Improved Product-Based High-Dimensional Expanders
Abstract
High-dimensional expanders generalize the notion of expander graphs to higher-dimensional simplicial complexes. In contrast to expander graphs, only a handful of high-dimensional expander constructions have been proposed, and no elementary combinatorial construction with near-optimal expansion is known. In this paper, we introduce an improved combinatorial high-dimensional expander construction, by modifying a previous construction of Liu, Mohanty, and Yang (ITCS 2020), which is based on a high-dimensional variant of a tensor product. Our construction achieves a spectral gap of for random walks on the -dimensional faces, which is only quadratically worse than the optimal bound of . Previous combinatorial constructions, including that of Liu, Mohanty, and Yang, only achieved a spectral gap that is exponentially small in . We also present reasoning that suggests our construction is optimal among similar product-based constructions.
Keywords
Cite
@article{arxiv.2105.09358,
title = {Improved Product-Based High-Dimensional Expanders},
author = {Louis Golowich},
journal= {arXiv preprint arXiv:2105.09358},
year = {2021}
}
Comments
17 pages; added references