A note on generalized G-matrices (Q417485)

Let \(A\) be an \(m \times n\) matrix. An \(n \times m\) matrix \(B\) is called a \(g\)-inverse of \(A\) if it satisfies \(ABA=A\). An \(m \times n\) matrix \(A\) is called a generalized \(G\)-matrix (or \(GG\)-matrix) if there are nonsingular diagonal matrices \(D_1\) and \(D_2\) such that \(D_1A^TD_2\) is a \(g\)-inverse of \(A\). A matix \(C=[c_{ij}]\) is called a generalized Cauchy matrix, if the \(c_{ij}\) are in the form \(u_iv_j \over x_i+y_j\), where \(x_i, u_i, y_j, v_j\) are real numbers such that \(x_i + y_j \neq 0\) for all \(i\) and \(j\).NEWLINENEWLINEThe main result that the author obtains is that any generalized Cauchy matrix is a \(GG\)-matrix.