Bagian ini menjelaskan masalah penugasan di mana setiap tugas memiliki ukuran, yang mewakili berapa banyak waktu atau upaya yang diperlukan tugas tersebut. Ukuran total tugas yang dilakukan oleh setiap pekerja memiliki batas tetap.
Kami akan menyajikan program Python yang memecahkan masalah ini menggunakan pemecah masalah CP-SAT dan pemecah masalah MIP.
Solusi CP-SAT
Pertama, mari kita lihat solusi CP-SAT untuk masalah ini.
Mengimpor library
Kode berikut mengimpor library yang diperlukan.
Python
from ortools.sat.python import cp_model
C++
#include <stdlib.h> #include <cstdint> #include <numeric> #include <vector> #include "absl/strings/str_format.h" #include "ortools/base/logging.h" #include "ortools/sat/cp_model.h" #include "ortools/sat/cp_model.pb.h" #include "ortools/sat/cp_model_solver.h"
Java
import com.google.ortools.Loader; import com.google.ortools.sat.CpModel; import com.google.ortools.sat.CpSolver; import com.google.ortools.sat.CpSolverStatus; import com.google.ortools.sat.LinearExpr; import com.google.ortools.sat.LinearExprBuilder; import com.google.ortools.sat.Literal; import java.util.ArrayList; import java.util.List; import java.util.stream.IntStream;
C#
using System; using System.Collections.Generic; using System.Linq; using Google.OrTools.Sat;
Menentukan data
Kode berikut akan membuat data untuk program.
Python
costs = [
[90, 76, 75, 70, 50, 74, 12, 68],
[35, 85, 55, 65, 48, 101, 70, 83],
[125, 95, 90, 105, 59, 120, 36, 73],
[45, 110, 95, 115, 104, 83, 37, 71],
[60, 105, 80, 75, 59, 62, 93, 88],
[45, 65, 110, 95, 47, 31, 81, 34],
[38, 51, 107, 41, 69, 99, 115, 48],
[47, 85, 57, 71, 92, 77, 109, 36],
[39, 63, 97, 49, 118, 56, 92, 61],
[47, 101, 71, 60, 88, 109, 52, 90],
]
num_workers = len(costs)
num_tasks = len(costs[0])
task_sizes = [10, 7, 3, 12, 15, 4, 11, 5]
# Maximum total of task sizes for any worker
total_size_max = 15
C++
const std::vector<std::vector<int>> costs = {{
{{90, 76, 75, 70, 50, 74, 12, 68}},
{{35, 85, 55, 65, 48, 101, 70, 83}},
{{125, 95, 90, 105, 59, 120, 36, 73}},
{{45, 110, 95, 115, 104, 83, 37, 71}},
{{60, 105, 80, 75, 59, 62, 93, 88}},
{{45, 65, 110, 95, 47, 31, 81, 34}},
{{38, 51, 107, 41, 69, 99, 115, 48}},
{{47, 85, 57, 71, 92, 77, 109, 36}},
{{39, 63, 97, 49, 118, 56, 92, 61}},
{{47, 101, 71, 60, 88, 109, 52, 90}},
}};
const int num_workers = static_cast<int>(costs.size());
std::vector<int> all_workers(num_workers);
std::iota(all_workers.begin(), all_workers.end(), 0);
const int num_tasks = static_cast<int>(costs[0].size());
std::vector<int> all_tasks(num_tasks);
std::iota(all_tasks.begin(), all_tasks.end(), 0);
const std::vector<int64_t> task_sizes = {{10, 7, 3, 12, 15, 4, 11, 5}};
// Maximum total of task sizes for any worker
const int total_size_max = 15;
Java
int[][] costs = {
{90, 76, 75, 70, 50, 74, 12, 68},
{35, 85, 55, 65, 48, 101, 70, 83},
{125, 95, 90, 105, 59, 120, 36, 73},
{45, 110, 95, 115, 104, 83, 37, 71},
{60, 105, 80, 75, 59, 62, 93, 88},
{45, 65, 110, 95, 47, 31, 81, 34},
{38, 51, 107, 41, 69, 99, 115, 48},
{47, 85, 57, 71, 92, 77, 109, 36},
{39, 63, 97, 49, 118, 56, 92, 61},
{47, 101, 71, 60, 88, 109, 52, 90},
};
final int numWorkers = costs.length;
final int numTasks = costs[0].length;
final int[] allWorkers = IntStream.range(0, numWorkers).toArray();
final int[] allTasks = IntStream.range(0, numTasks).toArray();
final int[] taskSizes = {10, 7, 3, 12, 15, 4, 11, 5};
// Maximum total of task sizes for any worker
final int totalSizeMax = 15;
C#
int[,] costs = {
{ 90, 76, 75, 70, 50, 74, 12, 68 }, { 35, 85, 55, 65, 48, 101, 70, 83 },
{ 125, 95, 90, 105, 59, 120, 36, 73 }, { 45, 110, 95, 115, 104, 83, 37, 71 },
{ 60, 105, 80, 75, 59, 62, 93, 88 }, { 45, 65, 110, 95, 47, 31, 81, 34 },
{ 38, 51, 107, 41, 69, 99, 115, 48 }, { 47, 85, 57, 71, 92, 77, 109, 36 },
{ 39, 63, 97, 49, 118, 56, 92, 61 }, { 47, 101, 71, 60, 88, 109, 52, 90 },
};
int numWorkers = costs.GetLength(0);
int numTasks = costs.GetLength(1);
int[] allWorkers = Enumerable.Range(0, numWorkers).ToArray();
int[] allTasks = Enumerable.Range(0, numTasks).ToArray();
int[] taskSizes = { 10, 7, 3, 12, 15, 4, 11, 5 };
// Maximum total of task sizes for any worker
int totalSizeMax = 15;
Seperti pada contoh sebelumnya, matriks biaya memberikan biaya bagi pekerja i untuk melakukan tugas j.
Vektor sizes memberikan ukuran setiap tugas.
total_size_max adalah batas atas ukuran total tugas
yang dilakukan oleh satu pekerja.
Membuat model
Kode berikut akan membuat model.
Python
model = cp_model.CpModel()
C++
CpModelBuilder cp_model;
Java
CpModel model = new CpModel();
C#
CpModel model = new CpModel();
Membuat variabel
Kode berikut membuat array variabel untuk masalah tersebut.
