Bagian berikut menampilkan contoh masalah MIP dan cara menyelesaikannya. Inilah masalahnya:
Maksimalkan x + 10y sesuai dengan batasan berikut:
x + 7y≤ 17,5- 0 ≤
x≤ 3,5 - 0 ≤
y x, bilangan bulaty
Karena batasannya linear, ini hanyalah masalah pengoptimalan linear yang solusinya harus berupa bilangan bulat. Grafik di bawah menunjukkan titik bilangan bulat di wilayah yang memungkinkan untuk masalah tersebut.
Perhatikan bahwa masalah ini sangat mirip dengan masalah pengoptimalan linear yang dijelaskan dalam Menyelesaikan Masalah LP, tetapi dalam hal ini, kami memerlukan solusinya berupa bilangan bulat.
Langkah-langkah dasar untuk memecahkan masalah MIP
Untuk mengatasi masalah MIP, program Anda harus menyertakan langkah-langkah berikut:
- Impor wrapper pemecah linear,
- mendeklarasikan pemecah MIP,
- mendefinisikan variabel,
- menentukan batasan-batasan,
- menentukan tujuan,
- memanggil pemecah masalah MIP dan
- tampilkan solusi
Solusi menggunakan MPResolver
Bagian berikut menampilkan program yang menyelesaikan masalah menggunakan wrapper MPSolver dan pemecah masalah MIP.
Pemecah masalah MIP OR-Tools default adalah SCIP.
Mengimpor wrapper pemecah masalah linear
Impor (atau sertakan) wrapper pemecah masalah linear OR-Tools, antarmuka untuk pemecah MIP dan pemecah linear, seperti yang ditunjukkan di bawah.
Python
from ortools.linear_solver import pywraplp
C++
#include <memory> #include "ortools/linear_solver/linear_solver.h"
Java
import com.google.ortools.Loader; import com.google.ortools.linearsolver.MPConstraint; import com.google.ortools.linearsolver.MPObjective; import com.google.ortools.linearsolver.MPSolver; import com.google.ortools.linearsolver.MPVariable;
C#
using System; using Google.OrTools.LinearSolver;
Mendeklarasikan pemecah MIP
Kode berikut mendeklarasikan pemecah MIP untuk masalah. Contoh ini menggunakan pemecah masalah pihak ketiga SCIP.
Python
# Create the mip solver with the SCIP backend.
solver = pywraplp.Solver.CreateSolver("SAT")
if not solver:
return
C++
// Create the mip solver with the SCIP backend.
std::unique_ptr<MPSolver> solver(MPSolver::CreateSolver("SCIP"));
if (!solver) {
LOG(WARNING) << "SCIP solver unavailable.";
return;
}
Java
// Create the linear solver with the SCIP backend.
MPSolver solver = MPSolver.createSolver("SCIP");
if (solver == null) {
System.out.println("Could not create solver SCIP");
return;
}
C#
// Create the linear solver with the SCIP backend.
Solver solver = Solver.CreateSolver("SCIP");
if (solver is null)
{
return;
}
Menentukan variabel
Kode berikut mendefinisikan variabel dalam soal.
Python
infinity = solver.infinity()
# x and y are integer non-negative variables.
x = solver.IntVar(0.0, infinity, "x")
y = solver.IntVar(0.0, infinity, "y")
print("Number of variables =", solver.NumVariables())
C++
const double infinity = solver->infinity(); // x and y are integer non-negative variables. MPVariable* const x = solver->MakeIntVar(0.0, infinity, "x"); MPVariable* const y = solver->MakeIntVar(0.0, infinity, "y"); LOG(INFO) << "Number of variables = " << solver->NumVariables();
Java
double infinity = java.lang.Double.POSITIVE_INFINITY;
// x and y are integer non-negative variables.
MPVariable x = solver.makeIntVar(0.0, infinity, "x");
MPVariable y = solver.makeIntVar(0.0, infinity, "y");
System.out.println("Number of variables = " + solver.numVariables());
C#
// x and y are integer non-negative variables.
Variable x = solver.MakeIntVar(0.0, double.PositiveInfinity, "x");
Variable y = solver.MakeIntVar(0.0, double.PositiveInfinity, "y");
Console.WriteLine("Number of variables = " + solver.NumVariables());
Program ini menggunakan metode MakeIntVar (atau varian, bergantung pada bahasa
coding) untuk membuat variabel x dan y yang menggunakan nilai bilangan bulat
non-negatif.
