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boolean_problem.proto
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boolean_problem.proto
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// Copyright 2010-2018 Google LLC
// Licensed under the Apache License, Version 2.0 (the "License");
// you may not use this file except in compliance with the License.
// You may obtain a copy of the License at
//
// http://www.apache.org/licenses/LICENSE-2.0
//
// Unless required by applicable law or agreed to in writing, software
// distributed under the License is distributed on an "AS IS" BASIS,
// WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
// See the License for the specific language governing permissions and
// limitations under the License.
// Protocol buffer to encode a Boolean satisfiability/optimization problem.
syntax = "proto2";
package operations_research.sat;
option csharp_namespace = "Google.OrTools.Sat";
option java_package = "com.google.ortools.sat";
option java_multiple_files = true;
// A linear Boolean constraint which is a bounded sum of linear terms. Each term
// beeing a literal times an integer coefficient. If we assume that a literal
// takes the value 1 if it is true and 0 otherwise, the constraint is:
// lower_bound <= ... + coefficients[i] * literals[i] + ... <= upper_bound
message LinearBooleanConstraint {
// Linear terms involved in this constraint.
//
// literals[i] is the signed representation of the i-th literal of the
// constraint and coefficients[i] its coefficients. The signed representation
// is as follow: for a 0-based variable index x, (x + 1) represents the
// variable x and -(x + 1) represents its negation.
//
// Note that the same variable shouldn't appear twice and that zero
// coefficients are not allowed.
repeated int32 literals = 1;
repeated int64 coefficients = 2;
// Optional lower (resp. upper) bound of the constraint. If not present, it
// means that the constraint is not bounded in this direction. The bounds
// are INCLUSIVE.
optional int64 lower_bound = 3;
optional int64 upper_bound = 4;
// The name of this constraint.
optional string name = 5 [default = ""];
}
// The objective of an optimization problem.
message LinearObjective {
// The goal is always to minimize the linear Boolean formula defined by these
// two fields: sum_i literal_i * coefficient_i where literal_i is 1 iff
// literal_i is true in a given assignment.
//
// Note that the same variable shouldn't appear twice and that zero
// coefficients are not allowed.
repeated int32 literals = 1;
repeated int64 coefficients = 2;
// For a given variable assignment, the "real" problem objective value is
// 'scaling_factor * (minimization_objective + offset)' where
// 'minimization_objective is the one defined just above.
//
// Note that this is not what we minimize, but it is what we display.
// In particular if scaling_factor is negative, then the "real" problem is
// a maximization problem, even if the "internal" objective is minimized.
optional double offset = 3 [default = 0.0];
optional double scaling_factor = 4 [default = 1.0];
}
// Stores an assignment of variables as a list of true literals using their
// signed representation. There will be at most one literal per variable. The
// literals will be sorted by increasing variable index. The assignment may be
// partial in the sense that some variables may not appear and thus not be
// assigned.
message BooleanAssignment {
repeated int32 literals = 1;
}
// A linear Boolean problem.
message LinearBooleanProblem {
// The name of the problem.
optional string name = 1 [default = ""];
// The number of variables in the problem.
// All the signed representation of the problem literals must be in
// [-num_variables, num_variables], excluding 0.
optional int32 num_variables = 3;
// The constraints of the problem.
repeated LinearBooleanConstraint constraints = 4;
// The objective of the problem.
// If left empty, we just have a satisfiability problem.
optional LinearObjective objective = 5;
// The names of the problem variables. The variables index are 0-based and
// var_names[i] will be the name of the i-th variable which correspond to
// literals +(i + 1) or -(i + 1). This is optional and can be left empty.
repeated string var_names = 6;
// Stores an assignement of the problem variables. That may be an initial
// feasible solution, just a partial assignement or the optimal solution.
optional BooleanAssignment assignment = 7;
// Hack: When converting a wcnf formulat to a LinearBooleanProblem, extra
// variables need to be created. This stores the number of variables in the
// original problem (which are in one to one correspondence with the first
// variables of this problem).
optional int32 original_num_variables = 8;
}