All Mutation Rates c/n for the (1+1) Evolutionary Algorithm
Abstract
For every real number c ≥ 1 and for all > 0, there is a fitness function f : \0,1\n R for which the optimal mutation rate for the (1+1) evolutionary algorithm on f, denoted pn, satisfies pn ≈ c/n in that |npn - c| < . In other words, the set of all c ≥ 1 for which the mutation rate c/n is optimal for the (1+1) EA is dense in the interval [1, ∞). To show this, a fitness function is introduced which is called HillPathJump.
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