Menentukan batasan
Kode berikut mendefinisikan batasan untuk masalah.
Python
# x + 7 * y <= 17.5.
solver.Add(x + 7 * y <= 17.5)
# x <= 3.5.
solver.Add(x <= 3.5)
print("Number of constraints =", solver.NumConstraints())
C++
// x + 7 * y <= 17.5. MPConstraint* const c0 = solver->MakeRowConstraint(-infinity, 17.5, "c0"); c0->SetCoefficient(x, 1); c0->SetCoefficient(y, 7); // x <= 3.5. MPConstraint* const c1 = solver->MakeRowConstraint(-infinity, 3.5, "c1"); c1->SetCoefficient(x, 1); c1->SetCoefficient(y, 0); LOG(INFO) << "Number of constraints = " << solver->NumConstraints();
Java
// x + 7 * y <= 17.5.
MPConstraint c0 = solver.makeConstraint(-infinity, 17.5, "c0");
c0.setCoefficient(x, 1);
c0.setCoefficient(y, 7);
// x <= 3.5.
MPConstraint c1 = solver.makeConstraint(-infinity, 3.5, "c1");
c1.setCoefficient(x, 1);
c1.setCoefficient(y, 0);
System.out.println("Number of constraints = " + solver.numConstraints());
C#
// x + 7 * y <= 17.5.
solver.Add(x + 7 * y <= 17.5);
// x <= 3.5.
solver.Add(x <= 3.5);
Console.WriteLine("Number of constraints = " + solver.NumConstraints());
Menentukan tujuannya
Kode berikut menentukan objective function untuk masalah tersebut.
Python
# Maximize x + 10 * y. solver.Maximize(x + 10 * y)
C++
// Maximize x + 10 * y. MPObjective* const objective = solver->MutableObjective(); objective->SetCoefficient(x, 1); objective->SetCoefficient(y, 10); objective->SetMaximization();
Java
// Maximize x + 10 * y. MPObjective objective = solver.objective(); objective.setCoefficient(x, 1); objective.setCoefficient(y, 10); objective.setMaximization();
C#
// Maximize x + 10 * y. solver.Maximize(x + 10 * y);
Panggil pemecah masalah
Kode berikut memanggil pemecah.
Python
print(f"Solving with {solver.SolverVersion()}")
status = solver.Solve()
C++
const MPSolver::ResultStatus result_status = solver->Solve();
// Check that the problem has an optimal solution.
if (result_status != MPSolver::OPTIMAL) {
LOG(FATAL) << "The problem does not have an optimal solution!";
}
Java
final MPSolver.ResultStatus resultStatus = solver.solve();
C#
Solver.ResultStatus resultStatus = solver.Solve();
Menampilkan solusi
Kode berikut menampilkan solusi.
Python
if status == pywraplp.Solver.OPTIMAL:
print("Solution:")
print("Objective value =", solver.Objective().Value())
print("x =", x.solution_value())
print("y =", y.solution_value())
else:
print("The problem does not have an optimal solution.")
C++
LOG(INFO) << "Solution:"; LOG(INFO) << "Objective value = " << objective->Value(); LOG(INFO) << "x = " << x->solution_value(); LOG(INFO) << "y = " << y->solution_value();
Java
if (resultStatus == MPSolver.ResultStatus.OPTIMAL) {
System.out.println("Solution:");
System.out.println("Objective value = " + objective.value());
System.out.println("x = " + x.solutionValue());
System.out.println("y = " + y.solutionValue());
} else {
System.err.println("The problem does not have an optimal solution!");
}
C#
// Check that the problem has an optimal solution.
if (resultStatus != Solver.ResultStatus.OPTIMAL)
{
Console.WriteLine("The problem does not have an optimal solution!");
return;
}
Console.WriteLine("Solution:");
Console.WriteLine("Objective value = " + solver.Objective().Value());
Console.WriteLine("x = " + x.SolutionValue());
Console.WriteLine("y = " + y.SolutionValue());
Berikut solusi untuk masalah tersebut.
Number of variables = 2 Number of constraints = 2 Solution: Objective value = 23 x = 3 y = 2
Nilai optimal fungsi objektif adalah 23, yang terjadi di titik x = 3, y = 2.
