2009-11-11 10:56:37 +00:00
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%%============================================================================
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%% The SWI-Prolog interface to MiniSat SAT solver
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%% http://www.cs.chalmers.se/Cs/Research/FormalMethods/MiniSat/MiniSat.html
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%%
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%% Copyright (c) 2006, Michael Codish, Vitaly Lagoon, and Peter J. Stuckey
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%%
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%% Permission is hereby granted, free of charge, to any person obtaining a
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%% copy of this software and associated documentation files (the
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%% "Software"), to deal in the Software without restriction, including
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%% without limitation the rights to use, copy, modify, merge, publish,
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%% distribute, sublicense, and/or sell copies of the Software, and to
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%% permit persons to whom the Software is furnished to do so, subject to
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%% the following conditions:
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%%
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%% The above copyright notice and this permission notice shall be included
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%% in all copies or substantial portions of the Software.
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%%
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%% THE SOFTWARE IS PROVIDED "AS IS", WITHOUT WARRANTY OF ANY KIND, EXPRESS
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%% OR IMPLIED, INCLUDING BUT NOT LIMITED TO THE WARRANTIES OF
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%% MERCHANTABILITY, FITNESS FOR A PARTICULAR PURPOSE AND
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%% NONINFRINGEMENT. IN NO EVENT SHALL THE AUTHORS OR COPYRIGHT HOLDERS BE
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%% LIABLE FOR ANY CLAIM, DAMAGES OR OTHER LIABILITY, WHETHER IN AN ACTION
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%% OF CONTRACT, TORT OR OTHERWISE, ARISING FROM, OUT OF OR IN CONNECTION
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%% WITH THE SOFTWARE OR THE USE OR OTHER DEALINGS IN THE SOFTWARE.
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:- module(minisat,[
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solve/1,
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sat/1,
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sat_init/0,
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sat_deinit/0,
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sat_add_clauses/3,
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sat_solve/1,
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minimize/2,
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maximize/2,
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minimize_v1/2,
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maximize_v1/2,
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minimize_v2/2,
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maximize_v2/2,
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minimize_v3/2,
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maximize_v3/2
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]).
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2015-11-09 11:28:44 +00:00
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:- use_module(library(shlib)).
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2009-11-11 10:56:37 +00:00
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2014-08-23 20:47:40 +01:00
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:- use_module(library(lists)).
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:- load_foreign_library('pl-minisat',install).
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2009-11-11 10:56:37 +00:00
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:- dynamic tmp/1.
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%%
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%%
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sat_init :-
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minisat_new_solver, % - create the new solve
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minisat_add_clause([-1]), % - add zero
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minisat_add_clause([2]). % - add one
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%%
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%%
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sat_deinit :-
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minisat_delete_solver.
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%%
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%%
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sat_add_clauses(Cs, Vs, MiniSat_Vs) :-
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term_variables(Cs,CsVars),
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\+ \+ (
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bind2index(CsVars),
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add_cnf_clauses(Cs),
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asserta(tmp(Vs))
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),
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retract(tmp(MiniSat_Vs)).
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add_cnf_clauses([]).
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add_cnf_clauses([Cl|Cls]) :-
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to_minisat(Cl,MiniSatCl),
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minisat_add_clause(MiniSatCl),
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add_cnf_clauses(Cls).
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to_minisat([],[]).
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to_minisat([L|Ls],[N|Ns]) :-
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minisat_aux(L,N),
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to_minisat(Ls,Ns).
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minisat_aux(0,1) :- !.
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minisat_aux(1,2) :- !.
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minisat_aux(-(1),1) :- !.
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minisat_aux(-(0),2) :- !.
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minisat_aux(N,NN) :- NN is N.
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bind2index(Vs) :-
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minisat_nvars(N),
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N1 is N+1,
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bind2index_aux(Vs,N1).
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bind2index_aux([],_N).
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bind2index_aux([V|Ns],N) :-
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var(V),
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!,
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V=N,
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N1 is N+1, bind2index_aux(Ns,N1).
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bind2index_aux([V|Ns],N) :-
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integer(V),
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bind2index_aux(Ns,N).
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%%
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%%
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sat_solve(As) :-
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to_minisat(As,MINISAT_As),
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minisat_solve(MINISAT_As).
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%%
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%%
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sat_get_values([],[]).
