English

Tverberg type theorems for matroids

Combinatorics 2019-09-20 v2

Abstract

In this paper we show a variant of colorful Tverberg's theorem which is valid in any matroid: Let SS be a sequence of non-loops in a matroid MM of finite rank mm with closure operator cl. Suppose that SS is colored in such a way that the first color does not appear more than rr-times and each other color appears at most (r1)(r-1)-times. Then SS can be partitioned into rr rainbow subsequences S1,,SrS_1,\ldots, S_r such that clclS1clS2clSrcl\,\emptyset\subsetneq cl\,S_1\subseteq cl\, S_2\subseteq \ldots \subseteq cl\,S_r. In particular, i=1rclSi\emptyset\neq \bigcap_{i=1}^r cl\,S_i. A subsequence is called rainbow if it contains each color at most once. The conclusion of our theorem is weaker than the conclusion of the original Tverberg's theorem in Rd\mathbb R^d, which states that convSi\bigcap conv\,S_i\neq \emptyset, whereas we only claim that affSi\bigcap aff\,S_i\neq \emptyset. On the other hand, our theorem strengthens the Tverberg's theorem in several other ways: 1) it is applicable to any matroid (whereas Tverberg's theorem can only be used in Rd\mathbb R^d), 2) instead of clSi\bigcap cl\,S_i\neq \emptyset we have the stronger condition clclS1clS2clSrcl\,\emptyset\subsetneq cl\,S_1\subseteq cl\,S_2\subseteq \ldots \subseteq cl\,S_r, and 3) we add a color constraints that are even stronger than the color constraints in the colorful version of Tverberg's theorem. Recently, the author together with Goaoc, Mabillard, Pat\'akov\'a, Tancer and Wagner used the first property and applied the non-colorful version of this theorem to homology groups with GF(p)GF(p) coefficients to obtain several non-embeddability results, for details we refer to arXiv:1610.09063.

Keywords

Cite

@article{arxiv.1702.08170,
  title  = {Tverberg type theorems for matroids},
  author = {Pavel Paták},
  journal= {arXiv preprint arXiv:1702.08170},
  year   = {2019}
}
R2 v1 2026-06-22T18:29:06.088Z