The probability of spanning a classical space by two non-degenerate subspaces of complementary dimension

Abstract

Let n,n' be positive integers and let V be an (n+n')-dimensional vector space over a finite field F equipped with a non-degenerate alternating, hermitian or quadratic form. We estimate the proportion of pairs (U, U'), where U is a non-degenerate n-subspace and U' is a non-degenerate n'-subspace of V, such that U+ U'=V (usually such spaces U and U' are not perpendicular). The proportion is shown to be at least 1-c/|F| for some constant c≤slant 2 in the symplectic or unitary cases, and c<3 in the orthogonal case.