Python
x = {}
for worker in range(num_workers):
for task in range(num_tasks):
x[worker, task] = model.new_bool_var(f"x[{worker},{task}]")
C++
// x[i][j] is an array of Boolean variables. x[i][j] is true
// if worker i is assigned to task j.
std::vector<std::vector<BoolVar>> x(num_workers,
std::vector<BoolVar>(num_tasks));
for (int worker : all_workers) {
for (int task : all_tasks) {
x[worker][task] = cp_model.NewBoolVar().WithName(
absl::StrFormat("x[%d,%d]", worker, task));
}
}
Java
Literal[][] x = new Literal[numWorkers][numTasks];
for (int worker : allWorkers) {
for (int task : allTasks) {
x[worker][task] = model.newBoolVar("x[" + worker + "," + task + "]");
}
}
C#
BoolVar[,] x = new BoolVar[numWorkers, numTasks];
foreach (int worker in allWorkers)
{
foreach (int task in allTasks)
{
x[worker, task] = model.NewBoolVar($"x[{worker},{task}]");
}
}
Menambahkan batasan
Kode berikut membuat batasan untuk program.
Python
# Each worker is assigned to at most one task.
for worker in range(num_workers):
model.add(
sum(task_sizes[task] * x[worker, task] for task in range(num_tasks))
<= total_size_max
)
# Each task is assigned to exactly one worker.
for task in range(num_tasks):
model.add_exactly_one(x[worker, task] for worker in range(num_workers))
C++
// Each worker is assigned to at most one task.
for (int worker : all_workers) {
LinearExpr task_sum;
for (int task : all_tasks) {
task_sum += x[worker][task] * task_sizes[task];
}
cp_model.AddLessOrEqual(task_sum, total_size_max);
}
// Each task is assigned to exactly one worker.
for (int task : all_tasks) {
std::vector<BoolVar> tasks;
for (int worker : all_workers) {
tasks.push_back(x[worker][task]);
}
cp_model.AddExactlyOne(tasks);
}
Java
// Each worker has a maximum capacity.
for (int worker : allWorkers) {
LinearExprBuilder expr = LinearExpr.newBuilder();
for (int task : allTasks) {
expr.addTerm(x[worker][task], taskSizes[task]);
}
model.addLessOrEqual(expr, totalSizeMax);
}
// Each task is assigned to exactly one worker.
for (int task : allTasks) {
List<Literal> workers = new ArrayList<>();
for (int worker : allWorkers) {
workers.add(x[worker][task]);
}
model.addExactlyOne(workers);
}
C#
// Each worker is assigned to at most max task size.
foreach (int worker in allWorkers)
{
BoolVar[] vars = new BoolVar[numTasks];
foreach (int task in allTasks)
{
vars[task] = x[worker, task];
}
model.Add(LinearExpr.WeightedSum(vars, taskSizes) <= totalSizeMax);
}
// Each task is assigned to exactly one worker.
foreach (int task in allTasks)
{
List<ILiteral> workers = new List<ILiteral>();
foreach (int worker in allWorkers)
{
workers.Add(x[worker, task]);
}
model.AddExactlyOne(workers);
}
Membuat tujuan
Kode berikut akan membuat fungsi objektif.
Python
objective_terms = []
for worker in range(num_workers):
for task in range(num_tasks):
objective_terms.append(costs[worker][task] * x[worker, task])
model.minimize(sum(objective_terms))
C++
LinearExpr total_cost;
for (int worker : all_workers) {
for (int task : all_tasks) {
total_cost += x[worker][task] * costs[worker][task];
}
}
cp_model.Minimize(total_cost);
Java
LinearExprBuilder obj = LinearExpr.newBuilder();
for (int worker : allWorkers) {
for (int task : allTasks) {
obj.addTerm(x[worker][task], costs[worker][task]);
}
}
model.minimize(obj);
C#
LinearExprBuilder obj = LinearExpr.NewBuilder();
foreach (int worker in allWorkers)
{
foreach (int task in allTasks)
{
obj.AddTerm(x[worker, task], costs[worker, task]);
}
}
model.Minimize(obj);
Memanggil pemecah masalah
Kode berikut memanggil pemecah.
Python
solver = cp_model.CpSolver() status = solver.solve(model)
C++
const CpSolverResponse response = Solve(cp_model.Build());
Java
CpSolver solver = new CpSolver(); CpSolverStatus status = solver.solve(model);
C#
CpSolver solver = new CpSolver();
CpSolverStatus status = solver.Solve(model);
Console.WriteLine($"Solve status: {status}");
Menampilkan hasil
Sekarang, kita dapat mencetak solusinya.
Python
if status == cp_model.OPTIMAL or status == cp_model.FEASIBLE:
print(f"Total cost = {solver.objective_value}\n")
for worker in range(num_workers):
for task in range(num_tasks):
if solver.boolean_value(x[worker, task]):
print(
f"Worker {worker} assigned to task {task}."
+ f" Cost = {costs[worker][task]}"
)
else:
print("No solution found.")
C++
if (response.status() == CpSolverStatus::INFEASIBLE) {
LOG(FATAL) << "No solution found.";
}
LOG(INFO) << "Total cost: " << response.objective_value();
LOG(INFO);
for (int worker : all_workers) {
for (int task : all_tasks) {
if (SolutionBooleanValue(response, x[worker][task])) {
LOG(INFO) << "Worker " << worker << " assigned to task " << task
<< ". Cost: " << costs[worker][task];
}
}
}
Java
// Check that the problem has a feasible solution.
if (status == CpSolverStatus.OPTIMAL || status == CpSolverStatus.FEASIBLE) {
System.out.println("Total cost: " + solver.objectiveValue() + "\n");
for (int worker : allWorkers) {
for (int task : allTasks) {
if (solver.booleanValue(x[worker][task])) {
System.out.println("Worker " + worker + " assigned to task " + task
+ ". Cost: " + costs[worker][task]);
}
}
}
} else {
System.err.println("No solution found.");
}
C#
// Check that the problem has a feasible solution.
if (status == CpSolverStatus.Optimal || status == CpSolverStatus.Feasible)
{
Console.WriteLine($"Total cost: {solver.ObjectiveValue}\n");
foreach (int worker in allWorkers)
{
foreach (int task in allTasks)
{
if (solver.Value(x[worker, task]) > 0.5)
{
Console.WriteLine($"Worker {worker} assigned to task {task}. " +
$"Cost: {costs[worker, task]}");
}
}
}
}
else
{
Console.WriteLine("No solution found.");
}
Berikut adalah output program ini.
