Improved Runtime Bound for the (μ+ 1) EA on BinVal
Abstract
We study the (μ+1) EA on the Binary Value function BinVal. We show that it needs at most O(μ μ· n n) function evaluations to find the optimum when μ= o(n/ n). This substantially improves upon the recent upper bound of O(μ5 n (n/μ4)) by Krejca, Neumann and Witt. Our results hold for several mutation operators including standard bit mutation. In particular, our bound implies that the (μ+1) EA is at most a factor O( μ· n) slower on BinVal than on OneMax.
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