author paulson
Fri, 05 Oct 2007 09:59:03 +0200
changeset 24854 0ebcd575d3c6
parent 23841 598839baafed
child 29269 5c25a2012975
permissions -rw-r--r--
filtering out some package theorems

(*  Title:      Pure/search.ML
    ID:         $Id$
    Author:     Lawrence C Paulson and Norbert Voelker

Search tacticals.


signature SEARCH =
  val DEEPEN            : int*int -> (int->int->tactic) -> int -> int -> tactic

  val THEN_MAYBE        : tactic * tactic -> tactic
  val THEN_MAYBE'       : ('a -> tactic) * ('a -> tactic) -> ('a -> tactic)

  val trace_DEPTH_FIRST : bool ref
  val DEPTH_FIRST       : (thm -> bool) -> tactic -> tactic
  val DEPTH_SOLVE       : tactic -> tactic
  val DEPTH_SOLVE_1     : tactic -> tactic
  val ITER_DEEPEN       : (thm->bool) -> (int->tactic) -> tactic
  val THEN_ITER_DEEPEN  : tactic -> (thm->bool) -> (int->tactic) -> tactic
  val iter_deepen_limit : int ref

  val has_fewer_prems   : int -> thm -> bool
  val IF_UNSOLVED       : tactic -> tactic
  val SOLVE             : tactic -> tactic
  val DETERM_UNTIL_SOLVED: tactic -> tactic
  val trace_BEST_FIRST  : bool ref
  val BEST_FIRST        : (thm -> bool) * (thm -> int) -> tactic -> tactic
  val THEN_BEST_FIRST   : tactic -> (thm->bool) * (thm->int) -> tactic
                          -> tactic
  val trace_ASTAR       : bool ref
  val ASTAR             : (thm -> bool) * (int->thm->int) -> tactic -> tactic
  val THEN_ASTAR        : tactic -> (thm->bool) * (int->thm->int) -> tactic
                          -> tactic
  val BREADTH_FIRST     : (thm -> bool) -> tactic -> tactic
  val QUIET_BREADTH_FIRST       : (thm -> bool) -> tactic -> tactic

(** Instantiation of heaps for best-first search **)

(*total ordering on theorems, allowing duplicates to be found*)
structure ThmHeap =
  HeapFun (type elem = int * thm
    val ord = Library.prod_ord Library.int_ord
      (Term.term_ord o Library.pairself (#prop o Thm.rep_thm)));

structure Search : SEARCH =

(**** Depth-first search ****)

val trace_DEPTH_FIRST = ref false;

(*Searches until "satp" reports proof tree as satisfied.
  Suppresses duplicate solutions to minimize search space.*)
fun DEPTH_FIRST satp tac =
 let val tac = tracify trace_DEPTH_FIRST tac
     fun depth used [] = NONE
       | depth used (q::qs) =
          case Seq.pull q of
              NONE         => depth used qs
            | SOME(st,stq) =>
                if satp st andalso not (member Thm.eq_thm used st)
                then SOME(st, Seq.make
                                 (fn()=> depth (st::used) (stq::qs)))
                else depth used (tac st :: stq :: qs)
  in  traced_tac (fn st => depth [] [Seq.single st])  end;

(*Predicate: Does the rule have fewer than n premises?*)
fun has_fewer_prems n rule = (nprems_of rule < n);

(*Apply a tactic if subgoals remain, else do nothing.*)
val IF_UNSOLVED = COND (has_fewer_prems 1) all_tac;

(*Force a tactic to solve its goal completely, otherwise fail *)
fun SOLVE tac = tac THEN COND (has_fewer_prems 1) all_tac no_tac;

(*Force repeated application of tactic until goal is solved completely *)
val DETERM_UNTIL_SOLVED = DETERM_UNTIL (has_fewer_prems 1);

(*Execute tac1, but only execute tac2 if there are at least as many subgoals
  as before.  This ensures that tac2 is only applied to an outcome of tac1.*)
fun (tac1 THEN_MAYBE tac2) st =
    (tac1  THEN  COND (has_fewer_prems (nprems_of st)) all_tac tac2)  st;

fun (tac1 THEN_MAYBE' tac2) x = tac1 x THEN_MAYBE tac2 x;