Minimum cost: 326 Worker 0 assigned to task 6 Cost = 12 Worker 1 assigned to task 0 Cost = 35 Worker 1 assigned to task 2 Cost = 55 Worker 2 assigned to task 4 Cost = 59 Worker 5 assigned to task 5 Cost = 31 Worker 5 assigned to task 7 Cost = 34 Worker 6 assigned to task 1 Cost = 51 Worker 8 assigned to task 3 Cost = 49 Time = 2.2198 seconds
Seluruh program
Ini adalah keseluruhan program.
Python
"""Solves a simple assignment problem."""
from ortools.sat.python import cp_model
def main() -> None:
# Data
costs = [
[90, 76, 75, 70, 50, 74, 12, 68],
[35, 85, 55, 65, 48, 101, 70, 83],
[125, 95, 90, 105, 59, 120, 36, 73],
[45, 110, 95, 115, 104, 83, 37, 71],
[60, 105, 80, 75, 59, 62, 93, 88],
[45, 65, 110, 95, 47, 31, 81, 34],
[38, 51, 107, 41, 69, 99, 115, 48],
[47, 85, 57, 71, 92, 77, 109, 36],
[39, 63, 97, 49, 118, 56, 92, 61],
[47, 101, 71, 60, 88, 109, 52, 90],
]
num_workers = len(costs)
num_tasks = len(costs[0])
task_sizes = [10, 7, 3, 12, 15, 4, 11, 5]
# Maximum total of task sizes for any worker
total_size_max = 15
# Model
model = cp_model.CpModel()
# Variables
x = {}
for worker in range(num_workers):
for task in range(num_tasks):
x[worker, task] = model.new_bool_var(f"x[{worker},{task}]")
# Constraints
# Each worker is assigned to at most one task.
for worker in range(num_workers):
model.add(
sum(task_sizes[task] * x[worker, task] for task in range(num_tasks))
<= total_size_max
)
# Each task is assigned to exactly one worker.
for task in range(num_tasks):
model.add_exactly_one(x[worker, task] for worker in range(num_workers))
# Objective
objective_terms = []
for worker in range(num_workers):
for task in range(num_tasks):
objective_terms.append(costs[worker][task] * x[worker, task])
model.minimize(sum(objective_terms))
# Solve
solver = cp_model.CpSolver()
status = solver.solve(model)
# Print solution.
if status == cp_model.OPTIMAL or status == cp_model.FEASIBLE:
print(f"Total cost = {solver.objective_value}\n")
for worker in range(num_workers):
for task in range(num_tasks):
if solver.boolean_value(x[worker, task]):
print(
f"Worker {worker} assigned to task {task}."
+ f" Cost = {costs[worker][task]}"
)
else:
print("No solution found.")
if __name__ == "__main__":
main()
C++
// Solve assignment problem.
#include <stdlib.h>
#include <cstdint>
#include <numeric>
#include <vector>
#include "absl/strings/str_format.h"
#include "ortools/base/logging.h"
#include "ortools/sat/cp_model.h"
#include "ortools/sat/cp_model.pb.h"
#include "ortools/sat/cp_model_solver.h"
namespace operations_research {
namespace sat {
void AssignmentTaskSizes() {
// Data
const std::vector<std::vector<int>> costs = {{
{{90, 76, 75, 70, 50, 74, 12, 68}},
{{35, 85, 55, 65, 48, 101, 70, 83}},
{{125, 95, 90, 105, 59, 120, 36, 73}},
{{45, 110, 95, 115, 104, 83, 37, 71}},
{{60, 105, 80, 75, 59, 62, 93, 88}},
{{45, 65, 110, 95, 47, 31, 81, 34}},
{{38, 51, 107, 41, 69, 99, 115, 48}},
{{47, 85, 57, 71, 92, 77, 109, 36}},
{{39, 63, 97, 49, 118, 56, 92, 61}},
{{47, 101, 71, 60, 88, 109, 52, 90}},
}};
const int num_workers = static_cast<int>(costs.size());
std::vector<int> all_workers(num_workers);
std::iota(all_workers.begin(), all_workers.end(), 0);
const int num_tasks = static_cast<int>(costs[0].size());
std::vector<int> all_tasks(num_tasks);
std::iota(all_tasks.begin(), all_tasks.end(), 0);
const std::vector<int64_t> task_sizes = {{10, 7, 3, 12, 15, 4, 11, 5}};
// Maximum total of task sizes for any worker
const int total_size_max = 15;
// Model
CpModelBuilder cp_model;
// Variables
// x[i][j] is an array of Boolean variables. x[i][j] is true
// if worker i is assigned to task j.
std::vector<std::vector<BoolVar>> x(num_workers,
std::vector<BoolVar>(num_tasks));
for (int worker : all_workers) {
for (int task : all_tasks) {
x[worker][task] = cp_model.NewBoolVar().WithName(
absl::StrFormat("x[%d,%d]", worker, task));
}
}
// Constraints
// Each worker is assigned to at most one task.
for (int worker : all_workers) {
LinearExpr task_sum;
for (int task : all_tasks) {
task_sum += x[worker][task] * task_sizes[task];
}
cp_model.AddLessOrEqual(task_sum, total_size_max);
}
// Each task is assigned to exactly one worker.
for (int task : all_tasks) {
std::vector<BoolVar> tasks;
for (int worker : all_workers) {
tasks.push_back(x[worker][task]);
}
cp_model.AddExactlyOne(tasks);
}
// Objective
LinearExpr total_cost;
for (int worker : all_workers) {
for (int task : all_tasks) {
total_cost += x[worker][task] * costs[worker][task];
}
}
cp_model.Minimize(total_cost);
// Solve
const CpSolverResponse response = Solve(cp_model.Build());
// Print solution.
if (response.status() == CpSolverStatus::INFEASIBLE) {
LOG(FATAL) << "No solution found.";
}
LOG(INFO) << "Total cost: " << response.objective_value();
LOG(INFO);
for (int worker : all_workers) {
for (int task : all_tasks) {
if (SolutionBooleanValue(response, x[worker][task])) {
LOG(INFO) << "Worker " << worker << " assigned to task " << task
<< ". Cost: " << costs[worker][task];
}
}
}
}
} // namespace sat
} // namespace operations_research
int main(int argc, char** argv) {
operations_research::sat::AssignmentTaskSizes();
return EXIT_SUCCESS;
}
Java
// CP-SAT example that solves an assignment problem.
