English

Extremal problems on shadows and hypercuts in simplicial complexes

Combinatorics 2015-11-13 v3

Abstract

Let FF be an nn-vertex forest. We say that an edge eFe\notin F is in the shadow of FF if F{e}F\cup\{e\} contains a cycle. It is easy to see that if FF is "almost a tree", that is, it has n2n-2 edges, then at least n24\lfloor\frac{n^2}{4}\rfloor edges are in its shadow and this is tight. Equivalently, the largest number of edges an nn-vertex cut can have is n24\lfloor\frac{n^2}{4}\rfloor. These notions have natural analogs in higher dd-dimensional simplicial complexes, graphs being the case d=1d=1. The results in dimension d>1d>1 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 d=2d=2. We construct 22-dimensional "Q\mathbb Q-almost-hypertrees" (defined below) with an empty shadow. We also show that the shadow of an "F2\mathbb F_2-almost-hypertree" cannot be empty, and its least possible density is Θ(1n)\Theta(\frac{1}{n}). In addition we construct very large hyperforests with a shadow that is empty over every field. For d4d\ge 4 even, we construct dd-dimensional F2\mathbb{F} _2-almost-hypertree whose shadow has density on(1)o_n(1). 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}
}
R2 v1 2026-06-22T05:19:39.197Z