Sharp bounds by probability-generating functions and variable drift

Benjamin Doerr; Mahmoud Fouz; Carsten Witt

doi:10.1145/2001576.2001856

Sharp bounds by probability-generating functions and variable drift

Benjamin Doerr
, Mahmoud Fouz
, Carsten Witt

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution › peer-review

Abstract

We introduce to the runtime analysis of evolutionary algorithms two powerful techniques: probability-generating functions and variable drift analysis. They are shown to provide a clean framework for proving sharp upper and lower bounds. As an application, we improve the results by Doerr et al. (GECCO 2010) in several respects. First, the upper bound on the expected running time of the most successful quasirandom evolutionary algorithm for the OneMax function is improved from 1.28nln n to 0.982nlnn, which breaks the barrier of nln n posed by coupon-collector processes. Compared to the classical (1+1) EA, whose runtime will for the first time be analyzed with respect to terms of lower order, this represents a speedup by more than a factor of e = 2.71.

Original language	English
Title of host publication	Genetic and Evolutionary Computation Conference, GECCO'11
Pages	2083-2090
Number of pages	8
DOIs	https://doi.org/10.1145/2001576.2001856
Publication status	Published - 24 Aug 2011
Externally published	Yes
Event	13th Annual Genetic and Evolutionary Computation Conference, GECCO'11 - Dublin, Ireland Duration: 12 Jul 2011 → 16 Jul 2011

Publication series

Name	Genetic and Evolutionary Computation Conference, GECCO'11

Conference

Conference	13th Annual Genetic and Evolutionary Computation Conference, GECCO'11
Country/Territory	Ireland
City	Dublin
Period	12/07/11 → 16/07/11

Keywords

Evolutionary algorithms
Probability- generating functions
Quasirandomness
Variable drift

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10.1145/2001576.2001856

Cite this

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title = "Sharp bounds by probability-generating functions and variable drift",

abstract = "We introduce to the runtime analysis of evolutionary algorithms two powerful techniques: probability-generating functions and variable drift analysis. They are shown to provide a clean framework for proving sharp upper and lower bounds. As an application, we improve the results by Doerr et al. (GECCO 2010) in several respects. First, the upper bound on the expected running time of the most successful quasirandom evolutionary algorithm for the OneMax function is improved from 1.28nln n to 0.982nlnn, which breaks the barrier of nln n posed by coupon-collector processes. Compared to the classical (1+1) EA, whose runtime will for the first time be analyzed with respect to terms of lower order, this represents a speedup by more than a factor of e = 2.71.",

keywords = "Evolutionary algorithms, Probability- generating functions, Quasirandomness, Variable drift",

author = "Benjamin Doerr and Mahmoud Fouz and Carsten Witt",

year = "2011",

month = aug,

day = "24",

doi = "10.1145/2001576.2001856",

language = "English",

isbn = "9781450305570",

series = "Genetic and Evolutionary Computation Conference, GECCO'11",

pages = "2083--2090",

booktitle = "Genetic and Evolutionary Computation Conference, GECCO'11",

note = "13th Annual Genetic and Evolutionary Computation Conference, GECCO'11 ; Conference date: 12-07-2011 Through 16-07-2011",

}

Doerr, B, Fouz, M & Witt, C 2011, Sharp bounds by probability-generating functions and variable drift. in Genetic and Evolutionary Computation Conference, GECCO'11. Genetic and Evolutionary Computation Conference, GECCO'11, pp. 2083-2090, 13th Annual Genetic and Evolutionary Computation Conference, GECCO'11, Dublin, Ireland, 12/07/11. https://doi.org/10.1145/2001576.2001856

TY - GEN

T1 - Sharp bounds by probability-generating functions and variable drift

AU - Doerr, Benjamin

AU - Fouz, Mahmoud

AU - Witt, Carsten

PY - 2011/8/24

Y1 - 2011/8/24

N2 - We introduce to the runtime analysis of evolutionary algorithms two powerful techniques: probability-generating functions and variable drift analysis. They are shown to provide a clean framework for proving sharp upper and lower bounds. As an application, we improve the results by Doerr et al. (GECCO 2010) in several respects. First, the upper bound on the expected running time of the most successful quasirandom evolutionary algorithm for the OneMax function is improved from 1.28nln n to 0.982nlnn, which breaks the barrier of nln n posed by coupon-collector processes. Compared to the classical (1+1) EA, whose runtime will for the first time be analyzed with respect to terms of lower order, this represents a speedup by more than a factor of e = 2.71.

AB - We introduce to the runtime analysis of evolutionary algorithms two powerful techniques: probability-generating functions and variable drift analysis. They are shown to provide a clean framework for proving sharp upper and lower bounds. As an application, we improve the results by Doerr et al. (GECCO 2010) in several respects. First, the upper bound on the expected running time of the most successful quasirandom evolutionary algorithm for the OneMax function is improved from 1.28nln n to 0.982nlnn, which breaks the barrier of nln n posed by coupon-collector processes. Compared to the classical (1+1) EA, whose runtime will for the first time be analyzed with respect to terms of lower order, this represents a speedup by more than a factor of e = 2.71.

KW - Evolutionary algorithms

KW - Probability- generating functions

KW - Quasirandomness

KW - Variable drift

U2 - 10.1145/2001576.2001856

DO - 10.1145/2001576.2001856

M3 - Conference contribution

AN - SCOPUS:84860389742

SN - 9781450305570

T3 - Genetic and Evolutionary Computation Conference, GECCO'11

SP - 2083

EP - 2090

BT - Genetic and Evolutionary Computation Conference, GECCO'11

T2 - 13th Annual Genetic and Evolutionary Computation Conference, GECCO'11

Y2 - 12 July 2011 through 16 July 2011

ER -

Sharp bounds by probability-generating functions and variable drift

Abstract

Publication series

Conference

Keywords

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