Affine subspace of matrices with constant rank

Abstract

For every m,n ∈ N and every field K, let M(m × n, K) be the vector space of the (m × n)-matrices over K and let S(n,K) be the vector space of the symmetric (n × n)-matrices over K. We say that an affine subspace S of M(m × n, K) or of S(n,K) has constant rank r if every matrix of S has rank r. Define AK(m × n; r)= \ S \;| \; S \; affine subsapce of M(m × n, K) of constant rank r\ AsymK(n;r)= \ S \;| \; S \; affine subsapce of S(n,K) of constant rank r\ aK(m × n;r) = \ S S ∈ AK(m × n; r ) \. asymK(n;r) = \ S S ∈ AsymK(n,r) \. In this paper we prove the following two formulas for r ≤ m ≤ n: asymR(n;r) ≤ r2 (n- r2 ) aR(m × n;r) = r(n-r)+ r(r-1)2 .