High dimensional expansion using zig-zag product
Abstract
We wish to renew the discussion over recent combinatorial structures that are 3-uniform hypergraph expanders, viewing them in a more general perspective, shedding light on a previously unknown relation to the zig-zag product. We do so by introducing a new structure called triplet structure, that maintains the same local environment around each vertex. The structure is expected to yield, in some cases, a bounded family of hypergraph expanders whose 2-dimensional random walk converges. We have applied the results obtained here to several known constructions, obtaining a better expansion rate than previously known. Namely, we did so in the case of Conlon's construction and the construction by Chapman, Linal and Peled.
Keywords
Cite
@article{arxiv.2001.08829,
title = {High dimensional expansion using zig-zag product},
author = {Eyal Karni and Tali Kaufman},
journal= {arXiv preprint arXiv:2001.08829},
year = {2020}
}
Comments
19 Pages. Some of the results(Conlon's case) were presented in HUJI Combinatorics seminar on June 10th, 2019