package com.google.ortools.sat.samples;
import com.google.ortools.Loader;
import com.google.ortools.sat.CpModel;
import com.google.ortools.sat.CpSolver;
import com.google.ortools.sat.CpSolverStatus;
import com.google.ortools.sat.LinearExpr;
import com.google.ortools.sat.LinearExprBuilder;
import com.google.ortools.sat.Literal;
import java.util.ArrayList;
import java.util.List;
import java.util.stream.IntStream;
/** Assignment problem. */
public class AssignmentTaskSizesSat {
public static void main(String[] args) {
Loader.loadNativeLibraries();
// Data
int[][] costs = {
{90, 76, 75, 70, 50, 74, 12, 68},
{35, 85, 55, 65, 48, 101, 70, 83},
{125, 95, 90, 105, 59, 120, 36, 73},
{45, 110, 95, 115, 104, 83, 37, 71},
{60, 105, 80, 75, 59, 62, 93, 88},
{45, 65, 110, 95, 47, 31, 81, 34},
{38, 51, 107, 41, 69, 99, 115, 48},
{47, 85, 57, 71, 92, 77, 109, 36},
{39, 63, 97, 49, 118, 56, 92, 61},
{47, 101, 71, 60, 88, 109, 52, 90},
};
final int numWorkers = costs.length;
final int numTasks = costs[0].length;
final int[] allWorkers = IntStream.range(0, numWorkers).toArray();
final int[] allTasks = IntStream.range(0, numTasks).toArray();
final int[] taskSizes = {10, 7, 3, 12, 15, 4, 11, 5};
// Maximum total of task sizes for any worker
final int totalSizeMax = 15;
// Model
CpModel model = new CpModel();
// Variables
Literal[][] x = new Literal[numWorkers][numTasks];
for (int worker : allWorkers) {
for (int task : allTasks) {
x[worker][task] = model.newBoolVar("x[" + worker + "," + task + "]");
}
}
// Constraints
// Each worker has a maximum capacity.
for (int worker : allWorkers) {
LinearExprBuilder expr = LinearExpr.newBuilder();
for (int task : allTasks) {
expr.addTerm(x[worker][task], taskSizes[task]);
}
model.addLessOrEqual(expr, totalSizeMax);
}
// Each task is assigned to exactly one worker.
for (int task : allTasks) {
List<Literal> workers = new ArrayList<>();
for (int worker : allWorkers) {
workers.add(x[worker][task]);
}
model.addExactlyOne(workers);
}
// Objective
LinearExprBuilder obj = LinearExpr.newBuilder();
for (int worker : allWorkers) {
for (int task : allTasks) {
obj.addTerm(x[worker][task], costs[worker][task]);
}
}
model.minimize(obj);
// Solve
CpSolver solver = new CpSolver();
CpSolverStatus status = solver.solve(model);
// Print solution.
// Check that the problem has a feasible solution.
if (status == CpSolverStatus.OPTIMAL || status == CpSolverStatus.FEASIBLE) {
System.out.println("Total cost: " + solver.objectiveValue() + "\n");
for (int worker : allWorkers) {
for (int task : allTasks) {
if (solver.booleanValue(x[worker][task])) {
System.out.println("Worker " + worker + " assigned to task " + task
+ ". Cost: " + costs[worker][task]);
}
}
}
} else {
System.err.println("No solution found.");
}
}
private AssignmentTaskSizesSat() {}
}
C#
using System;
using System.Collections.Generic;
using System.Linq;
using Google.OrTools.Sat;
public class AssignmentTaskSizesSat
{
public static void Main(String[] args)
{
// Data.
int[,] costs = {
{ 90, 76, 75, 70, 50, 74, 12, 68 }, { 35, 85, 55, 65, 48, 101, 70, 83 },
{ 125, 95, 90, 105, 59, 120, 36, 73 }, { 45, 110, 95, 115, 104, 83, 37, 71 },
{ 60, 105, 80, 75, 59, 62, 93, 88 }, { 45, 65, 110, 95, 47, 31, 81, 34 },
{ 38, 51, 107, 41, 69, 99, 115, 48 }, { 47, 85, 57, 71, 92, 77, 109, 36 },
{ 39, 63, 97, 49, 118, 56, 92, 61 }, { 47, 101, 71, 60, 88, 109, 52, 90 },
};
int numWorkers = costs.GetLength(0);
int numTasks = costs.GetLength(1);
int[] allWorkers = Enumerable.Range(0, numWorkers).ToArray();
int[] allTasks = Enumerable.Range(0, numTasks).ToArray();
int[] taskSizes = { 10, 7, 3, 12, 15, 4, 11, 5 };
// Maximum total of task sizes for any worker
int totalSizeMax = 15;
// Model.
CpModel model = new CpModel();
// Variables.
BoolVar[,] x = new BoolVar[numWorkers, numTasks];
foreach (int worker in allWorkers)
{
foreach (int task in allTasks)
{
x[worker, task] = model.NewBoolVar($"x[{worker},{task}]");
}
}
// Constraints
// Each worker is assigned to at most max task size.
foreach (int worker in allWorkers)
{
BoolVar[] vars = new BoolVar[numTasks];
foreach (int task in allTasks)
{
vars[task] = x[worker, task];
}
model.Add(LinearExpr.WeightedSum(vars, taskSizes) <= totalSizeMax);
}
// Each task is assigned to exactly one worker.
foreach (int task in allTasks)
{
List<ILiteral> workers = new List<ILiteral>();
foreach (int worker in allWorkers)
{
workers.Add(x[worker, task]);
}
model.AddExactlyOne(workers);
}
// Objective
LinearExprBuilder obj = LinearExpr.NewBuilder();
foreach (int worker in allWorkers)
{
foreach (int task in allTasks)
{
obj.AddTerm(x[worker, task], costs[worker, task]);
}
}
model.Minimize(obj);
// Solve
CpSolver solver = new CpSolver();
CpSolverStatus status = solver.Solve(model);
Console.WriteLine($"Solve status: {status}");
// Print solution.
// Check that the problem has a feasible solution.
if (status == CpSolverStatus.Optimal || status == CpSolverStatus.Feasible)
{
Console.WriteLine($"Total cost: {solver.ObjectiveValue}\n");
foreach (int worker in allWorkers)
{
foreach (int task in allTasks)
{
if (solver.Value(x[worker, task]) > 0.5)
{
Console.WriteLine($"Worker {worker} assigned to task {task}. " +
$"Cost: {costs[worker, task]}");
}
}
}
}
else
{
Console.WriteLine("No solution found.");
}
Console.WriteLine("Statistics");
Console.WriteLine($" - conflicts : {solver.NumConflicts()}");
Console.WriteLine($" - branches : {solver.NumBranches()}");
Console.WriteLine($" - wall time : {solver.WallTime()}s");
}
}
Solusi MIP
Selanjutnya, kami menjelaskan solusi untuk soal penugasan menggunakan pemecah masalah MIP.
