cs-optimization-binary-solutions 1.0.1

.NET Framework 4.5.2

dotnet add package cs-optimization-binary-solutions --version 1.0.1

NuGet\Install-Package cs-optimization-binary-solutions -Version 1.0.1

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<PackageReference Include="cs-optimization-binary-solutions" Version="1.0.1" />

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paket add cs-optimization-binary-solutions --version 1.0.1

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#r "nuget: cs-optimization-binary-solutions, 1.0.1"

#r directive can be used in F# Interactive and Polyglot Notebooks. Copy this into the interactive tool or source code of the script to reference the package.

// Install cs-optimization-binary-solutions as a Cake Addin
#addin nuget:?package=cs-optimization-binary-solutions&version=1.0.1

// Install cs-optimization-binary-solutions as a Cake Tool
#tool nuget:?package=cs-optimization-binary-solutions&version=1.0.1

The NuGet Team does not provide support for this client. Please contact its maintainers for support.

cs-optimization-binary-solutions

Local search optimization for binary-coded solutions implemented in C#

Features

The following meta-heuristic algorithms are provided for binary optimization (Optimization in which the solutions are binary-coded):

Genetic Algorithm
Memetic Algorithm
GRASP
Multi-start Hill Climbing
Tabu Search
Variable Neighbhorhood Search
Iterated Local Search
Random Search

Usage

The code below shows how to use Genetic Algorithm to solve an optimization problem that looks for the binary-coded solution with minimum number of 1 bits:

int popSize = 100;
int dimension = 1000; // solution has 1000 bits
GeneticAlgorithm method = new GeneticAlgorithm(popSize, dimension);
method.MaxIterations = 500;

method.SolutionUpdated += (best_solution, step) =>
{
	Console.WriteLine("Step {0}: Fitness = {1}", step, best_solution.Cost);
};

BinarySolution finalSolution = method.Minimize((solution, constraints) =>
{
	int num1Bits = 0;
	for(int i=0; i < solution.Length; ++i)
	{
		num1Bits += solution[i];
	}
	return num1Bits; // try to minimize the number of 1 bits in the solution
});
Console.WriteLine("final solution: {0}", finalSolution);

The code below shows how to use Memetic Algorithm to solve an optimization problem that looks for the binary-coded solution with minimum number of 1 bits:

int popSize = 100;
int dimension = 1000; // solution has 1000 bits
MemeticAlgorithm method = new MemeticAlgorithm(popSize, dimension);
method.MaxIterations = 10;
method.MaxLocalSearchIterations = 1000;

method.SolutionUpdated += (best_solution, step) =>
{
	Console.WriteLine("Step {0}: Fitness = {1}", step, best_solution.Cost);
};

BinarySolution finalSolution = method.Minimize((solution, constraints) =>
{
	int num1Bits = 0;
	for(int i=0; i < solution.Length; ++i)
	{
		num1Bits += solution[i];
	}
	return num1Bits; // try to minimize the number of 1 bits in the solution
});
Console.WriteLine("final solution: {0}", finalSolution);

The code below shows how to use Stochastic Hill Climber to solve an optimization problem that looks for the binary-coded solution with minimum number of 1 bits:

int dimension = 1000; // solution has 1000 bits
StochasticHillClimber method = new StochasticHillClimber(dimension);
method.MaxIterations = 100;

method.SolutionUpdated += (best_solution, step) =>
{
	Console.WriteLine("Step {0}: Fitness = {1}", step, best_solution.Cost);
};

BinarySolution finalSolution = method.Minimize((solution, constraints) =>
{
	int num1Bits = 0;
	for(int i=0; i < solution.Length; ++i)
	{
		num1Bits += solution[i];
	}
	return num1Bits; // try to minimize the number of 1 bits in the solution
});
Console.WriteLine("final solution: {0}", finalSolution);

The code below shows how to use Iterated Local Search to solve an optimization problem that looks for the binary-coded solution with minimum number of 1 bits:

int dimension = 1000; // solution has 1000 bits
IteratedLocalSearch method = new IteratedLocalSearch(dimension);
method.MaxIterations = 1000;

method.SolutionUpdated += (best_solution, step) =>
{
	Console.WriteLine("Step {0}: Fitness = {1}", step, best_solution.Cost);
};

BinarySolution finalSolution = method.Minimize((solution, constraints) =>
{
	int num1Bits = 0;
	for(int i=0; i < solution.Length; ++i)
	{
		num1Bits += solution[i];
	}
	return num1Bits; // try to minimize the number of 1 bits in the solution
});
Console.WriteLine("final solution: {0}", finalSolution);

Product	Compatible and additional computed target framework versions.
.NET Framework	net452 is compatible. net46 was computed. net461 was computed. net462 was computed. net463 was computed. net47 was computed. net471 was computed. net472 was computed. net48 was computed. net481 was computed.

Compatible target framework(s)

Included target framework(s) (in package)

Learn more about Target Frameworks and .NET Standard.

This package has no dependencies.

NuGet packages

This package is not used by any NuGet packages.

GitHub repositories

This package is not used by any popular GitHub repositories.

Version	Downloads	Last updated
1.0.1	1,156	11/4/2017

Numerical Optimization Package in which solutions are binary-coded. Based on .NET 4.5.2