On the effect of selection in genetic algorithms

Random Struct. Algorithms Pub Date : 2001-03-01 DOI:10.1002/1098-2418(200103)18:2%3C185::AID-RSA1005%3E3.0.CO;2-7

C. Mazza, Didier Piau

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引用次数: 10

Abstract

To study the effect of selection with respect to mutation and mating in genetic algorithms, we consider two simplified examples in the infinite population limit. Both algorithms are modeled as measure valued dynamical systems and are designed to maximize a linear fitness on the half line. Thus, they both trivially converge to infinity. We compute the rate of their growth and we show that, in both cases, selection is able to overcome a tendency to converge to zero. The first model is a mutation-selection algorithm on the integer half line, which generates mutations along a simple random walk. We prove that the system goes to infinity at a positive speed, even in cases where the random walk itself is ergodic. This holds in several strong senses, since we show a.s. convergence, Lp convergence, convergence in distribution, and a large deviations principle for the sequence of measures. For the second model, we introduce a new class of matings, based upon Mandelbrot martingales. The mean fitness of the associated mating-selection algorithms on the real half line grows exponentially fast, even in cases where the Mandelbrot martingale itself converges to zero. © 2001 John Wiley & Sons, Inc. Random Struct. Alg., 18: 185–200, 2001

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遗传算法中选择的影响

为了研究遗传算法中选择对突变和交配的影响，我们考虑了无限种群极限下的两个简化例子。这两种算法都被建模为测量值动力系统，并被设计为最大化半线上的线性适应度。因此，它们都平凡地收敛于无穷。我们计算了它们的增长率，并表明，在这两种情况下，选择都能够克服收敛于零的趋势。第一个模型是整数半线上的突变选择算法，它沿着简单的随机漫步生成突变。我们证明了系统以正的速度走向无穷，即使在随机漫步本身是遍历的情况下也是如此。这在几个强烈的意义上是成立的，因为我们展示了as收敛、Lp收敛、分布收敛和测量序列的大偏差原理。对于第二个模型，我们引入了一类新的基于Mandelbrot鞅的配对。相关的配对选择算法在实半线上的平均适应度呈指数级增长，即使在Mandelbrot鞅本身收敛于零的情况下也是如此。©2001 John Wiley & Sons, Inc随机结构。Alg。中文信息学报，18:185 - 200,2001

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Random Struct. Algorithms

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