English

Relative Leray numbers via spectral sequences

Combinatorics 2021-02-23 v2

Abstract

Let F\mathbb{F} be a fixed field and let XX be a simplicial complex on the vertex set VV. The Leray number L(X;F)L(X;\mathbb{F}) is the minimal dd such that for all idi \geq d and SVS \subset V, the induced complex X[S]X[S] satisfies H~i(X[S];F)=0\tilde{H}_i(X[S];\mathbb{F})=0. Leray numbers play a role in formulating and proving topological Helly type theorems. For two complexes X,YX,Y on the same vertex set VV, define the relative Leray number LY(X;F)L_Y(X;\mathbb{F}) as the minimal dd such that H~i(X[Vσ];F)=0\tilde{H}_i(X[V \setminus \sigma];\mathbb{F})=0 for all idi \geq d and σY\sigma \in Y. In this paper we extend the topological colorful Helly theorem to the relative setting. Our main tool is a spectral sequence for the intersection of complexes indexed by a geometric lattice.

Cite

@article{arxiv.2002.06630,
  title  = {Relative Leray numbers via spectral sequences},
  author = {Gil Kalai and Roy Meshulam},
  journal= {arXiv preprint arXiv:2002.06630},
  year   = {2021}
}

Comments

7 pages

R2 v1 2026-06-23T13:43:13.442Z