Mengimpor library
Kode berikut mengimpor library yang diperlukan.
Python
from ortools.linear_solver import pywraplp
C++
#include <cstdint> #include <memory> #include <numeric> #include <vector> #include "absl/strings/str_format.h" #include "ortools/base/logging.h" #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; import java.util.stream.IntStream;
C#
using System; using System.Collections.Generic; using System.Linq; using Google.OrTools.LinearSolver;
Menentukan data
Kode berikut akan membuat data untuk program.
Python
costs = [
[90, 76, 75, 70, 50, 74, 12, 68],
[35, 85, 55, 65, 48, 101, 70, 83],
[125, 95, 90, 105, 59, 120, 36, 73],
[45, 110, 95, 115, 104, 83, 37, 71],
[60, 105, 80, 75, 59, 62, 93, 88],
[45, 65, 110, 95, 47, 31, 81, 34],
[38, 51, 107, 41, 69, 99, 115, 48],
[47, 85, 57, 71, 92, 77, 109, 36],
[39, 63, 97, 49, 118, 56, 92, 61],
[47, 101, 71, 60, 88, 109, 52, 90],
]
num_workers = len(costs)
num_tasks = len(costs[0])
task_sizes = [10, 7, 3, 12, 15, 4, 11, 5]
# Maximum total of task sizes for any worker
total_size_max = 15
C++
const std::vector<std::vector<int64_t>> costs = {{
{{90, 76, 75, 70, 50, 74, 12, 68}},
{{35, 85, 55, 65, 48, 101, 70, 83}},
{{125, 95, 90, 105, 59, 120, 36, 73}},
{{45, 110, 95, 115, 104, 83, 37, 71}},
{{60, 105, 80, 75, 59, 62, 93, 88}},
{{45, 65, 110, 95, 47, 31, 81, 34}},
{{38, 51, 107, 41, 69, 99, 115, 48}},
{{47, 85, 57, 71, 92, 77, 109, 36}},
{{39, 63, 97, 49, 118, 56, 92, 61}},
{{47, 101, 71, 60, 88, 109, 52, 90}},
}};
const int num_workers = costs.size();
std::vector<int> all_workers(num_workers);
std::iota(all_workers.begin(), all_workers.end(), 0);
const int num_tasks = costs[0].size();
std::vector<int> all_tasks(num_tasks);
std::iota(all_tasks.begin(), all_tasks.end(), 0);
const std::vector<int64_t> task_sizes = {{10, 7, 3, 12, 15, 4, 11, 5}};
// Maximum total of task sizes for any worker
const int total_size_max = 15;
Java
double[][] costs = {
{90, 76, 75, 70, 50, 74, 12, 68},
{35, 85, 55, 65, 48, 101, 70, 83},
{125, 95, 90, 105, 59, 120, 36, 73},
{45, 110, 95, 115, 104, 83, 37, 71},
{60, 105, 80, 75, 59, 62, 93, 88},
{45, 65, 110, 95, 47, 31, 81, 34},
{38, 51, 107, 41, 69, 99, 115, 48},
{47, 85, 57, 71, 92, 77, 109, 36},
{39, 63, 97, 49, 118, 56, 92, 61},
{47, 101, 71, 60, 88, 109, 52, 90},
};
int numWorkers = costs.length;
int numTasks = costs[0].length;
final int[] allWorkers = IntStream.range(0, numWorkers).toArray();
final int[] allTasks = IntStream.range(0, numTasks).toArray();
final int[] taskSizes = {10, 7, 3, 12, 15, 4, 11, 5};
// Maximum total of task sizes for any worker
final int totalSizeMax = 15;
C#
int[,] costs = {
{ 90, 76, 75, 70, 50, 74, 12, 68 }, { 35, 85, 55, 65, 48, 101, 70, 83 },
{ 125, 95, 90, 105, 59, 120, 36, 73 }, { 45, 110, 95, 115, 104, 83, 37, 71 },
{ 60, 105, 80, 75, 59, 62, 93, 88 }, { 45, 65, 110, 95, 47, 31, 81, 34 },
{ 38, 51, 107, 41, 69, 99, 115, 48 }, { 47, 85, 57, 71, 92, 77, 109, 36 },
{ 39, 63, 97, 49, 118, 56, 92, 61 }, { 47, 101, 71, 60, 88, 109, 52, 90 },
};
int numWorkers = costs.GetLength(0);
int numTasks = costs.GetLength(1);
int[] allWorkers = Enumerable.Range(0, numWorkers).ToArray();
int[] allTasks = Enumerable.Range(0, numTasks).ToArray();
int[] taskSizes = { 10, 7, 3, 12, 15, 4, 11, 5 };
// Maximum total of task sizes for any worker
int totalSizeMax = 15;
Mendeklarasikan pemecah masalah
Kode berikut akan membuat pemecah.
Python
# Create the mip solver with the SCIP backend.
solver = pywraplp.Solver.CreateSolver("SCIP")
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#
Solver solver = Solver.CreateSolver("SCIP");
if (solver is null)
{
return;
}
Membuat variabel
Kode berikut membuat array variabel untuk masalah tersebut.
Python
# x[i, j] is an array of 0-1 variables, which will be 1
# if worker i is assigned to task j.
x = {}
for worker in range(num_workers):
for task in range(num_tasks):
x[worker, task] = solver.BoolVar(f"x[{worker},{task}]")
C++
// x[i][j] is an array of 0-1 variables, which will be 1
// if worker i is assigned to task j.
std::vector<std::vector<const MPVariable*>> x(
num_workers, std::vector<const MPVariable*>(num_tasks));
for (int worker : all_workers) {
for (int task : all_tasks) {
x[worker][task] =
solver->MakeBoolVar(absl::StrFormat("x[%d,%d]", worker, task));
}
}
Java
// x[i][j] is an array of 0-1 variables, which will be 1
// if worker i is assigned to task j.
MPVariable[][] x = new MPVariable[numWorkers][numTasks];
for (int worker : allWorkers) {
for (int task : allTasks) {
x[worker][task] = solver.makeBoolVar("x[" + worker + "," + task + "]");
}
}
C#
// x[i, j] is an array of 0-1 variables, which will be 1
// if worker i is assigned to task j.
