On the Positivity of a Class of Cauchy-Like Matrices

Abstract

Let 0<λ1<·s<λn. Motivated by a problem related to Lyapunov equations we consider a class of Cauchy-like matrices whose elements have the form Cij=ri(k,l)+rj(k,l)λi+λj, where for any pair 1 k,l n, ri(k,l) are functions of \λ1,·s,λn\ λi. We show that these matrices are positive semidefinite for every pair 1 k,l n. After passing to the reciprocal variables xi=1/λi, the problem is reduced by a diagonal congruence to the positivity of a two-parameter family An(p,q)(x). The proof introduces a singular augmented matrix Hn(p,q)(x), proves its singularity by Cauchy-kernel generating function identities, and then proves positive semidefiniteness by induction on n using the principal-minor criterion.