English

Fixation times on directed graphs

Populations and Evolution 2025-09-18 v2

Abstract

Computing the rate of evolution in spatially structured populations is difficult. A key quantity is the fixation time of a single mutant with relative reproduction rate rr which invades a population of residents. We say that the fixation time is "fast" if it is at most a polynomial function in terms of the population size NN. Here we study fixation times of advantageous mutants (r>1r>1) and neutral mutants (r=1r=1) on directed graphs, which are those graphs that have at least some one-way connections. We obtain three main results. First, we prove that for any directed graph the fixation time is fast, provided that rr is sufficiently large. Second, we construct an efficient algorithm that gives an upper bound for the fixation time for any graph and any r1r\ge 1. Third, we identify a broad class of directed graphs with fast fixation times for any r1r\ge 1. This class includes previously studied amplifiers of selection, such as Superstars and Metafunnels. We also show that on some graphs the fixation time is not a monotonically declining function of rr; in particular, neutral fixation can occur faster than fixation for small selective advantages.

Keywords

Cite

@article{arxiv.2308.02762,
  title  = {Fixation times on directed graphs},
  author = {David A. Brewster and Martin A. Nowak and Josef Tkadlec},
  journal= {arXiv preprint arXiv:2308.02762},
  year   = {2025}
}

Comments

22 pages, 5 figures

R2 v1 2026-06-28T11:48:43.355Z