English

Explicit Two-Sided Vertex Expanders Beyond the Spectral Barrier

Combinatorics 2024-11-19 v1 Computational Complexity Discrete Mathematics Data Structures and Algorithms

Abstract

We construct the first explicit two-sided vertex expanders that bypass the spectral barrier. Previously, the strongest known explicit vertex expanders were given by dd-regular Ramanujan graphs, whose spectral properties imply that every small subset of vertices SS has at least 0.5dS0.5d|S| distinct neighbors. However, it is possible to construct Ramanujan graphs containing a small set SS with no more than 0.5dS0.5d|S| neighbors. In fact, no explicit construction was known to break the 0.5d0.5 d-barrier. In this work, we give an explicit construction of an infinite family of dd-regular graphs (for large enough dd) where every small set expands by a factor of 0.6d\approx 0.6d. More generally, for large enough d1,d2d_1,d_2, we give an infinite family of (d1,d2)(d_1,d_2)-biregular graphs where small sets on the left expand by a factor of 0.6d1\approx 0.6d_1, and small sets on the right expand by a factor of 0.6d2\approx 0.6d_2. In fact, our construction satisfies an even stronger property: small sets on the left and right have unique-neighbor expansion 0.6d10.6d_1 and 0.6d20.6d_2 respectively. Our construction follows the tripartite line product framework of Hsieh, McKenzie, Mohanty & Paredes, and instantiates it using the face-vertex incidence of the 44-dimensional Ramanujan clique complex as its base component. As a key part of our analysis, we derive new bounds on the triangle density of small sets in the Ramanujan clique complex.

Keywords

Cite

@article{arxiv.2411.11627,
  title  = {Explicit Two-Sided Vertex Expanders Beyond the Spectral Barrier},
  author = {Jun-Ting Hsieh and Ting-Chun Lin and Sidhanth Mohanty and Ryan O'Donnell and Rachel Yun Zhang},
  journal= {arXiv preprint arXiv:2411.11627},
  year   = {2024}
}

Comments

28 pages

R2 v1 2026-06-28T20:03:37.630Z