(*Tactical to reduce the number of premises by 1.
  If no subgoals then it must fail! *)
fun DEPTH_SOLVE_1 tac st = st |>
    (case nprems_of st of
        0 => no_tac
      | n => DEPTH_FIRST (has_fewer_prems n) tac);

(*Uses depth-first search to solve ALL subgoals*)
val DEPTH_SOLVE = DEPTH_FIRST (has_fewer_prems 1);

(**** Iterative deepening with pruning ****)

fun has_vars (Var _) = true
  | has_vars (Abs (_,_,t)) = has_vars t
  | has_vars (f$t) = has_vars f orelse has_vars t
  | has_vars _ = false;

(*Counting of primitive inferences is APPROXIMATE, as the step tactic
  may perform >1 inference*)

(*Pruning of rigid ancestor to prevent backtracking*)
fun prune (new as (k', np':int, rgd', stq), qs) =
    let fun prune_aux (qs, []) = new::qs
          | prune_aux (qs, (k,np,rgd,q)::rqs) =
              if np'+1 = np andalso rgd then
                  (if !trace_DEPTH_FIRST then
                       tracing ("Pruning " ^
                                string_of_int (1+length rqs) ^ " levels")
                   else ();
                   (*Use OLD k: zero-cost solution; see Stickel, p 365*)
                   (k, np', rgd', stq) :: qs)
              else prune_aux ((k,np,rgd,q)::qs, rqs)
        fun take ([], rqs) = ([], rqs)
          | take (arg as ((k,np,rgd,stq)::qs, rqs)) =
                if np' < np then take (qs, (k,np,rgd,stq)::rqs)
                            else arg
    in  prune_aux (take (qs, []))  end;

(*No known example (on 1-5-2007) needs even thirty*)
val iter_deepen_limit = ref 50;

(*Depth-first iterative deepening search for a state that satisfies satp
  tactic tac0 sets up the initial goal queue, while tac1 searches it.
  The solution sequence is redundant: the cutoff heuristic makes it impossible
  to suppress solutions arising from earlier searches, as the accumulated cost
  (k) can be wrong.*)
fun THEN_ITER_DEEPEN tac0 satp tac1 = traced_tac (fn st =>
 let val countr = ref 0
     and tf = tracify trace_DEPTH_FIRST (tac1 1)
     and qs0 = tac0 st
     (*bnd = depth bound; inc = estimate of increment required next*)
     fun depth (bnd,inc) [] =
          if bnd > !iter_deepen_limit then
             (tracing (string_of_int (!countr) ^
                       " inferences so far.  Giving up at " ^ string_of_int bnd);
             (tracing (string_of_int (!countr) ^
                       " inferences so far.  Searching to depth " ^
                       string_of_int bnd);
              (*larger increments make it run slower for the hard problems*)
              depth (bnd+inc, 10)) [(0, 1, false, qs0)]
       | depth (bnd,inc) ((k,np,rgd,q)::qs) =
          if k>=bnd then depth (bnd,inc) qs
          case (countr := !countr+1;
                if !trace_DEPTH_FIRST then
                    tracing (string_of_int np ^ implode (map (fn _ => "*") qs))
                else ();
                Seq.pull q) of
             NONE         => depth (bnd,inc) qs
           | SOME(st,stq) =>
               if satp st       (*solution!*)
               then SOME(st, Seq.make
                         (fn()=> depth (bnd,inc) ((k,np,rgd,stq)::qs)))

               let val np' = nprems_of st
                     (*rgd' calculation assumes tactic operates on subgoal 1*)
                   val rgd' = not (has_vars (hd (prems_of st)))
                   val k' = k+np'-np+1  (*difference in # of subgoals, +1*)
               in  if k'+np' >= bnd
                   then depth (bnd, Int.min(inc, k'+np'+1-bnd)) qs
                   else if np' < np (*solved a subgoal; prune rigid ancestors*)
                   then depth (bnd,inc)
                         (prune ((k', np', rgd', tf st), (k,np,rgd,stq) :: qs))
                   else depth (bnd,inc) ((k', np', rgd', tf st) ::
                                         (k,np,rgd,stq) :: qs)
  in depth (0,5) [] end);


