On groups and simplicial complexes
Abstract
The theory of -regular graphs is closely related to group theory. Every -regular, bipartite graph is a Schreier graph with respect to some group , a set of generators (depending only on ) and a subgroup . The goal of this paper is to begin to develop such a framework for -regular simplicial complexes of general dimension . Our approach does not directly generalize the concept of a Schreier graph, but still presents an extensive family of -regular simplicial complexes as quotients of one universal object: the -regular -dimensional arboreal complex, which is itself a simplicial complex originating in one specific group depending only on and . Along the way we answer a question from [PR12] on the spectral gap of higher dimensional Laplacians and prove a high dimensional analogue of Leighton's graph covering theorem. This approach also suggests a random model for -regular -dimensional multicomplexes.
Cite
@article{arxiv.1607.07734,
title = {On groups and simplicial complexes},
author = {Alexander Lubotzky and Zur Luria and Ron Rosenthal},
journal= {arXiv preprint arXiv:1607.07734},
year = {2016}
}
Comments
40 pages, 7 figures