Package org.moeaframework.problem.MaF
Class MaF6
java.lang.Object
org.moeaframework.problem.AbstractProblem
org.moeaframework.problem.DTLZ.DTLZ
org.moeaframework.problem.MaF.MaF6
- All Implemented Interfaces:
AutoCloseable
,Problem
,AnalyticalProblem
The MaF6 test problem, also known as the "DTLZ5(I,M)" problem with
I=2
. This problem exhibits the following
properties:
- Concave Pareto front
- Degenerate
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Field Summary
Fields inherited from class org.moeaframework.problem.AbstractProblem
numberOfConstraints, numberOfObjectives, numberOfVariables
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Constructor Summary
ConstructorDescriptionMaF6
(int numberOfObjectives) Constructs an MaF6 test problem with the specified number of objectives. -
Method Summary
Methods inherited from class org.moeaframework.problem.DTLZ.DTLZ
g1, g2, generateAt, getName, newSolution
Methods inherited from class org.moeaframework.problem.AbstractProblem
close, getNumberOfConstraints, getNumberOfObjectives, getNumberOfVariables
Methods inherited from class java.lang.Object
clone, equals, finalize, getClass, hashCode, notify, notifyAll, toString, wait, wait, wait
Methods inherited from interface org.moeaframework.core.Problem
close, getName, getNumberOfConstraints, getNumberOfObjectives, getNumberOfVariables, isType, newSolution
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Constructor Details
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MaF6
public MaF6(int numberOfObjectives) Constructs an MaF6 test problem with the specified number of objectives.- Parameters:
numberOfObjectives
- the number of objectives for this problem
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Method Details
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evaluate
Description copied from interface:Problem
Evaluates the solution, updating the solution's objectives in place. Algorithms must explicitly call this method when appropriate to evaluate new solutions or reevaluate modified solutions. -
generate
Description copied from interface:AnalyticalProblem
Returns a randomly-generated solution using the analytical solution to this problem. The exact behavior of this method depends on the implementation, but in general (1) the solutions should be non-dominated and (2) spread uniformly across the Pareto front.It is not always possible to guarantee these conditions. For example, a discontinuous / disconnected Pareto surface could generate dominated solutions, and a biased problem could result in non-uniform distributions. Therefore, we recommend callers filter solutions through a
NondominatedPopulation
, in particular one that maintains a spread of solutions.Furthermore, some implementations may not provide the corresponding decision variables for the solution. These implementations should indicate this by returning a solution with
0
decision variables.- Specified by:
generate
in interfaceAnalyticalProblem
- Returns:
- a randomly-generated Pareto optimal solution to this problem
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