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Minimization over randomly selected lines
Author(s) -
İsmet Şahin
Publication year - 2013
Publication title -
an international journal of optimization and control theories and applications (ijocta)
Language(s) - English
Resource type - Journals
eISSN - 2146-5703
pISSN - 2146-0957
DOI - 10.11121/ijocta.01.2013.00167
Subject(s) - crossover , maxima and minima , mathematical optimization , particle swarm optimization , mutation , population , mathematics , operator (biology) , differential evolution , evolutionary algorithm , function (biology) , minification , algorithm , computer science , artificial intelligence , mathematical analysis , gene , chemistry , sociology , demography , evolutionary biology , biochemistry , repressor , biology , transcription factor
This paper presents a population-based evolutionary optimization method for minimizing a given cost function. The mutation operator of this method selects randomly oriented lines in the cost function domain, constructs quadratic functions interpolating the cost function at three different points over each line, and uses extrema of the quadratics as mutated points. The crossover operator modifies each mutated point based on components of two points in population, instead of one point as is usually performed in other evolutionary algorithms. The stopping criterion of this method depends on the number of almost degenerate quadratics. We demonstrate that the proposed method with these mutation and crossover operations achieves faster and more robust convergence than the well-known Differential Evolution and Particle Swarm algorithms.

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