, concl) = Logic.strip_horn intro_t
val frees = map fst (Term.add_frees intro_t [])
fun rewrite prem names =
let
val t = (HOLogic.dest_Trueprop prem)
val (lit, mk_lit) = case try HOLogic.dest_not t of
SOME t => (t, HOLogic.mk_not)
| NONE => (t, I)
val (P, args) = (strip_comb lit)
in
folds_map (
fn t => if (is_funtype (fastype_of t)) then (fn x => [(t, x)])
else mk_prems thy (lookup_pred, get_nparams) t) args (names, [])
|> map (fn (resargs, (names', prems')) =>
let
val prem' = HOLogic.mk_Trueprop (mk_lit (list_comb (P, resargs)))
in (prem'::prems', names') end)
end
val intro_ts' = folds_map rewrite prems frees
|> maps (fn (prems', frees') =>
rewrite concl frees'
|> map (fn (concl'::conclprems, _) =>
Logic.list_implies ((flat prems') @ conclprems, concl')))
in
map (Drule.standard o the_oracle () o cterm_of thy) intro_ts'
end;
end;