For every mutation rate p∈(0,1), and for all ε>0, there is a fitness function f:{0,1}n→R with a unique maximum for which the optimal mutation rate for the (1+1) evolutionary algorithm on f is in (p−ε,p+ε). In other words, the set of optimal mutation rates for the (1+1) EA is dense in the interval [0,1]. To show that, this paper introduces DistantSteppingStones, a fitness function which consists of large plateaus separated by large fitness valleys.
Cite
@article{arxiv.2602.18989,
title = {All Constant Mutation Rates for the $(1+1)$ Evolutionary Algorithm},
author = {Andrew James Kelley},
journal= {arXiv preprint arXiv:2602.18989},
year = {2026}
}