From word-representable graphs to altered Tverberg-type theorems
Abstract
Tverberg's theorem says that a set with sufficiently many points in can always be partitioned into parts so that the -simplex is the (nerve) intersection pattern of the convex hulls of the parts. In arXiv:1808.00551v1 [math.MG] the authors investigate how other simplicial complexes arise as nerve complexes once we have a set with sufficiently many points. In this paper we relate the theory of word-representable graphs as a way of codifying -skeletons of simplicial complexes to generate nerves. In particular, we show that every -word-representable triangle-free graph, every circle graph, every outerplanar graph, and every bipartite graph could be induced as a nerve complex once we have a set with sufficiently many points in for some .
Keywords
Cite
@article{arxiv.2111.10038,
title = {From word-representable graphs to altered Tverberg-type theorems},
author = {Deborah Oliveros and Antonio Torres},
journal= {arXiv preprint arXiv:2111.10038},
year = {2021}
}
Comments
13 pages, 4 figures