(* Title: HOL/Tools/Function/context_tree.ML
Author: Alexander Krauss, TU Muenchen
A package for general recursive function definitions.
Builds and traverses trees of nested contexts along a term.
*)
signature FUNCTION_CTXTREE =
sig
(* poor man's contexts: fixes + assumes *)
type ctxt = (string * typ) list * thm list
type ctx_tree
(* FIXME: This interface is a mess and needs to be cleaned up! *)
val get_function_congs : Proof.context -> thm list
val add_function_cong : thm -> Context.generic -> Context.generic
val map_function_congs : (thm list -> thm list) -> Context.generic -> Context.generic
val cong_add: attribute
val cong_del: attribute
val mk_tree: (string * typ) -> term -> Proof.context -> term -> ctx_tree
val inst_tree: theory -> term -> term -> ctx_tree -> ctx_tree
val export_term : ctxt -> term -> term
val export_thm : theory -> ctxt -> thm -> thm
val import_thm : theory -> ctxt -> thm -> thm
val traverse_tree :
(ctxt -> term ->
(ctxt * thm) list ->
(ctxt * thm) list * 'b ->
(ctxt * thm) list * 'b)
-> ctx_tree -> 'b -> 'b
val rewrite_by_tree : theory -> term -> thm -> (thm * thm) list ->
ctx_tree -> thm * (thm * thm) list
end
structure Function_Ctx_Tree : FUNCTION_CTXTREE =
struct
type ctxt = (string * typ) list * thm list
open Function_Common
open Function_Lib
structure FunctionCongs = Generic_Data
(
type T = thm list
val empty = []
val extend = I
val merge = Thm.merge_thms
);
val get_function_congs = FunctionCongs.get o Context.Proof
val map_function_congs = FunctionCongs.map
val add_function_cong = FunctionCongs.map o Thm.add_thm
(* congruence rules *)
val cong_add = Thm.declaration_attribute (map_function_congs o Thm.add_thm o safe_mk_meta_eq);
val cong_del = Thm.declaration_attribute (map_function_congs o Thm.del_thm o safe_mk_meta_eq);
type depgraph = int IntGraph.T
datatype ctx_tree =
Leaf of term
| Cong of (thm * depgraph * (ctxt * ctx_tree) list)
| RCall of (term * ctx_tree)
(* Maps "Trueprop A = B" to "A" *)
val rhs_of = snd o HOLogic.dest_eq o HOLogic.dest_Trueprop
(*** Dependency analysis for congruence rules ***)
fun branch_vars t =
let
val t' = snd (dest_all_all t)
val (assumes, concl) = Logic.strip_horn t'
in
(fold Term.add_vars assumes [], Term.add_vars concl [])
end
fun cong_deps crule =
let
val num_branches = map_index (apsnd branch_vars) (prems_of crule)
in
IntGraph.empty
|> fold (fn (i,_)=> IntGraph.new_node (i,i)) num_branches
|> fold_product (fn (i, (c1, _)) => fn (j, (_, t2)) =>
if i = j orelse null (inter (op =) c1 t2)
then I else IntGraph.add_edge_acyclic (i,j))
num_branches num_branches
end
val default_congs =
map (fn c => c RS eq_reflection) [@{thm "cong"}, @{thm "ext"}]
(* Called on the INSTANTIATED branches of the congruence rule *)
fun mk_branch ctx t =
let
val (ctx', fixes, impl) = dest_all_all_ctx ctx t
val (assms, concl) = Logic.strip_horn impl
in
(ctx', fixes, assms, rhs_of concl)
end
fun find_cong_rule ctx fvar h ((r,dep)::rs) t =
(let
val thy = ProofContext.theory_of ctx
val tt' = Logic.mk_equals (Pattern.rewrite_term thy [(Free fvar, h)] [] t, t)
val (c, subs) = (concl_of r, prems_of r)
val subst = Pattern.match (ProofContext.theory_of ctx) (c, tt') (Vartab.empty, Vartab.empty)
val branches = map (mk_branch ctx o Envir.beta_norm o Envir.subst_term subst) subs
val inst = map (fn v =>
(cterm_of thy (Var v), cterm_of thy (Envir.subst_term subst (Var v)))) (Term.add_vars c [])
in
(cterm_instantiate inst r, dep, branches)
end
handle Pattern.MATCH => find_cong_rule ctx fvar h rs t)
| find_cong_rule _ _ _ [] _ = sys_error "Function/context_tree.ML: No cong rule found!"