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sat_get_values([SAT_V|SVs],[PL_V|PL_Vs]) :-
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minisat_get_var_assignment(SAT_V,N),
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( N<0 -> PL_V=0 ; PL_V=1),
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sat_get_values(SVs,PL_Vs).
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%%
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%% sat(+CNF): succeds if CNF is satisfaiable, it does not bind the variables in CNF
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%%
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sat(CNF) :-
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sat_init,
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sat_add_clauses(CNF,_,_),
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sat_solve([]),
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sat_deinit,
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!.
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sat(_CNF) :-
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sat_deinit,
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!,
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fail.
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%%
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%% solve(+CNF): like CNF/1 but bind the variables of CNF to the solution
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%%
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solve(CNF) :-
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sat_init,
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term_variables(CNF,CNF_Vs),
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sat_add_clauses(CNF,CNF_Vs,SAT_Vs),
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sat_solve([]),
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sat_get_values(SAT_Vs,CNF_Vs),
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sat_deinit,
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!.
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solve(_) :-
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sat_deinit,
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!,
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fail.
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%%
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%%
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%%
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minimize(Vec,CNF) :- minimize_v1(Vec,CNF).
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maximize(Vec,CNF) :- maximize_v1(Vec,CNF).
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%%
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%%
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minimize_v1(Vec,CNF) :-
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minimize_v1_aux(Vec,CNF),
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sat(CNF).
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minimize_v1_aux([],_CNF).
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minimize_v1_aux([B|Bs],CNF) :-
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minimize_v1_aux(Bs,CNF),
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( (B=0, sat(CNF)) -> true ; B=1 ).
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%%
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%%
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maximize_v1(Vec,CNF) :-
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maximize_v1_aux(Vec,CNF),
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sat(CNF).
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maximize_v1_aux([],_CNF).
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maximize_v1_aux([B|Bs],CNF) :-
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maximize_v1_aux(Bs,CNF),
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( (B=1, sat(CNF)) -> true ; B=0 ).
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%%
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%%
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minimize_v2(Vec,CNF) :-
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retractall(tmp(_)),
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reverse(Vec,Vec_MSB),
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term_variables(CNF,CNF_Vars),
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sat_init,
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sat_add_clauses(CNF,[Vec_MSB,CNF_Vars],[Vec_MSB_SVars,CNF_SVars]),
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minimize_v2_loop(Vec_MSB_SVars),
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sat_get_values(CNF_SVars,CNF_Vars),
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sat_deinit,
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!.
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minimize_v2_loop([]) :-
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sat_solve([]).
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minimize_v2_loop([V|Vs]) :-
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( sat_solve([-V]) ->
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eliminate_prefix(Vs,0,New_Vs)
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;
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sat_add_clauses([[V]],_,_),
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New_Vs=Vs
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),
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minimize_v2_loop(New_Vs).
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%%
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%%
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maximize_v2(Vec,CNF) :-
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reverse(Vec,Vec_MSB),
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term_variables(CNF,CNF_Vars),
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sat_init,
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sat_add_clauses(CNF,[Vec_MSB,CNF_Vars],[Vec_MSB_SVars,CNF_SVars]),
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maximize_v2_loop(Vec_MSB_SVars),
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sat_get_values(CNF_SVars,CNF_Vars),
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sat_deinit,
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!.
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maximize_v2_loop([]) :-
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sat_solve([]).
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maximize_v2_loop([V|Vs]) :-
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( sat_solve([V]) ->
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eliminate_prefix(Vs,1,New_Vs)
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;
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sat_add_clauses([[V]],_,_),
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New_Vs=Vs
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),
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maximize_v2_loop(New_Vs).
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%%
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%%
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minimize_v3(Vec,CNF) :-
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retractall(tmp(_)),
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term_variables(CNF,CNF_Vars),
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sat_init,
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sat_add_clauses(CNF,[Vec,CNF_Vars],[Vec_SVars,CNF_SVars]),
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sat_solve([]),
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sat_get_values(Vec_SVars,Curr_Min),
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sat_get_values(CNF_SVars,Curr_Sol),
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minimize_v3_loop(Vec_SVars,CNF_SVars,Curr_Min,Curr_Sol,Vec,CNF_Vars),
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minisat_delete_solver,
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!.
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minimize_v3_loop(Vec,CNF_SVars,Last_Min,_Last_Sol,Final_Min,Final_Sol) :-
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xs_gt_ys(Last_Min,Vec,CNF-[]),
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sat_add_clauses(CNF,_,_),
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sat_solve([]),
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sat_get_values(Vec,Curr_Min),
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sat_get_values(CNF_SVars,Curr_Sol),
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!,
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minimize_v3_loop(Vec,CNF_SVars,Curr_Min,Curr_Sol,Final_Min,Final_Sol).
