Heavy-tailed mutation operators in single-objective combinatorial optimization

Tobias Friedrich, Andreas Göbel, Francesco Quinzan, Markus Wagner

Research output: Chapter in Book/Report/Conference proceedingConference PaperResearchpeer-review

37 Citations (Scopus)

Abstract

A core feature of evolutionary algorithms is their mutation operator. Recently, much attention has been devoted to the study of mutation operators with dynamic and non-uniform mutation rates. Following up on this line of work, we propose a new mutation operator and analyze its performance on the (1+1) Evolutionary Algorithm (EA). Our analyses show that this mutation operator competes with pre-existing ones, when used by the (1+1) EA on classes of problems for which results on the other mutation operators are available. We present a “jump” function for which the performance of the (1+1) EA using any static uniform mutation and any restart strategy can be worse than the performance of the (1+1) EA using our mutation operator with no restarts. We show that the (1+1) EA using our mutation operator finds a (1/3)-approximation ratio on any non-negative submodular function in polynomial time. This performance matches that of combinatorial local search algorithms specifically designed to solve this problem. Finally, we evaluate experimentally the performance of the (1+1) EA using our operator, on real-world graphs of different origins with up to ∼ 37 000 vertices and ∼ 1.6 million edges. In comparison with uniform mutation and a recently proposed dynamic scheme our operator comes out on top on these instances.

Original languageEnglish
Title of host publicationParallel Problem Solving from Nature – PPSN XV - 15th International Conference Coimbra, Portugal, September 8–12, 2018 Proceedings, Part I
EditorsAnne Auger, Carlos M. Fonseca, Nuno Lourenco, Penousal Machado, Luis Paquete, Darrell Whitley
Place of PublicationCham Switzerland
PublisherSpringer
Pages134-145
Number of pages12
ISBN (Electronic)9783319992532
ISBN (Print)9783319992525
DOIs
Publication statusPublished - 2018
Externally publishedYes
EventParallel Problem Solving from Nature 2018 - Coimbra, Portugal
Duration: 8 Sept 201812 Sept 2018
Conference number: 15th
https://link.springer.com/book/10.1007/978-3-319-99259-4 (Proceedings)
http://ppsn2018.dei.uc.pt/ (Website)

Publication series

NameLecture Notes in Computer Science
PublisherSpringer
Volume11101
ISSN (Print)0302-9743
ISSN (Electronic)1611-3349

Conference

ConferenceParallel Problem Solving from Nature 2018
Abbreviated titlePPSN 2018
Country/TerritoryPortugal
CityCoimbra
Period8/09/1812/09/18
Internet address

Keywords

  • Minimum vertex cover problem
  • Mutation operators
  • Submodular functions maximization

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