Upper Bounds on the Running Time of the Univariate Marginal Distribution Algorithm on OneMax

The Univariate Marginal Distribution Algorithm (UMDA) is a randomized search heuristic that builds a stochastic model of the underlying optimization problem by repeatedly sampling λ solutions and adjusting the model according to the best μ samples. We present a running time analysis of the UMDA on t...

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Vydáno v:	Algorithmica Ročník 81; číslo 2; s. 632 - 667
Hlavní autor:	Witt, Carsten
Médium:	Journal Article
Jazyk:	angličtina
Vydáno:	New York Springer US 15.02.2019 Springer Nature B.V
Témata:	Algorithm Analysis and Problem Complexity Algorithms Computer Science Computer Systems Organization and Communication Networks Data Structures and Information Theory Lower bounds Mathematics of Computing Run time (computers) Special Issue on Theory of Genetic and Evolutionary Computation Theory of Computation Upper bounds New York Randomized search heuristics UMDA Estimation-of-distribution algorithms Running time analysis
ISSN:	0178-4617, 1432-0541
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Shrnutí:	The Univariate Marginal Distribution Algorithm (UMDA) is a randomized search heuristic that builds a stochastic model of the underlying optimization problem by repeatedly sampling λ solutions and adjusting the model according to the best μ samples. We present a running time analysis of the UMDA on the classical OneMax benchmark function for wide ranges of the parameters μ and λ . If μ ≥ c log n for some constant c > 0 and λ = ( 1 + Θ ( 1 ) ) μ , we obtain a general bound O ( μ n ) on the expected running time. This bound crucially assumes that all marginal probabilities of the algorithm are confined to the interval [ 1 / n , 1 - 1 / n ] . If μ ≥ c ′ n log n for a constant c ′ > 0 and λ = ( 1 + Θ ( 1 ) ) μ , the behavior of the algorithm changes and the bound on the expected running time becomes O ( μ n ) , which typically holds even if the borders on the marginal probabilities are omitted. The results supplement the recently derived lower bound Ω ( μ n + n log n ) by Krejca and Witt (Proceedings of FOGA 2017, ACM Press, New York, pp 65–79, 2017 ) and turn out to be tight for the two very different choices μ = c log n and μ = c ′ n log n . They also improve the previously best known upper bound O ( n log n log log n ) by Dang and Lehre (Proceedings of GECCO ’15, ACM Press, New York, pp 513–518, 2015 ) that was established for μ = c log n and λ = ( 1 + Θ ( 1 ) ) μ .
Bibliografie:	ObjectType-Article-1 SourceType-Scholarly Journals-1 ObjectType-Feature-2 content type line 14
ISSN:	0178-4617 1432-0541
DOI:	10.1007/s00453-018-0463-0