Variable[,] x = new Variable[numWorkers, numTasks];
foreach (int worker in allWorkers)
{
foreach (int task in allTasks)
{
x[worker, task] = solver.MakeBoolVar($"x[{worker},{task}]");
}
}
Menambahkan batasan
Kode berikut membuat batasan untuk program.
Python
# The total size of the tasks each worker takes on is at most total_size_max.
for worker in range(num_workers):
solver.Add(
solver.Sum(
[task_sizes[task] * x[worker, task] for task in range(num_tasks)]
)
<= total_size_max
)
# Each task is assigned to exactly one worker.
for task in range(num_tasks):
solver.Add(solver.Sum([x[worker, task] for worker in range(num_workers)]) == 1)
C++
// Each worker is assigned to at most one task.
for (int worker : all_workers) {
LinearExpr worker_sum;
for (int task : all_tasks) {
worker_sum += LinearExpr(x[worker][task]) * task_sizes[task];
}
solver->MakeRowConstraint(worker_sum <= total_size_max);
}
// Each task is assigned to exactly one worker.
for (int task : all_tasks) {
LinearExpr task_sum;
for (int worker : all_workers) {
task_sum += x[worker][task];
}
solver->MakeRowConstraint(task_sum == 1.0);
}
Java
// Each worker is assigned to at most max task size.
for (int worker : allWorkers) {
MPConstraint constraint = solver.makeConstraint(0, totalSizeMax, "");
for (int task : allTasks) {
constraint.setCoefficient(x[worker][task], taskSizes[task]);
}
}
// Each task is assigned to exactly one worker.
for (int task : allTasks) {
MPConstraint constraint = solver.makeConstraint(1, 1, "");
for (int worker : allWorkers) {
constraint.setCoefficient(x[worker][task], 1);
}
}
C#
// Each worker is assigned to at most max task size.
foreach (int worker in allWorkers)
{
Constraint constraint = solver.MakeConstraint(0, totalSizeMax, "");
foreach (int task in allTasks)
{
constraint.SetCoefficient(x[worker, task], taskSizes[task]);
}
}
// Each task is assigned to exactly one worker.
foreach (int task in allTasks)
{
Constraint constraint = solver.MakeConstraint(1, 1, "");
foreach (int worker in allWorkers)
{
constraint.SetCoefficient(x[worker, task], 1);
}
}
Membuat tujuan
Kode berikut akan membuat fungsi objektif.
Python
objective_terms = []
for worker in range(num_workers):
for task in range(num_tasks):
objective_terms.append(costs[worker][task] * x[worker, task])
solver.Minimize(solver.Sum(objective_terms))
C++
MPObjective* const objective = solver->MutableObjective();
for (int worker : all_workers) {
for (int task : all_tasks) {
objective->SetCoefficient(x[worker][task], costs[worker][task]);
}
}
objective->SetMinimization();
Java
MPObjective objective = solver.objective();
for (int worker : allWorkers) {
for (int task : allTasks) {
objective.setCoefficient(x[worker][task], costs[worker][task]);
}
}
objective.setMinimization();
C#
Objective objective = solver.Objective();
foreach (int worker in allWorkers)
{
foreach (int task in allTasks)
{
objective.SetCoefficient(x[worker, task], costs[worker, task]);
}
}
objective.SetMinimization();
Memanggil pemecah masalah
Kode berikut memanggil pemecah masalah dan menampilkan hasilnya.
Python
print(f"Solving with {solver.SolverVersion()}")
status = solver.Solve()
C++
const MPSolver::ResultStatus result_status = solver->Solve();
Java
MPSolver.ResultStatus resultStatus = solver.solve();
C#
Solver.ResultStatus resultStatus = solver.Solve();
Menampilkan hasil
Sekarang, kita dapat mencetak solusinya.
Python
if status == pywraplp.Solver.OPTIMAL or status == pywraplp.Solver.FEASIBLE:
print(f"Total cost = {solver.Objective().Value()}\n")
for worker in range(num_workers):
for task in range(num_tasks):
if x[worker, task].solution_value() > 0.5:
print(
f"Worker {worker} assigned to task {task}."
+ f" Cost: {costs[worker][task]}"
)
else:
print("No solution found.")
C++
// Check that the problem has a feasible solution.
if (result_status != MPSolver::OPTIMAL &&
result_status != MPSolver::FEASIBLE) {
LOG(FATAL) << "No solution found.";
}
LOG(INFO) << "Total cost = " << objective->Value() << "\n\n";
for (int worker : all_workers) {
for (int task : all_tasks) {
// Test if x[i][j] is 0 or 1 (with tolerance for floating point
// arithmetic).
if (x[worker][task]->solution_value() > 0.5) {
LOG(INFO) << "Worker " << worker << " assigned to task " << task
<< ". Cost: " << costs[worker][task];
}
}
}
Java
// Check that the problem has a feasible solution.
if (resultStatus == MPSolver.ResultStatus.OPTIMAL
|| resultStatus == MPSolver.ResultStatus.FEASIBLE) {
System.out.println("Total cost: " + objective.value() + "\n");
for (int worker : allWorkers) {
for (int task : allTasks) {
// Test if x[i][j] is 0 or 1 (with tolerance for floating point
// arithmetic).
if (x[worker][task].solutionValue() > 0.5) {
System.out.println("Worker " + worker + " assigned to task " + task
+ ". Cost: " + costs[worker][task]);
}
}
}
} else {
System.err.println("No solution found.");
}
C#
// Check that the problem has a feasible solution.
if (resultStatus == Solver.ResultStatus.OPTIMAL || resultStatus == Solver.ResultStatus.FEASIBLE)
{
Console.WriteLine($"Total cost: {solver.Objective().Value()}\n");
foreach (int worker in allWorkers)
{
foreach (int task in allTasks)
{
// Test if x[i, j] is 0 or 1 (with tolerance for floating point
// arithmetic).
if (x[worker, task].SolutionValue() > 0.5)
{
Console.WriteLine($"Worker {worker} assigned to task {task}. Cost: {costs[worker, task]}");
}
}
}
}
else
{
Console.WriteLine("No solution found.");
}
Berikut adalah output program.
Minimum cost = 326.0 Worker 0 assigned to task 6 Cost = 12 Worker 1 assigned to task 0 Cost = 35 Worker 1 assigned to task 2 Cost = 55 Worker 4 assigned to task 4 Cost = 59 Worker 5 assigned to task 5 Cost = 31 Worker 5 assigned to task 7 Cost = 34 Worker 6 assigned to task 1 Cost = 51 Worker 8 assigned to task 3 Cost = 49 Time = 0.0167 seconds
Seluruh program
Ini adalah keseluruhan program.
