Bivariate empirical and n-variate Archimedean copulas in estimation of distribution algorithms

Author

Cuesta-Infante, Alfredo ; Santana, Roberto ; Hidalgo, J. Ignacio ; Bielza, Concha ; Larrañaga, Pedro

Author_Institution

Felipe II Coll., Univ. Complutense de Madrid, Aranjuez, Spain

fYear

2010

fDate

18-23 July 2010

Firstpage

1

Lastpage

8

Abstract

This paper investigates the use of empirical and Archimedean copulas as probabilistic models of continuous estimation of distribution algorithms (EDAs). A method for learning and sampling empirical bivariate copulas to be used in the context of n-dimensional EDAs is first introduced. Then, by using Archimedean copulas instead of empirical makes possible to construct n-dimensional copulas with the same purpose. Both copula-based EDAs are compared to other known continuous EDAs on a set of 24 functions and different number of variables. Experimental results show that the proposed copula-based EDAs achieve a better behaviour than previous approaches in a 20% of the benchmark functions.

Keywords

distributed algorithms; estimation theory; evolutionary computation; probability; continuous estimation; distribution algorithm; empirical bivariate copula; learning; n-dimensional copula; n-variate Archimedean copula; probabilistic model; Accuracy; Benchmark testing; Distribution functions; Gaussian distribution; Joints; Probabilistic logic; Random variables;

fLanguage

English

Publisher

ieee

Conference_Titel

Evolutionary Computation (CEC), 2010 IEEE Congress on

Conference_Location

Barcelona

Print_ISBN

978-1-4244-6909-3

Type

conf

DOI

10.1109/CEC.2010.5586557

Filename

5586557