Fixed-Parameter Tractability of the (1+1) Evolutionary Algorithm on Random Planted Vertex Covers
Neural and Evolutionary Computing
2024-09-17 v1
Abstract
We present the first parameterized analysis of a standard (1+1) Evolutionary Algorithm on a distribution of vertex cover problems. We show that if the planted cover is at most logarithmic, restarting the (1+1) EA every steps will find a cover at least as small as the planted cover in polynomial time for sufficiently dense random graphs . For superlogarithmic planted covers, we prove that the (1+1) EA finds a solution in fixed-parameter tractable time in expectation. We complement these theoretical investigations with a number of computational experiments that highlight the interplay between planted cover size, graph density and runtime.
Cite
@article{arxiv.2409.10144,
title = {Fixed-Parameter Tractability of the (1+1) Evolutionary Algorithm on Random Planted Vertex Covers},
author = {Jack Kearney and Frank Neumann and Andrew M. Sutton},
journal= {arXiv preprint arXiv:2409.10144},
year = {2024}
}