Selesaikan program
Berikut program lengkapnya.
Python
from ortools.linear_solver import pywraplp
def main():
# Create the mip solver with the SCIP backend.
solver = pywraplp.Solver.CreateSolver("SAT")
if not solver:
return
infinity = solver.infinity()
# x and y are integer non-negative variables.
x = solver.IntVar(0.0, infinity, "x")
y = solver.IntVar(0.0, infinity, "y")
print("Number of variables =", solver.NumVariables())
# x + 7 * y <= 17.5.
solver.Add(x + 7 * y <= 17.5)
# x <= 3.5.
solver.Add(x <= 3.5)
print("Number of constraints =", solver.NumConstraints())
# Maximize x + 10 * y.
solver.Maximize(x + 10 * y)
print(f"Solving with {solver.SolverVersion()}")
status = solver.Solve()
if status == pywraplp.Solver.OPTIMAL:
print("Solution:")
print("Objective value =", solver.Objective().Value())
print("x =", x.solution_value())
print("y =", y.solution_value())
else:
print("The problem does not have an optimal solution.")
print("\nAdvanced usage:")
print(f"Problem solved in {solver.wall_time():d} milliseconds")
print(f"Problem solved in {solver.iterations():d} iterations")
print(f"Problem solved in {solver.nodes():d} branch-and-bound nodes")
if __name__ == "__main__":
main()
C++
#include <memory>
#include "ortools/linear_solver/linear_solver.h"
namespace operations_research {
void SimpleMipProgram() {
// Create the mip solver with the SCIP backend.
std::unique_ptr<MPSolver> solver(MPSolver::CreateSolver("SCIP"));
if (!solver) {
LOG(WARNING) << "SCIP solver unavailable.";
return;
}
const double infinity = solver->infinity();
// x and y are integer non-negative variables.
MPVariable* const x = solver->MakeIntVar(0.0, infinity, "x");
MPVariable* const y = solver->MakeIntVar(0.0, infinity, "y");
LOG(INFO) << "Number of variables = " << solver->NumVariables();
// x + 7 * y <= 17.5.
MPConstraint* const c0 = solver->MakeRowConstraint(-infinity, 17.5, "c0");
c0->SetCoefficient(x, 1);
c0->SetCoefficient(y, 7);
// x <= 3.5.
MPConstraint* const c1 = solver->MakeRowConstraint(-infinity, 3.5, "c1");
c1->SetCoefficient(x, 1);
c1->SetCoefficient(y, 0);
LOG(INFO) << "Number of constraints = " << solver->NumConstraints();
// Maximize x + 10 * y.
MPObjective* const objective = solver->MutableObjective();
objective->SetCoefficient(x, 1);
objective->SetCoefficient(y, 10);
objective->SetMaximization();
const MPSolver::ResultStatus result_status = solver->Solve();
// Check that the problem has an optimal solution.
if (result_status != MPSolver::OPTIMAL) {
LOG(FATAL) << "The problem does not have an optimal solution!";
}
LOG(INFO) << "Solution:";
LOG(INFO) << "Objective value = " << objective->Value();
LOG(INFO) << "x = " << x->solution_value();
LOG(INFO) << "y = " << y->solution_value();
LOG(INFO) << "\nAdvanced usage:";
LOG(INFO) << "Problem solved in " << solver->wall_time() << " milliseconds";
LOG(INFO) << "Problem solved in " << solver->iterations() << " iterations";
LOG(INFO) << "Problem solved in " << solver->nodes()
<< " branch-and-bound nodes";
}
} // namespace operations_research
int main(int argc, char** argv) {
operations_research::SimpleMipProgram();
return EXIT_SUCCESS;
}
Java
package com.google.ortools.linearsolver.samples;
import com.google.ortools.Loader;
import com.google.ortools.linearsolver.MPConstraint;
import com.google.ortools.linearsolver.MPObjective;
import com.google.ortools.linearsolver.MPSolver;
import com.google.ortools.linearsolver.MPVariable;
/** Minimal Mixed Integer Programming example to showcase calling the solver. */
public final class SimpleMipProgram {
public static void main(String[] args) {
Loader.loadNativeLibraries();
// Create the linear solver with the SCIP backend.
