Extremal problems on shadows and hypercuts in simplicial complexes
Abstract
Let be an -vertex forest. We say that an edge is in the shadow of if contains a cycle. It is easy to see that if is "almost a tree", that is, it has edges, then at least edges are in its shadow and this is tight. Equivalently, the largest number of edges an -vertex cut can have is . These notions have natural analogs in higher -dimensional simplicial complexes, graphs being the case . The results in dimension turn out to be remarkably different from the case in graphs. In particular the corresponding bounds depend on the underlying field of coefficients. We find the (tight) analogous theorems for . We construct -dimensional "-almost-hypertrees" (defined below) with an empty shadow. We also show that the shadow of an "-almost-hypertree" cannot be empty, and its least possible density is . In addition we construct very large hyperforests with a shadow that is empty over every field. For even, we construct -dimensional -almost-hypertree whose shadow has density . Finally, we mention several intriguing open questions.
Keywords
Cite
@article{arxiv.1408.0602,
title = {Extremal problems on shadows and hypercuts in simplicial complexes},
author = {Nati Linial and Ilan Newman and Yuval Peled and Yuri Rabinovich},
journal= {arXiv preprint arXiv:1408.0602},
year = {2015}
}