Sharp Thresholds for Factors in Random Graphs
Abstract
Let be a graph on vertices and let be a graph on vertices. Then an -factor in is a subgraph of composed of vertex-disjoint copies of , if divides . In other words, an -factor yields a partition of the vertices of . The study of such -factors in the Erd\H{o}s-R\'enyi random graph dates back to Erd\H{o}s himself. Decades later, in 2008, Johansson, Kahn and Vu established the thresholds for the existence of an -factor for strictly 1-balanced -- up to the leading constant. The sharp thresholds, meaning the leading constants, were obtained only recently by Riordan and Heckel, but only for complete graphs and for so-called nice graphs. Their results rely on sophisticated couplings that utilize the recent, celebrated solution of Shamir's problem by Kahn. We extend the couplings by Riordan and Heckel to any strictly 1-balanced and thereby obtain the sharp threshold for the existence of an -factor. In particular, we confirm the thirty year old conjecture by Ruc\'inski that this sharp threshold indeed coincides with the sharp threshold for the disappearance of the last vertices which are not contained in a copy of .
Keywords
Cite
@article{arxiv.2411.14138,
title = {Sharp Thresholds for Factors in Random Graphs},
author = {Fabian Burghart and Annika Heckel and Marc Kaufmann and Noela Müller and Matija Pasch},
journal= {arXiv preprint arXiv:2411.14138},
year = {2025}
}
Comments
18 pages, 1 figure