Log-Linear Convergence and Optimal Bounds for the (1+1)-ES

机译：log-linear收敛和（1 + 1）-es的最佳边界

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The (1+1)-ES is modeled by a general stochastic process whose asymptotic behavior is investigated. Under general assumptions, it is shown that the convergence of the related algorithm is sub-log-linear, bounded below by an explicit log-linear rate. For the specific case of spherical functions and scale-invariant algorithm, it is proved using the Law of Large Numbers for orthogonal variables, that the linear convergence holds almost surely and that the best convergence rate is reached. Experimental simulations illustrate the theoretical results.

机译：（1 + 1）-ES由渐近行为的一般随机过程进行建模。在一般的假设下，显示相关算法的收敛是子对数线性的，下面通过显式的对数线速率界定。对于球面功能和尺度不变算法的具体情况，使用大量变量的规律证明了线性收敛几乎肯定并且达到了最佳收敛速率。实验模拟说明了理论结果。

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《International Conference Evolution Artificielle》|2008年||共12页
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Mohamed Jebalia; Anne Auger; Pierre Liardet;
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中图分类 TP3-53;
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机译：对数线性收敛和（1 + 1）-Es的最佳边界

Log-Linear Convergence and Optimal Bounds for the (1+1)-ES

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