Resilience of ranks of higher inclusion matrices

Abstract

Let n ≥ r ≥ s ≥ 0 be integers and F a family of r-subsets of [n]. Let Wr,sF be the higher inclusion matrix of the subsets in F vs. the s-subsets of [n]. When F consists of all r-subsets of [n], we shall simply write Wr,s in place of Wr,sF. In this paper we prove that the rank of the higher inclusion matrix Wr,s over an arbitrary field K is resilient. That is, if the size of F is "close" to n r then rankK(Wr,sF) = rankK(Wr,s), where K is an arbitrary field. Furthermore, we prove that the rank (over a field K) of the higher inclusion matrix of r-subspaces vs. s-subspaces of an n-dimensional vector space over Fq is also resilient if char(K) is coprime to q.