Solutions of the matrix inequalities BXB* <=- A in the minus partial ordering and BXB* <=L A in the Löwner partial ordering

Abstract

Two matrices A and B of the same size are said to satisfy the minus partial ordering, denoted by B≤slant-A, iff the rank subtractivity equality rank(\, A - B\,) = rank(A) - rank(B) holds; two complex Hermitian matrices A and B of the same size are said to satisfy the Löwner partial ordering, denoted by B≤slant L A, iff the difference A - B is nonnegative definite. In this note, we establish general solution of the inequality BXB* ≤slant-A induced from the minus partial ordering, and general solution of the inequality BXB* ≤slant L A induced from the Löwner partial ordering, respectively, where (·)* denotes the conjugate transpose of a complex matrix. As consequences, we give closed-form expressions for the shorted matrices of A relative to the range of B in the minus and Löwner partial orderings, respectively, and show that these two types of shorted matrices in fact are the same.