English

Mixed updating in structured populations

Populations and Evolution 2026-04-01 v2

Abstract

Evolutionary graph theory (EGT) studies the effect of population structure on evolutionary dynamics. The vertices of the graph represent the NN individuals. The edges denote interactions for competitive replacement. Two standard update rules are death-Birth (dB) and Birth-death (Bd). Under dB, an individual is chosen uniformly at random to die, and its neighbors compete to fill the vacancy proportional to their fitness. Under Bd, an individual is chosen for reproduction proportional to fitness, and its offspring replaces a randomly chosen neighbor. Here we study mixed updating between those two scenarios. In each time step, with probability δ\delta the update is dB and with remaining probability it is Bd. We study fixation probabilities and times as functions of δ\delta under neutral evolution and constant selection. Despite the fact that fixation probabilities and times can be increasing, decreasing, or non-monotonic in δ\delta, we prove nearly all unweighted undirected graphs have short fixation times and provide an efficient algorithm to estimate their fixation probabilities. Finally, we prove exact formulas for fixation probabilities on cycles, stars, and more complex structures and classify their sensitivities to δ\delta.

Keywords

Cite

@article{arxiv.2512.11164,
  title  = {Mixed updating in structured populations},
  author = {David A. Brewster and Yichen Huang and Michael Mitzenmacher and Martin A. Nowak},
  journal= {arXiv preprint arXiv:2512.11164},
  year   = {2026}
}

Comments

35 pages, 7 figures. Clearer presentation. This article is a distinct manuscript by the same authors and differs in content from the conference version, available as arXiv:2511.18252. Compared to arXiv:2511.18252 (ITCS '26), we focused on different quantities, changed much of the wording, added new results for weighted and directed graphs, proved sensitivity results, and incorporated 7 figures

R2 v1 2026-07-01T08:21:32.562Z