1 | #region License Information
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2 | /* HeuristicLab
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3 | * Copyright (C) 2002-2019 Heuristic and Evolutionary Algorithms Laboratory (HEAL)
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4 | *
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5 | * This file is part of HeuristicLab.
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6 | *
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7 | * HeuristicLab is free software: you can redistribute it and/or modify
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8 | * it under the terms of the GNU General Public License as published by
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9 | * the Free Software Foundation, either version 3 of the License, or
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10 | * (at your option) any later version.
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11 | *
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12 | * HeuristicLab is distributed in the hope that it will be useful,
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13 | * but WITHOUT ANY WARRANTY; without even the implied warranty of
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14 | * MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
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15 | * GNU General Public License for more details.
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16 | *
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17 | * You should have received a copy of the GNU General Public License
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18 | * along with HeuristicLab. If not, see <http://www.gnu.org/licenses/>.
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19 | */
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20 | #endregion
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21 |
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22 | using System;
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23 | using HeuristicLab.Common;
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24 | using HeuristicLab.Core;
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25 | using HeuristicLab.Data;
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26 | using HeuristicLab.Encodings.RealVectorEncoding;
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27 | using HeuristicLab.Parameters;
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28 | using HEAL.Attic;
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29 |
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30 | namespace HeuristicLab.Problems.TestFunctions {
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31 | /// <summary>
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32 | /// The generalized Rastrigin function y = Sum((x_i)^2 + A * (1 - Cos(2pi*x_i))) is a highly multimodal function that has its optimal value 0 at the origin.
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33 | /// It is implemented as described in Eiben, A.E. and Smith, J.E. 2003. Introduction to Evolutionary Computation. Natural Computing Series, Springer-Verlag Berlin Heidelberg.
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34 | /// </summary
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35 | [Item("RastriginEvaluator", "Evaluates the generalized Rastrigin function y = Sum((x_i)^2 + A * (1 - Cos(2pi*x_i))) on a given point. The optimum of this function is 0 at the origin. It is implemented as described in Eiben, A.E. and Smith, J.E. 2003. Introduction to Evolutionary Computation. Natural Computing Series, Springer-Verlag Berlin Heidelberg.")]
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36 | [StorableType("DAC41E30-0487-4400-A089-4B57DFAA329A")]
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37 | public class RastriginEvaluator : SingleObjectiveTestFunctionProblemEvaluator {
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38 | public override string FunctionName { get { return "Rastrigin"; } }
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39 | /// <summary>
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40 | /// Returns false as the Rastrigin function is a minimization problem.
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41 | /// </summary>
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42 | public override bool Maximization {
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43 | get { return false; }
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44 | }
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45 | /// <summary>
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46 | /// Gets the optimum function value (0).
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47 | /// </summary>
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48 | public override double BestKnownQuality {
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49 | get { return 0; }
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50 | }
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51 | /// <summary>
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52 | /// Gets the lower and upper bound of the function.
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53 | /// </summary>
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54 | public override DoubleMatrix Bounds {
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55 | get { return new DoubleMatrix(new double[,] { { -5.12, 5.12 } }); }
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56 | }
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57 | /// <summary>
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58 | /// Gets the minimum problem size (1).
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59 | /// </summary>
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60 | public override int MinimumProblemSize {
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61 | get { return 1; }
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62 | }
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63 | /// <summary>
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64 | /// Gets the (theoretical) maximum problem size (2^31 - 1).
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65 | /// </summary>
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66 | public override int MaximumProblemSize {
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67 | get { return int.MaxValue; }
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68 | }
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69 | /// <summary>
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70 | /// The parameter A is a parameter of the objective function y = Sum((x_i)^2 + A * (1 - Cos(2pi*x_i))). Default is A = 10.
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71 | /// </summary>
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72 | public ValueParameter<DoubleValue> AParameter {
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73 | get { return (ValueParameter<DoubleValue>)Parameters["A"]; }
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74 | }
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75 | /// <summary>
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76 | /// The parameter A is a parameter of the objective function y = Sum((x_i)^2 + A * (1 - Cos(2pi*x_i))). Default is A = 10.
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77 | /// </summary>
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78 | public DoubleValue A {
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79 | get { return AParameter.Value; }
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80 | set { if (value != null) AParameter.Value = value; }
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81 | }
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82 |
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83 | public override RealVector GetBestKnownSolution(int dimension) {
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84 | return new RealVector(dimension);
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85 | }
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86 |
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87 | [StorableConstructor]
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88 | protected RastriginEvaluator(StorableConstructorFlag _) : base(_) { }
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89 | protected RastriginEvaluator(RastriginEvaluator original, Cloner cloner) : base(original, cloner) { }
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90 | /// <summary>
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91 | /// Initializes a new instance of the RastriginEvaluator with one parameter (<c>A</c>).
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92 | /// </summary>
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93 | public RastriginEvaluator()
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94 | : base() {
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95 | Parameters.Add(new ValueParameter<DoubleValue>("A", "The parameter A is a parameter of the objective function y = Sum((x_i)^2 + A * (1 - Cos(2pi*x_i))). Default is A = 10.", new DoubleValue(10)));
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96 | }
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97 |
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98 | public override IDeepCloneable Clone(Cloner cloner) {
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99 | return new RastriginEvaluator(this, cloner);
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100 | }
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101 |
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102 | /// <summary>
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103 | /// Evaluates the test function for a specific <paramref name="point"/>.
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104 | /// </summary>
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105 | /// <param name="point">N-dimensional point for which the test function should be evaluated.</param>
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106 | /// <returns>The result value of the Rastrigin function at the given point.</returns>
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107 | public static double Apply(RealVector point, double a) {
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108 | double result = a * point.Length;
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109 | for (int i = 0; i < point.Length; i++) {
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110 | result += point[i] * point[i];
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111 | result -= a * Math.Cos(2 * Math.PI * point[i]);
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112 | }
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113 | return (result);
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114 | }
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115 |
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116 | /// <summary>
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117 | /// Evaluates the test function for a specific <paramref name="point"/>.
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118 | /// </summary>
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119 | /// <remarks>Calls <see cref="Apply"/>.</remarks>
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120 | /// <param name="point">N-dimensional point for which the test function should be evaluated.</param>
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121 | /// <returns>The result value of the Rastrigin function at the given point.</returns>
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122 | public override double Evaluate(RealVector point) {
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123 | return Apply(point, A.Value);
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124 | }
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125 | }
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126 | }
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