Generalized Heavy-tailed Mutation for Evolutionary Algorithms

Standard

Generalized Heavy-tailed Mutation for Evolutionary Algorithms. / Eremeev, Antion Valentinovich; Silaev, Dmitriy Vyacheslavovich; Topchii, Valentin Alekseevich.

In: Siberian Electronic Mathematical Reports, Vol. 21, No. 2, 01.01.2024, p. 940-959.

Research output: Contribution to journal › Article › peer-review

Harvard

Eremeev, AV, Silaev, DV & Topchii, VA 2024, 'Generalized Heavy-tailed Mutation for Evolutionary Algorithms', Siberian Electronic Mathematical Reports, vol. 21, no. 2, pp. 940-959. https://doi.org/10.33048/semi.2024.21.062

APA

Eremeev, A. V., Silaev, D. V., & Topchii, V. A. (2024). Generalized Heavy-tailed Mutation for Evolutionary Algorithms. Siberian Electronic Mathematical Reports, 21(2), 940-959. https://doi.org/10.33048/semi.2024.21.062

Vancouver

Eremeev AV, Silaev DV, Topchii VA. Generalized Heavy-tailed Mutation for Evolutionary Algorithms. Siberian Electronic Mathematical Reports. 2024 Jan 1;21(2):940-959. doi: 10.33048/semi.2024.21.062

Author

Eremeev, Antion Valentinovich ; Silaev, Dmitriy Vyacheslavovich ; Topchii, Valentin Alekseevich. / Generalized Heavy-tailed Mutation for Evolutionary Algorithms. In: Siberian Electronic Mathematical Reports. 2024 ; Vol. 21, No. 2. pp. 940-959.

BibTeX

@article{bdcdfb443e954a84bc65406d50943d65,

title = "Generalized Heavy-tailed Mutation for Evolutionary Algorithms",

abstract = "The heavy-tailed mutation operator, proposed by Doerr, Le, Makhmara, and Nguyen (2017) for evolutionary algorithms, is based on the power-law assumption of mutation rate distribution. Here we generalize the power-law assumption using a regularly varying constraint on the distribution function of mutation rate. In this setting, we generalize the upper bounds on the expected optimization time of the (1 + (λ, λ)) genetic algorithm obtained by Antipov, Buzdalov and Doerr (2022) for the OneMax function class parametrized by the problem dimension n. In particular, it is shown that, on this function class, the sufficient conditions of Antipov, Buzdalov and Doerr (2022) on the heavy-tailed mutation, ensuring the O(n) optimization time in expectation, may be generalized as well. This optimization time is known to be asymptotically faster than what can be achieved by the (1 + (λ, λ)) genetic algorithm with any static mutation rate. A new version of the heavy-tailed mutation operator is proposed, satisfying the generalized conditions, and promising results of computational experiments are presented.",

keywords = "Evolutionary algorithms, heavy-tailed mutation, optimization time, regularly varying functions",

author = "Eremeev, {Antion Valentinovich} and Silaev, {Dmitriy Vyacheslavovich} and Topchii, {Valentin Alekseevich}",

year = "2024",

month = jan,

day = "1",

doi = "10.33048/semi.2024.21.062",

language = "English",

volume = "21",

pages = "940--959",

journal = "Сибирские электронные математические известия",

issn = "1813-3304",

publisher = "Sobolev Institute of Mathematics",

number = "2",

}

RIS

TY - JOUR

T1 - Generalized Heavy-tailed Mutation for Evolutionary Algorithms

AU - Eremeev, Antion Valentinovich

AU - Silaev, Dmitriy Vyacheslavovich

AU - Topchii, Valentin Alekseevich

PY - 2024/1/1

Y1 - 2024/1/1

N2 - The heavy-tailed mutation operator, proposed by Doerr, Le, Makhmara, and Nguyen (2017) for evolutionary algorithms, is based on the power-law assumption of mutation rate distribution. Here we generalize the power-law assumption using a regularly varying constraint on the distribution function of mutation rate. In this setting, we generalize the upper bounds on the expected optimization time of the (1 + (λ, λ)) genetic algorithm obtained by Antipov, Buzdalov and Doerr (2022) for the OneMax function class parametrized by the problem dimension n. In particular, it is shown that, on this function class, the sufficient conditions of Antipov, Buzdalov and Doerr (2022) on the heavy-tailed mutation, ensuring the O(n) optimization time in expectation, may be generalized as well. This optimization time is known to be asymptotically faster than what can be achieved by the (1 + (λ, λ)) genetic algorithm with any static mutation rate. A new version of the heavy-tailed mutation operator is proposed, satisfying the generalized conditions, and promising results of computational experiments are presented.

AB - The heavy-tailed mutation operator, proposed by Doerr, Le, Makhmara, and Nguyen (2017) for evolutionary algorithms, is based on the power-law assumption of mutation rate distribution. Here we generalize the power-law assumption using a regularly varying constraint on the distribution function of mutation rate. In this setting, we generalize the upper bounds on the expected optimization time of the (1 + (λ, λ)) genetic algorithm obtained by Antipov, Buzdalov and Doerr (2022) for the OneMax function class parametrized by the problem dimension n. In particular, it is shown that, on this function class, the sufficient conditions of Antipov, Buzdalov and Doerr (2022) on the heavy-tailed mutation, ensuring the O(n) optimization time in expectation, may be generalized as well. This optimization time is known to be asymptotically faster than what can be achieved by the (1 + (λ, λ)) genetic algorithm with any static mutation rate. A new version of the heavy-tailed mutation operator is proposed, satisfying the generalized conditions, and promising results of computational experiments are presented.

KW - Evolutionary algorithms

KW - heavy-tailed mutation

KW - optimization time

KW - regularly varying functions

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UR - https://www.mendeley.com/catalogue/459b0829-7087-3620-b47a-7a847a4e3d0a/

U2 - 10.33048/semi.2024.21.062

DO - 10.33048/semi.2024.21.062

M3 - Article

VL - 21

SP - 940

EP - 959

JO - Сибирские электронные математические известия

JF - Сибирские электронные математические известия

SN - 1813-3304

IS - 2

ER -

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