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minimize_v3_loop(_Vec,_CNF_SVars,Final_Min,Final_Sol,Final_Min,Final_Sol) :-
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!.
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%%
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%%
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maximize_v3(Vec,CNF) :-
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retractall(tmp(_)),
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term_variables(CNF,CNF_Vars),
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sat_init,
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sat_add_clauses(CNF,[Vec,CNF_Vars],[Vec_SVars,CNF_SVars]),
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sat_solve([]),
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sat_get_values(Vec_SVars,Curr_Max),
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sat_get_values(CNF_SVars,Curr_Sol),
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maximize_v3_loop(Vec_SVars,CNF_SVars,Curr_Max,Curr_Sol,Vec,CNF_Vars),
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minisat_delete_solver,
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!.
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maximize_v3_loop(Vec,CNF_SVars,Last_Max,_Last_Sol,Final_Max,Final_Sol) :-
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xs_gt_ys(Vec,Last_Max,CNF-[]),
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sat_add_clauses(CNF,_,_),
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sat_solve([]),
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sat_get_values(Vec,Curr_Max),
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sat_get_values(CNF_SVars,Curr_Sol),
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!,
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maximize_v3_loop(Vec,CNF_SVars,Curr_Max,Curr_Sol,Final_Max,Final_Sol).
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maximize_v3_loop(_Vec,_CNF_SVars,Final_Max,Final_Sol,Final_Max,Final_Sol) :-
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!.
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%%
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%%
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eliminate_prefix([],_Bit,[]) :- !.
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eliminate_prefix([V|Vs],Bit,New_Vs) :-
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sat_get_values([V],[VVal]),
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VVal = Bit,
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( Bit = 0 -> sat_add_clauses([[-V]],_,_) ; sat_add_clauses([[V]],_,_) ),
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!,
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eliminate_prefix(Vs,Bit,New_Vs).
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eliminate_prefix(Vs,Vs).
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%%
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%%
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% B == (Xs = Ys)
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xs_eq_ys([X],[Y],B,Cnf1-Cnf2) :-
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!,
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eq(X,Y,B,Cnf1-Cnf2).
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xs_eq_ys([X|Xs],[Y|Ys],B,Cnf1-Cnf4) :-
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eq(X,Y,B1,Cnf1-Cnf2),
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xs_eq_ys(Xs,Ys,B2,Cnf2-Cnf3),
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and(B1,B2,B,Cnf3-Cnf4).
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%%
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xs_gt_ys(Xs,Ys,[[B]|Cnf1]-Cnf2) :-
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xs_gt_ys(Xs,Ys,B,Cnf1-Cnf2).
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%%
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%%
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xs_gt_ys([X],[Y],B,Cnf1-Cnf2) :- !,
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gt(X,Y,B,Cnf1-Cnf2).
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xs_gt_ys(Xs,Ys,B, Cnf1-Cnf6) :-
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split(Xs,LoXs,HiXs),
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split(Ys,LoYs,HiYs),
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xs_gt_ys(HiXs,HiYs,B1,Cnf1-Cnf2),
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xs_eq_ys(HiXs,HiYs,B2,Cnf2-Cnf3),
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xs_gt_ys(LoXs,LoYs,B3,Cnf3-Cnf4),
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and(B2,B3,Tmp, Cnf4-Cnf5),
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or(B1,Tmp,B,Cnf5-Cnf6).
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% Z == X > Y (equivalently Z == X * -Y)
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gt(X,Y,Z,[[Z,-X,Y],[-Z,X],[-Z,-Y]|Cnf]-Cnf).
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% Z == (X == Y)
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eq(X,Y,Z, [[-Z,-X,Y],[-Z,X,-Y],
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[Z,X,Y],[Z,-X,-Y] | Cnf]-Cnf).
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% Z == X or Y
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or(X,Y,Z, [[Z,-X],[Z,-Y],[-Z,X,Y] | Cnf]-Cnf).
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% Z == X and Y
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and(X,Y,Z, [[Z,X,Y],[-Z,X],[-Z,Y] | Cnf]-Cnf).
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%
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split(Xs,As,Bs) :-
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length(Xs,N), M is N // 2,
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length(As,M), append(As,Bs,Xs).
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