r-cross t-intersecting families for vector spaces

Abstract

Let V be an n-dimensional vector space over the finite field Fq, and V k denote the family of all k-dimensional subspaces of V. The families F1⊂eqV k1,F2⊂eqV k2,…,Fr⊂eqV kr are said to be r-cross t-intersecting if (F1 F2·s Fr)≥ t for all Fi∈Fi,\ 1≤ i≤ r. The r-cross t-intersecting families F1, F2,…,Fr are said to be non-trivial if (1≤ i≤ rF∈FiF)<t. In this paper, we first determine the structure of r-cross t-intersecting families with maximum product of their sizes. As a consequence, we partially prove one of Frankl and Tokushige's conjectures about r-cross 1-intersecting families for vector spaces. Then we describe the structure of non-trivial r-cross t-intersecting families F1, F2,…,Fr with maximum product of their sizes under the assumptions r=2 and F1=F2=·s=Fr=F, respectively, where the F in the latter assumption is well known as r-wise t-intersecting family. Meanwhile, stability results for non-trivial r-wise t-intersecting families are also been proved.