English

Homomorphisms from the torus

Combinatorics 2021-01-01 v2 Probability

Abstract

We present a detailed probabilistic and structural analysis of the set of weighted homomorphisms from the discrete torus Zmn\mathbb{Z}_m^n, where mm is even, to any fixed graph: we show that the corresponding probability distribution on such homomorphisms is close to a distribution defined constructively as a certain random perturbation of some dominant phase. This has several consequences, including solutions (in a strong form) to conjectures of Engbers and Galvin and a conjecture of Kahn and Park. Special cases include sharp asymptotics for the number of independent sets and the number of proper qq-colourings of Zmn\mathbb{Z}_m^n (so in particular, the discrete hypercube). We give further applications to the study of height functions and (generalised) rank functions on the discrete hypercube and disprove a conjecture of Kahn and Lawrenz. For the proof we combine methods from statistical physics, entropy and graph containers and exploit isoperimetric and algebraic properties of the torus.

Keywords

Cite

@article{arxiv.2009.08315,
  title  = {Homomorphisms from the torus},
  author = {Matthew Jenssen and Peter Keevash},
  journal= {arXiv preprint arXiv:2009.08315},
  year   = {2021}
}

Comments

84 pages. References added

R2 v1 2026-06-23T18:36:57.591Z