English

Sparse expanders have negative curvature

Probability 2021-02-02 v2 Discrete Mathematics Combinatorics Functional Analysis

Abstract

We prove that bounded-degree expanders with non-negative Ollivier-Ricci curvature do not exist, thereby solving a long-standing open problem suggested by Naor and Milman and publicized by Ollivier (2010). In fact, this remains true even if we allow for a vanishing proportion of large degrees, large eigenvalues, and negatively-curved edges. To establish this, we work directly at the level of Benjamini-Schramm limits, and exploit the entropic characterization of the Liouville property on stationary random graphs to show that non-negative curvature and spectral expansion are incompatible "at infinity". We then transfer this result to finite graphs via local weak convergence. The same approach also applies to the Bacry-Emery curvature condition CD(0,)(0,\infty), thereby settling a recent conjecture of Cushing, Liu and Peyerimhoff (2019).

Cite

@article{arxiv.2101.08242,
  title  = {Sparse expanders have negative curvature},
  author = {Justin Salez},
  journal= {arXiv preprint arXiv:2101.08242},
  year   = {2021}
}

Comments

Minor improvements. As pointed out by Cushing, Liu and M\"unch, the same method applies to the Bacry-Emery curvature, thereby settling a recent conjecture of Cushing, Liu and Peyerimhoff. Title changed accordingly

R2 v1 2026-06-23T22:21:41.443Z