Non-trivial t-intersecting families for the distance-regular graphs of bilinear forms

Abstract

Let V be an (n+)-dimensional vector space over a finite field, and W a fixed -dimensional subspace of V. Write V n,0 to be the set of all n-dimensional subspaces U of V satisfying (U W)=0. A family F⊂eqV n,0 is t-intersecting if (A B)≥ t for all A,B∈F. A t-intersecting family F⊂eqV n,0 is called non-trivial if (F∈FF)<t. In this paper, we describe the structure of non-trivial t-intersecting families of V n,0 with large size. In particular, we show the structure of the non-trivial t-intersecting families with maximum size, which extends the Hilton-Milner Theorem for V n,0.