(*Simple iterative deepening tactical.  It merely "deepens" any search tactic
  using increment "inc" up to limit "lim". *)
fun DEEPEN (inc,lim) tacf m i =
  let fun dpn m st =
       st |> (if has_fewer_prems i st then no_tac
              else if m>lim then
                       (warning "Search depth limit exceeded: giving up";
              else (priority ("Search depth = " ^ string_of_int m);
                             tacf m i  ORELSE  dpn (m+inc)))
  in  dpn m  end;

(*** Best-first search ***)

val trace_BEST_FIRST = ref false;

(*For creating output sequence*)
fun some_of_list []     = NONE
  | some_of_list (x::l) = SOME (x, Seq.make (fn () => some_of_list l));

(*Check for and delete duplicate proof states*)
fun deleteAllMin prf heap =
      if ThmHeap.is_empty heap then heap
      else if Thm.eq_thm (prf, #2 (ThmHeap.min heap))
      then deleteAllMin prf (ThmHeap.delete_min heap)
      else heap;

(*Best-first search for a state that satisfies satp (incl initial state)
  Function sizef estimates size of problem remaining (smaller means better).
  tactic tac0 sets up the initial priority queue, while tac1 searches it. *)
fun THEN_BEST_FIRST tac0 (satp, sizef) tac1 =
  let val tac = tracify trace_BEST_FIRST tac1
      fun pairsize th = (sizef th, th);
      fun bfs (news,nprf_heap) =
           (case  List.partition satp news  of
                ([],nonsats) => next(fold_rev ThmHeap.insert (map pairsize nonsats) nprf_heap)
              | (sats,_)  => some_of_list sats)
      and next nprf_heap =
            if ThmHeap.is_empty nprf_heap then NONE
            let val (n,prf) = ThmHeap.min nprf_heap
            in if !trace_BEST_FIRST
               then tracing("state size = " ^ string_of_int n)
               else ();
               bfs (Seq.list_of (tac prf),
                    deleteAllMin prf (ThmHeap.delete_min nprf_heap))
      fun btac st = bfs (Seq.list_of (tac0 st), ThmHeap.empty)
  in traced_tac btac end;

(*Ordinary best-first search, with no initial tactic*)

(*Breadth-first search to satisfy satpred (including initial state)
fun gen_BREADTH_FIRST message satpred (tac:tactic) =
  let val tacf = Seq.list_of o tac;
      fun bfs prfs =
         (case  List.partition satpred prfs  of
              ([],[]) => []
            | ([],nonsats) =>
                  (message("breadth=" ^ string_of_int(length nonsats));
                   bfs (maps tacf nonsats))
            | (sats,_)  => sats)
  in (fn st => Seq.of_list (bfs [st])) end;


(*  Author:     Norbert Voelker, FernUniversitaet Hagen
    Remarks:    Implementation of A*-like proof procedure by modification
                of the existing code for BEST_FIRST and best_tac so that the
                current level of search is taken into account.

(*Insertion into priority queue of states, marked with level *)
fun insert_with_level (lnth: int*int*thm, []) = [lnth]
  | insert_with_level ((l,m,th), (l',n,th')::nths) =
      if  n<m then (l',n,th') :: insert_with_level ((l,m,th), nths)
      else if  n=m andalso Thm.eq_thm(th,th')
              then (l',n,th')::nths
              else (l,m,th)::(l',n,th')::nths;

(*For creating output sequence*)
fun some_of_list []     = NONE
  | some_of_list (x::l) = SOME (x, Seq.make (fn () => some_of_list l));

val trace_ASTAR = ref false;

fun THEN_ASTAR tac0 (satp, costf) tac1 =
  let val tf = tracify trace_ASTAR tac1;
      fun bfs (news,nprfs,level) =
      let fun cost thm = (level, costf level thm, thm)
      in (case  List.partition satp news  of
                 => next (List.foldr insert_with_level nprfs (map cost nonsats))
          | (sats,_)  => some_of_list sats)
      end and
      next []  = NONE
        | next ((level,n,prf)::nprfs)  =
            (if !trace_ASTAR
               then tracing("level = " ^ string_of_int level ^
                         "  cost = " ^ string_of_int n ^
                         "  queue length =" ^ string_of_int (length nprfs))
               else ();
             bfs (Seq.list_of (tf prf), nprfs,level+1))
      fun tf st = bfs (Seq.list_of (tac0 st), [], 0)
  in traced_tac tf end;

(*Ordinary ASTAR, with no initial tactic*)
val ASTAR = THEN_ASTAR all_tac;


open Search;