MPSolver solver = MPSolver.createSolver("SCIP");
if (solver == null) {
System.out.println("Could not create solver SCIP");
return;
}
double infinity = java.lang.Double.POSITIVE_INFINITY;
// x and y are integer non-negative variables.
MPVariable x = solver.makeIntVar(0.0, infinity, "x");
MPVariable y = solver.makeIntVar(0.0, infinity, "y");
System.out.println("Number of variables = " + solver.numVariables());
// x + 7 * y <= 17.5.
MPConstraint c0 = solver.makeConstraint(-infinity, 17.5, "c0");
c0.setCoefficient(x, 1);
c0.setCoefficient(y, 7);
// x <= 3.5.
MPConstraint c1 = solver.makeConstraint(-infinity, 3.5, "c1");
c1.setCoefficient(x, 1);
c1.setCoefficient(y, 0);
System.out.println("Number of constraints = " + solver.numConstraints());
// Maximize x + 10 * y.
MPObjective objective = solver.objective();
objective.setCoefficient(x, 1);
objective.setCoefficient(y, 10);
objective.setMaximization();
final MPSolver.ResultStatus resultStatus = solver.solve();
if (resultStatus == MPSolver.ResultStatus.OPTIMAL) {
System.out.println("Solution:");
System.out.println("Objective value = " + objective.value());
System.out.println("x = " + x.solutionValue());
System.out.println("y = " + y.solutionValue());
} else {
System.err.println("The problem does not have an optimal solution!");
}
System.out.println("\nAdvanced usage:");
System.out.println("Problem solved in " + solver.wallTime() + " milliseconds");
System.out.println("Problem solved in " + solver.iterations() + " iterations");
System.out.println("Problem solved in " + solver.nodes() + " branch-and-bound nodes");
}
private SimpleMipProgram() {}
}
C#
using System;
using Google.OrTools.LinearSolver;
public class SimpleMipProgram
{
static void Main()
{
// Create the linear solver with the SCIP backend.
Solver solver = Solver.CreateSolver("SCIP");
if (solver is null)
{
return;
}
// x and y are integer non-negative variables.
Variable x = solver.MakeIntVar(0.0, double.PositiveInfinity, "x");
Variable y = solver.MakeIntVar(0.0, double.PositiveInfinity, "y");
Console.WriteLine("Number of variables = " + solver.NumVariables());
// x + 7 * y <= 17.5.
solver.Add(x + 7 * y <= 17.5);
// x <= 3.5.
solver.Add(x <= 3.5);
Console.WriteLine("Number of constraints = " + solver.NumConstraints());
// Maximize x + 10 * y.
solver.Maximize(x + 10 * y);
Solver.ResultStatus resultStatus = solver.Solve();
// Check that the problem has an optimal solution.
if (resultStatus != Solver.ResultStatus.OPTIMAL)
{
Console.WriteLine("The problem does not have an optimal solution!");
return;
}
Console.WriteLine("Solution:");
Console.WriteLine("Objective value = " + solver.Objective().Value());
Console.WriteLine("x = " + x.SolutionValue());
Console.WriteLine("y = " + y.SolutionValue());
Console.WriteLine("\nAdvanced usage:");
Console.WriteLine("Problem solved in " + solver.WallTime() + " milliseconds");
Console.WriteLine("Problem solved in " + solver.Iterations() + " iterations");
Console.WriteLine("Problem solved in " + solver.Nodes() + " branch-and-bound nodes");
}
}
Membandingkan Pengoptimalan Linear dan Bilangan Bulat
Mari kita bandingkan solusi untuk masalah pengoptimalan bilangan bulat, yang ditunjukkan di atas,
dengan solusi untuk masalah pengoptimalan linear terkait, ketika
batasan bilangan bulat dihapus. Anda mungkin menebak bahwa solusi untuk
masalah bilangan bulat adalah titik bilangan bulat di region valid yang paling dekat dengan
solusi linear — yaitu, titik x = 0, y = 2. Tapi seperti yang akan Anda lihat
berikutnya, hal ini tidak berlaku.