Python
"""MIP example that solves an assignment problem."""
from ortools.linear_solver import pywraplp
def main():
# Data
costs = [
[90, 76, 75, 70, 50, 74, 12, 68],
[35, 85, 55, 65, 48, 101, 70, 83],
[125, 95, 90, 105, 59, 120, 36, 73],
[45, 110, 95, 115, 104, 83, 37, 71],
[60, 105, 80, 75, 59, 62, 93, 88],
[45, 65, 110, 95, 47, 31, 81, 34],
[38, 51, 107, 41, 69, 99, 115, 48],
[47, 85, 57, 71, 92, 77, 109, 36],
[39, 63, 97, 49, 118, 56, 92, 61],
[47, 101, 71, 60, 88, 109, 52, 90],
]
num_workers = len(costs)
num_tasks = len(costs[0])
task_sizes = [10, 7, 3, 12, 15, 4, 11, 5]
# Maximum total of task sizes for any worker
total_size_max = 15
# Solver
# Create the mip solver with the SCIP backend.
solver = pywraplp.Solver.CreateSolver("SCIP")
if not solver:
return
# Variables
# x[i, j] is an array of 0-1 variables, which will be 1
# if worker i is assigned to task j.
x = {}
for worker in range(num_workers):
for task in range(num_tasks):
x[worker, task] = solver.BoolVar(f"x[{worker},{task}]")
# Constraints
# The total size of the tasks each worker takes on is at most total_size_max.
for worker in range(num_workers):
solver.Add(
solver.Sum(
[task_sizes[task] * x[worker, task] for task in range(num_tasks)]
)
<= total_size_max
)
# Each task is assigned to exactly one worker.
for task in range(num_tasks):
solver.Add(solver.Sum([x[worker, task] for worker in range(num_workers)]) == 1)
# Objective
objective_terms = []
for worker in range(num_workers):
for task in range(num_tasks):
objective_terms.append(costs[worker][task] * x[worker, task])
solver.Minimize(solver.Sum(objective_terms))
# Solve
print(f"Solving with {solver.SolverVersion()}")
status = solver.Solve()
# Print solution.
if status == pywraplp.Solver.OPTIMAL or status == pywraplp.Solver.FEASIBLE:
print(f"Total cost = {solver.Objective().Value()}\n")
for worker in range(num_workers):
for task in range(num_tasks):
if x[worker, task].solution_value() > 0.5:
print(
f"Worker {worker} assigned to task {task}."
+ f" Cost: {costs[worker][task]}"
)
else:
print("No solution found.")
if __name__ == "__main__":
main()
C++
// Solve a simple assignment problem.
#include <cstdint>
#include <memory>
#include <numeric>
#include <vector>
#include "absl/strings/str_format.h"
#include "ortools/base/logging.h"
#include "ortools/linear_solver/linear_solver.h"
namespace operations_research {
void AssignmentTeamsMip() {
// Data
const std::vector<std::vector<int64_t>> costs = {{
{{90, 76, 75, 70, 50, 74, 12, 68}},
{{35, 85, 55, 65, 48, 101, 70, 83}},
{{125, 95, 90, 105, 59, 120, 36, 73}},
{{45, 110, 95, 115, 104, 83, 37, 71}},
{{60, 105, 80, 75, 59, 62, 93, 88}},
{{45, 65, 110, 95, 47, 31, 81, 34}},
{{38, 51, 107, 41, 69, 99, 115, 48}},
{{47, 85, 57, 71, 92, 77, 109, 36}},
{{39, 63, 97, 49, 118, 56, 92, 61}},
{{47, 101, 71, 60, 88, 109, 52, 90}},
}};
const int num_workers = costs.size();
std::vector<int> all_workers(num_workers);
std::iota(all_workers.begin(), all_workers.end(), 0);
const int num_tasks = costs[0].size();
std::vector<int> all_tasks(num_tasks);
std::iota(all_tasks.begin(), all_tasks.end(), 0);
const std::vector<int64_t> task_sizes = {{10, 7, 3, 12, 15, 4, 11, 5}};
// Maximum total of task sizes for any worker
const int total_size_max = 15;
// Solver
// Create the mip solver with the SCIP backend.
std::unique_ptr<MPSolver> solver(MPSolver::CreateSolver("SCIP"));
if (!solver) {
LOG(WARNING) << "SCIP solver unavailable.";
return;
}
// Variables
// x[i][j] is an array of 0-1 variables, which will be 1
// if worker i is assigned to task j.
std::vector<std::vector<const MPVariable*>> x(
num_workers, std::vector<const MPVariable*>(num_tasks));
for (int worker : all_workers) {
for (int task : all_tasks) {
x[worker][task] =
solver->MakeBoolVar(absl::StrFormat("x[%d,%d]", worker, task));
}
}
// Constraints
// Each worker is assigned to at most one task.
for (int worker : all_workers) {
LinearExpr worker_sum;
for (int task : all_tasks) {
worker_sum += LinearExpr(x[worker][task]) * task_sizes[task];
}
solver->MakeRowConstraint(worker_sum <= total_size_max);
}
// Each task is assigned to exactly one worker.
for (int task : all_tasks) {
LinearExpr task_sum;
for (int worker : all_workers) {
task_sum += x[worker][task];
}
solver->MakeRowConstraint(task_sum == 1.0);
}
// Objective.
MPObjective* const objective = solver->MutableObjective();
for (int worker : all_workers) {
for (int task : all_tasks) {
objective->SetCoefficient(x[worker][task], costs[worker][task]);
}
}
objective->SetMinimization();
// Solve
const MPSolver::ResultStatus result_status = solver->Solve();
// Print solution.
