s-almost t-intersecting families for vector spaces

Abstract

Let V be a finite dimensional vector space over a finite field, and F a family consisting of k-subspaces of V. The family F is called t-intersecting if (F1 F2)≥ t for any F1, F2∈ F. We say F is s-almost t-intersecting if for each F∈ F there are at most s members F of F such that (F F)<t. In this paper, we prove that s-almost t-intersecting families with maximum size are t-intersecting. We also consider s-almost t-intersecting families which are not t-intersecting, and characterize such families with maximum size for (s,t)≠(1,1). The result for 1-almost 1-intersecting families provided by Shan and Zhou is generalized.