The Jacobi matrices approach to Nevanlinna-Pick problems

Abstract

A modification of the well-known step-by-step process for solving Nevanlinna-Pick problems in the class of 0-functions gives rise to a linear pencil H-λ J, where H and J are Hermitian tridiagonal matrices. First, we show that J is a positive operator. Then it is proved that the corresponding Nevanlinna-Pick problem has a unique solution iff the densely defined symmetric operator J-1/2HJ-1/2 is self-adjoint and some criteria for this operator to be self-adjoint are presented. Finally, by means of the operator technique, we obtain that multipoint diagonal Pad\'e approximants to a unique solution of the Nevanlinna-Pick problem converge to locally uniformly in . The proposed scheme extends the classical Jacobi matrix approach to moment problems and Pad\'e approximation for 0-functions.