Normal operators with highly incompatible off-diagonal corners

Abstract

Let H be a complex, separable Hilbert space, and B(H) denote the set of all bounded linear operators on H. Given an orthogonal projection P ∈ B(H) and an operator D ∈ B(H), we may write D=bmatrix D1& D2 D3 & D4 bmatrix relative to the decomposition H = ran\, P ran\, (I-P). In this paper we study the question: for which non-negative integers j, k can we find a normal operator D and an orthogonal projection P such that rank\, D2 = j and rank\, D3 = k? Complete results are obtained in the case where dim\, H < ∞, and partial results are obtained in the infinite-dimensional setting.