fun mk_tree fvar h ctxt t =
let
val congs = get_function_congs ctxt
(* FIXME: Save in theory: *)
val congs_deps = map (fn c => (c, cong_deps c)) (congs @ default_congs)
fun matchcall (a $ b) = if a = Free fvar then SOME b else NONE
| matchcall _ = NONE
fun mk_tree' ctx t =
case matchcall t of
SOME arg => RCall (t, mk_tree' ctx arg)
| NONE =>
if not (exists_subterm (fn Free v => v = fvar | _ => false) t) then Leaf t
else
let
val (r, dep, branches) = find_cong_rule ctx fvar h congs_deps t
fun subtree (ctx', fixes, assumes, st) =
((fixes,
map (assume o cterm_of (ProofContext.theory_of ctx)) assumes),
mk_tree' ctx' st)
in
Cong (r, dep, map subtree branches)
end
in
mk_tree' ctxt t
end
fun inst_tree thy fvar f tr =
let
val cfvar = cterm_of thy fvar
val cf = cterm_of thy f
fun inst_term t =
subst_bound(f, abstract_over (fvar, t))
val inst_thm = forall_elim cf o forall_intr cfvar
fun inst_tree_aux (Leaf t) = Leaf t
| inst_tree_aux (Cong (crule, deps, branches)) =
Cong (inst_thm crule, deps, map inst_branch branches)
| inst_tree_aux (RCall (t, str)) =
RCall (inst_term t, inst_tree_aux str)
and inst_branch ((fxs, assms), str) =
((fxs, map (assume o cterm_of thy o inst_term o prop_of) assms),
inst_tree_aux str)
in
inst_tree_aux tr
end
(* Poor man's contexts: Only fixes and assumes *)
fun compose (fs1, as1) (fs2, as2) = (fs1 @ fs2, as1 @ as2)
fun export_term (fixes, assumes) =
fold_rev (curry Logic.mk_implies o prop_of) assumes
#> fold_rev (Logic.all o Free) fixes
fun export_thm thy (fixes, assumes) =
fold_rev (implies_intr o cprop_of) assumes
#> fold_rev (forall_intr o cterm_of thy o Free) fixes
fun import_thm thy (fixes, athms) =
fold (forall_elim o cterm_of thy o Free) fixes
#> fold Thm.elim_implies athms
(* folds in the order of the dependencies of a graph. *)
fun fold_deps G f x =
let
fun fill_table i (T, x) =
case Inttab.lookup T i of
SOME _ => (T, x)
| NONE =>
let
val (T', x') = fold fill_table (IntGraph.imm_succs G i) (T, x)
val (v, x'') = f (the o Inttab.lookup T') i x'
in
(Inttab.update (i, v) T', x'')
end
val (T, x) = fold fill_table (IntGraph.keys G) (Inttab.empty, x)
in
(Inttab.fold (cons o snd) T [], x)
end
fun traverse_tree rcOp tr =
let
fun traverse_help ctx (Leaf _) _ x = ([], x)
| traverse_help ctx (RCall (t, st)) u x =
rcOp ctx t u (traverse_help ctx st u x)
| traverse_help ctx (Cong (_, deps, branches)) u x =
let
fun sub_step lu i x =
let
val (ctx', subtree) = nth branches i
val used = fold_rev (append o lu) (IntGraph.imm_succs deps i) u
val (subs, x') = traverse_help (compose ctx ctx') subtree used x
val exported_subs = map (apfst (compose ctx')) subs (* FIXME: Right order of composition? *)
in
(exported_subs, x')
end
in
fold_deps deps sub_step x
|> apfst flat
end
in
snd o traverse_help ([], []) tr []
end
fun rewrite_by_tree thy h ih x tr =
let
fun rewrite_help _ _ x (Leaf t) = (reflexive (cterm_of thy t), x)
| rewrite_help fix h_as x (RCall (_ $ arg, st)) =
let
val (inner, (lRi,ha)::x') = rewrite_help fix h_as x st (* "a' = a" *)
val iha = import_thm thy (fix, h_as) ha (* (a', h a') : G *)
|> Conv.fconv_rule (Conv.arg_conv (Conv.comb_conv (Conv.arg_conv (K inner))))
(* (a, h a) : G *)
val inst_ih = instantiate' [] [SOME (cterm_of thy arg)] ih
val eq = implies_elim (implies_elim inst_ih lRi) iha (* h a = f a *)
val h_a'_eq_h_a = combination (reflexive (cterm_of thy h)) inner
val h_a_eq_f_a = eq RS eq_reflection
val result = transitive h_a'_eq_h_a h_a_eq_f_a
in
(result, x')
end
| rewrite_help fix h_as x (Cong (crule, deps, branches)) =
let
fun sub_step lu i x =
let
val ((fixes, assumes), st) = nth branches i
val used = map lu (IntGraph.imm_succs deps i)
|> map (fn u_eq => (u_eq RS sym) RS eq_reflection)
|> filter_out Thm.is_reflexive
val assumes' = map (simplify (HOL_basic_ss addsimps used)) assumes
val (subeq, x') =
rewrite_help (fix @ fixes) (h_as @ assumes') x st
val subeq_exp =
export_thm thy (fixes, assumes) (subeq RS meta_eq_to_obj_eq)
in
(subeq_exp, x')
end
val (subthms, x') = fold_deps deps sub_step x
in
(fold_rev (curry op COMP) subthms crule, x')
end
in
rewrite_help [] [] x tr
end
end