Anda dapat dengan mudah memodifikasi program di bagian sebelumnya untuk mengatasi masalah linier dengan melakukan perubahan berikut:
- Mengganti pemecah masalah MIP
dengan pemecah LP
Python
# Create the mip solver with the SCIP backend. solver = pywraplp.Solver.CreateSolver("SAT") if not solver: returnC++
// Create the mip solver with the SCIP backend. std::unique_ptr<MPSolver> solver(MPSolver::CreateSolver("SCIP")); if (!solver) { LOG(WARNING) << "SCIP solver unavailable."; return; }Java
// Create the linear solver with the SCIP backend. MPSolver solver = MPSolver.createSolver("SCIP"); if (solver == null) { System.out.println("Could not create solver SCIP"); return; }C#
// Create the linear solver with the SCIP backend. Solver solver = Solver.CreateSolver("SCIP"); if (solver is null) { return; }Python
# Create the linear solver with the GLOP backend. solver = pywraplp.Solver.CreateSolver("GLOP") if not solver: returnC++
// Create the linear solver with the GLOP backend. std::unique_ptr<MPSolver> solver(MPSolver::CreateSolver("GLOP"));Java
// Create the linear solver with the GLOP backend. MPSolver solver = MPSolver.createSolver("GLOP"); if (solver == null) { System.out.println("Could not create solver SCIP"); return; }C#
// Create the linear solver with the GLOP backend. Solver solver = Solver.CreateSolver("GLOP"); if (solver is null) { return; } - Mengganti variabel bilangan bulat
dengan variabel kontinu
Python
infinity = solver.infinity() # x and y are integer non-negative variables. x = solver.IntVar(0.0, infinity, "x") y = solver.IntVar(0.0, infinity, "y") print("Number of variables =", solver.NumVariables())C++
const double infinity = solver->infinity(); // x and y are integer non-negative variables. MPVariable* const x = solver->MakeIntVar(0.0, infinity, "x"); MPVariable* const y = solver->MakeIntVar(0.0, infinity, "y"); LOG(INFO) << "Number of variables = " << solver->NumVariables();
Java
double infinity = java.lang.Double.POSITIVE_INFINITY; // x and y are integer non-negative variables. MPVariable x = solver.makeIntVar(0.0, infinity, "x"); MPVariable y = solver.makeIntVar(0.0, infinity, "y"); System.out.println("Number of variables = " + solver.numVariables());C#
// x and y are integer non-negative variables. Variable x = solver.MakeIntVar(0.0, double.PositiveInfinity, "x"); Variable y = solver.MakeIntVar(0.0, double.PositiveInfinity, "y"); Console.WriteLine("Number of variables = " + solver.NumVariables());Python
infinity = solver.infinity() # Create the variables x and y. x = solver.NumVar(0.0, infinity, "x") y = solver.NumVar(0.0, infinity, "y") print("Number of variables =", solver.NumVariables())C++
const double infinity = solver->infinity(); // Create the variables x and y. MPVariable* const x = solver->MakeNumVar(0.0, infinity, "x"); MPVariable* const y = solver->MakeNumVar(0.0, infinity, "y"); LOG(INFO) << "Number of variables = " << solver->NumVariables();
Java
double infinity = java.lang.Double.POSITIVE_INFINITY; // Create the variables x and y. MPVariable x = solver.makeNumVar(0.0, infinity, "x"); MPVariable y = solver.makeNumVar(0.0, infinity, "y"); System.out.println("Number of variables = " + solver.numVariables());C#
// Create the variables x and y. Variable x = solver.MakeNumVar(0.0, double.PositiveInfinity, "x"); Variable y = solver.MakeNumVar(0.0, double.PositiveInfinity, "y"); Console.WriteLine("Number of variables = " + solver.NumVariables());
Setelah melakukan perubahan ini dan menjalankan program lagi, Anda mendapatkan output berikut:
Number of variables = 2 Number of constraints = 2 Objective value = 25.000000 x = 0.000000 y = 2.500000
Solusi untuk masalah linear terjadi pada titik x = 0, y = 2.5, dengan fungsi objektif sama dengan 25. Berikut adalah grafik yang menampilkan solusi untuk
masalah linear dan bilangan bulat.
Perhatikan bahwa solusi bilangan bulat tidak dekat dengan solusi linear, dibandingkan dengan sebagian besar titik bilangan bulat lainnya di region yang memungkinkan. Secara umum, solusi untuk masalah pengoptimalan linear dan masalah pengoptimalan bilangan bulat yang sesuai bisa berjauhan. Karena itu, kedua jenis masalah tersebut memerlukan metode yang berbeda untuk solusinya.