Completing a symmetric 2 × 2 block matrix and its inverse

In 1979, Campbell and Meyer proposed the problem of finding a formula for the Drazin inverse of a 2 × 2 matrix M = A B C D in terms of its various blocks, where the blocks A and D are required to be square matrices. Special cases of the problems have been studied. In particular, a representation of

In this paper, we establish a basic representation and a representation theorem for the outer inverse A (2) T ,S of a matrix A, which is the matrix X satisfying XAX = X, R(X) = T and N(X) = S. We develop several specific representations and iterative methods for A (2) T ,S . We show that this rep

This paper presents an explicit expression for the generalized inverse A!$. Based on this, we established the characterization, the representation theorem and the limiting process for A(Ti. As an application, we estimate the error bound of the iterative method for approximating AFL.