English

Flattening rank and its combinatorial applications

Combinatorics 2021-03-05 v1

Abstract

Given a dd-dimensional tensor T:A1××AdFT:A_1\times\dots\times A_d\rightarrow \mathbb{F} (where F\mathbb{F} is a field), the ii-flattening rank of TT is the rank of the matrix whose rows are indexed by AiA_{i}, columns are indexed by Bi=A1××Ai1×Ai+1××AdB_{i}=A_1\times\dots\times A_{i-1}\times A_{i+1}\times\dots\times A_{d} and whose entries are given by the corresponding values of TT. The max-flattening rank of TT is defined as mfrank(T)=maxi[d]franki(T)\text{mfrank}(T)=\max_{i\in [d]}\text{frank}_{i}(T). A tensor T:AdFT:A^{d}\rightarrow\mathbb{F} is called semi-diagonal, if T(a,,a)0T(a,\dots,a)\neq 0 for every aAa\in A, and T(a1,,ad)=0T(a_{1},\dots,a_{d})=0 for every a1,,adAa_{1},\dots,a_{d}\in A that are all distinct. In this paper we prove that if T:AdFT:A^{d}\rightarrow\mathbb{F} is semi-diagonal, then mfrank(T)Ad1\text{mfrank}(T)\geq \frac{|A|}{d-1}, and this bound is the best possible. We give several applications of this result, including a generalization of the celebrated Frankl-Wilson theorem on forbidden intersections. Also, addressing a conjecture of Aharoni and Berger, we show that if the edges of an rr-uniform multi-hypergraph H\mathcal{H} are colored with zz colors such that each colorclass is a matching of size tt, then H\mathcal{H} contains a rainbow matching of size tt provided z>(t1)(rtr)z>(t-1)\binom{rt}{r}. This improves previous results of Alon and Glebov, Sudakov and Szab\'o.

Keywords

Cite

@article{arxiv.2103.03217,
  title  = {Flattening rank and its combinatorial applications},
  author = {David Munhá Correia and Benny Sudakov and István Tomon},
  journal= {arXiv preprint arXiv:2103.03217},
  year   = {2021}
}
R2 v1 2026-06-23T23:46:00.411Z