Proceedings of the Genetic and Evolutionary Computation Conference 2016 2016
DOI: 10.1145/2908812.2908873
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A Toolkit for Generating Scalable Stochastic Multiobjective Test Problems

Abstract: Real-world optimization problems typically include uncertainties over various aspects of the problem formulation. Some existing algorithms are designed to cope with stochastic multiobjective optimization problems, but in order to benchmark them, a proper framework still needs to be established. This paper presents a novel toolkit that generates scalable, stochastic, multiobjective optimization problems. A stochastic problem is generated by transforming the objective vectors of a given deterministic test proble… Show more

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Cited by 4 publications
(5 citation statements)
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“…The discretised decreasing triangular distribution is preferred for its practicality where it provides good results and also it does not have relatively straight forward parameters to set. The asymmetric discretised decreasing triangular distribution can be generally defended as follows (Salomon, Purshouse, Giaghiozis, and Fleming, 2016):…”
Section: Hybridising Ig With Biased Randomisationmentioning
confidence: 99%
“…The discretised decreasing triangular distribution is preferred for its practicality where it provides good results and also it does not have relatively straight forward parameters to set. The asymmetric discretised decreasing triangular distribution can be generally defended as follows (Salomon, Purshouse, Giaghiozis, and Fleming, 2016):…”
Section: Hybridising Ig With Biased Randomisationmentioning
confidence: 99%
“…This simulates the effect that stochasticity can have when approaching the Paretooptimal Front (PF). The second problem, namely P2, is characterised by having a more smooth landscape with no local minima surrounding the global optimum, and stochasticity is added by the toolkit from [10].…”
Section: Hypothesis Testingmentioning
confidence: 99%
“…The effect of these parameters is shown in Figure 2, in that: the density of hills around the optimum increases with an increase in d as shown in Figure 2(a), and; the proximity of local minima from the value zero decreases with an increase in e as shown in Figure 2(b). The toolkit from [10] is used here to transform the objective vectors of WFG4 into random vectors. The parameters have been chosen to ensure that uncertainty increases towards more optimal regions.…”
Section: Hypothesis Testingmentioning
confidence: 99%
“…A general description for the stochastic features in uncertain MOPs can be found in the studies of Goh et al (2010) and Salomon et al (2016b). Goh et al (2010) have developed a generic method that can transform any deterministic MOP into a stochastic one by injecting a parametric configurable noise function to various parts of the problem formulation.…”
Section: Robust Multi-objective Optimizationmentioning
confidence: 99%
“…Goh et al (2010) have developed a generic method that can transform any deterministic MOP into a stochastic one by injecting a parametric configurable noise function to various parts of the problem formulation. Salomon et al (2016b) have presented a toolkit to generate uncertain MOPs that allows for direct control over the stochastic properties of the problem.…”
Section: Robust Multi-objective Optimizationmentioning
confidence: 99%