The reverse order law revisited

Some mixed-type reverse-order laws of (AB) † have been proposed and studied by Tian. In this paper, by applying the extremal rank relations of generalized Schur complements and the P-SVD of two matrices A and B, we study two kind of mixed-type reverse-order laws for (AB) (13) , obtain necessary and

It is shown that, quite surprisingly, all matrices of the form L -M -, where L -and M - denote generalized inverses of L and M, are generalized inverses of ML if and only if the product MLL -M -ML is invariant with respect to the choice of L -and M -, which at the first glance looks to be a weaker c

In this paper, we offer purely algebraic necessary and sufficient conditions for reverse order laws for generalized inverses in C\*algebras, extending rank conditions for matrices and range conditions for Hilbert space operators.

In this paper, we offer new necessary and sufficient conditions for the reverse order laws to hold for the weighted generalized inverses of matrices.