A cross-intersection theorem for vector spaces based on semidefinite programming

Abstract

Let F and G be families of k- and -dimensional subspaces, respectively, of a given n-dimensional vector space over a finite field Fq. Suppose that x y 0 for all x ∈ F and y ∈ G. By explicitly constructing optimal feasible solutions to a semidefinite programming problem which is akin to Lov\'asz's theta function, we show that |F| |G| ≤ n-1 k-1 n-1 -1, provided that n ≥ 2k and n ≥ 2. The characterization of the extremal families is also established.