English

From Grassmannian to Simplicial High-Dimensional Expanders

Combinatorics 2023-12-27 v2 Discrete Mathematics

Abstract

In this paper, we present a new construction of simplicial complexes of subpolynomial degree with arbitrarily good local spectral expansion. Previously, the only known high-dimensional expanders (HDXs) with arbitrarily good expansion and less than polynomial degree were based on one of two constructions, namely Ramanujan complexes and coset complexes. In contrast, our construction is a Cayley complex over the group F2k\mathbb{F}_2^k, with Cayley generating set given by a Grassmannian HDX. Our construction is in part motivated by a coding-theoretic interpretation of Grassmannian HDXs that we present, which provides a formal connection between Grassmannian HDXs, simplicial HDXs, and LDPC codes. We apply this interpretation to prove a general characterization of the 1-homology groups over F2\mathbb{F}_2 of Cayley simplicial complexes over F2k\mathbb{F}_2^k. Using this result, we construct simplicial complexes on NN vertices with arbitrarily good local expansion for which the dimension of the 1-homology group grows as Ω(log2N)\Omega(\log^2N). No prior constructions in the literature have been shown to achieve as large a 1-homology group.

Keywords

Cite

@article{arxiv.2305.02512,
  title  = {From Grassmannian to Simplicial High-Dimensional Expanders},
  author = {Louis Golowich},
  journal= {arXiv preprint arXiv:2305.02512},
  year   = {2023}
}

Comments

Edits to improve exposition, added references

R2 v1 2026-06-28T10:25:12.379Z