// Check that the problem has a feasible solution.
if (result_status != MPSolver::OPTIMAL &&
result_status != MPSolver::FEASIBLE) {
LOG(FATAL) << "No solution found.";
}
LOG(INFO) << "Total cost = " << objective->Value() << "\n\n";
for (int worker : all_workers) {
for (int task : all_tasks) {
// Test if x[i][j] is 0 or 1 (with tolerance for floating point
// arithmetic).
if (x[worker][task]->solution_value() > 0.5) {
LOG(INFO) << "Worker " << worker << " assigned to task " << task
<< ". Cost: " << costs[worker][task];
}
}
}
}
} // namespace operations_research
int main(int argc, char** argv) {
operations_research::AssignmentTeamsMip();
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;
import java.util.stream.IntStream;
/** MIP example that solves an assignment problem. */
public class AssignmentTaskSizesMip {
public static void main(String[] args) {
Loader.loadNativeLibraries();
// Data
double[][] costs = {
{90, 76, 75, 70, 50, 74, 12, 68},
{35, 85, 55, 65, 48, 101, 70, 83},
{125, 95, 90, 105, 59, 120, 36, 73},
{45, 110, 95, 115, 104, 83, 37, 71},
{60, 105, 80, 75, 59, 62, 93, 88},
{45, 65, 110, 95, 47, 31, 81, 34},
{38, 51, 107, 41, 69, 99, 115, 48},
{47, 85, 57, 71, 92, 77, 109, 36},
{39, 63, 97, 49, 118, 56, 92, 61},
{47, 101, 71, 60, 88, 109, 52, 90},
};
int numWorkers = costs.length;
int numTasks = costs[0].length;
final int[] allWorkers = IntStream.range(0, numWorkers).toArray();
final int[] allTasks = IntStream.range(0, numTasks).toArray();
final int[] taskSizes = {10, 7, 3, 12, 15, 4, 11, 5};
// Maximum total of task sizes for any worker
final int totalSizeMax = 15;
// Solver
// 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;
}
// Variables
// x[i][j] is an array of 0-1 variables, which will be 1
// if worker i is assigned to task j.
MPVariable[][] x = new MPVariable[numWorkers][numTasks];
for (int worker : allWorkers) {
for (int task : allTasks) {
x[worker][task] = solver.makeBoolVar("x[" + worker + "," + task + "]");
}
}
// Constraints
// Each worker is assigned to at most max task size.
for (int worker : allWorkers) {
MPConstraint constraint = solver.makeConstraint(0, totalSizeMax, "");
for (int task : allTasks) {
constraint.setCoefficient(x[worker][task], taskSizes[task]);
}
}
// Each task is assigned to exactly one worker.
for (int task : allTasks) {
MPConstraint constraint = solver.makeConstraint(1, 1, "");
for (int worker : allWorkers) {
constraint.setCoefficient(x[worker][task], 1);
}
}
// Objective
MPObjective objective = solver.objective();
for (int worker : allWorkers) {
for (int task : allTasks) {
objective.setCoefficient(x[worker][task], costs[worker][task]);
}
}
objective.setMinimization();
// Solve
MPSolver.ResultStatus resultStatus = solver.solve();
// Print solution.
// Check that the problem has a feasible solution.
if (resultStatus == MPSolver.ResultStatus.OPTIMAL
|| resultStatus == MPSolver.ResultStatus.FEASIBLE) {
System.out.println("Total cost: " + objective.value() + "\n");
for (int worker : allWorkers) {
for (int task : allTasks) {
// Test if x[i][j] is 0 or 1 (with tolerance for floating point
// arithmetic).
if (x[worker][task].solutionValue() > 0.5) {
System.out.println("Worker " + worker + " assigned to task " + task
+ ". Cost: " + costs[worker][task]);
}
}
}
} else {
System.err.println("No solution found.");
}
}
private AssignmentTaskSizesMip() {}
}
C#
using System;
using System.Collections.Generic;
using System.Linq;
using Google.OrTools.LinearSolver;
public class AssignmentTaskSizesMip
{
static void Main()
{
// Data.
int[,] costs = {
{ 90, 76, 75, 70, 50, 74, 12, 68 }, { 35, 85, 55, 65, 48, 101, 70, 83 },
{ 125, 95, 90, 105, 59, 120, 36, 73 }, { 45, 110, 95, 115, 104, 83, 37, 71 },
{ 60, 105, 80, 75, 59, 62, 93, 88 }, { 45, 65, 110, 95, 47, 31, 81, 34 },
{ 38, 51, 107, 41, 69, 99, 115, 48 }, { 47, 85, 57, 71, 92, 77, 109, 36 },
{ 39, 63, 97, 49, 118, 56, 92, 61 }, { 47, 101, 71, 60, 88, 109, 52, 90 },
};
int numWorkers = costs.GetLength(0);
int numTasks = costs.GetLength(1);
int[] allWorkers = Enumerable.Range(0, numWorkers).ToArray();
int[] allTasks = Enumerable.Range(0, numTasks).ToArray();
int[] taskSizes = { 10, 7, 3, 12, 15, 4, 11, 5 };
// Maximum total of task sizes for any worker
int totalSizeMax = 15;
// Solver.
Solver solver = Solver.CreateSolver("SCIP");
if (solver is null)
{
return;
}
// Variables.
// x[i, j] is an array of 0-1 variables, which will be 1
// if worker i is assigned to task j.
Variable[,] x = new Variable[numWorkers, numTasks];
foreach (int worker in allWorkers)
{
foreach (int task in allTasks)
{
x[worker, task] = solver.MakeBoolVar($"x[{worker},{task}]");
}
}
// Constraints
// Each worker is assigned to at most max task size.
foreach (int worker in allWorkers)
{
Constraint constraint = solver.MakeConstraint(0, totalSizeMax, "");
foreach (int task in allTasks)
{
constraint.SetCoefficient(x[worker, task], taskSizes[task]);
}
}
// Each task is assigned to exactly one worker.
foreach (int task in allTasks)
{
Constraint constraint = solver.MakeConstraint(1, 1, "");
foreach (int worker in allWorkers)
{
constraint.SetCoefficient(x[worker, task], 1);
}
}
// Objective
Objective objective = solver.Objective();
foreach (int worker in allWorkers)
{
foreach (int task in allTasks)
{
objective.SetCoefficient(x[worker, task], costs[worker, task]);
}
}
objective.SetMinimization();
// Solve
Solver.ResultStatus resultStatus = solver.Solve();
// Print solution.
// Check that the problem has a feasible solution.
if (resultStatus == Solver.ResultStatus.OPTIMAL || resultStatus == Solver.ResultStatus.FEASIBLE)
{
Console.WriteLine($"Total cost: {solver.Objective().Value()}\n");
foreach (int worker in allWorkers)
{
foreach (int task in allTasks)
{
// Test if x[i, j] is 0 or 1 (with tolerance for floating point
// arithmetic).
if (x[worker, task].SolutionValue() > 0.5)
{
Console.WriteLine($"Worker {worker} assigned to task {task}. Cost: {costs[worker, task]}");
}
}
}
}
else
{
Console.WriteLine("No solution found.");
}
}
}