Extreme zeros in a sequence of para-orthogonal polynomials and bounds for the support of the measure

Abstract

Given a non-trivial Borel measure μ on the unit circle T, the corresponding reproducing (or Christoffel-Darboux) kernels with one of the variables fixed at z=1 constitute a family of so-called para-orthogonal polynomials, whose zeros belong to T. With a proper normalization they satisfy a three-term recurrence relation determined by two sequence of real coefficients, \cn\ and \dn\, where \dn\ is additionally a positive chain sequence. Coefficients (cn,dn) provide a parametrization of a family of measures related to μ by addition of a mass point at z=1. In this paper we estimate the location of the extreme zeros (those closest to z=1) of the para-orthogonal polynomials from the (cn,dn)-parametrization of the measure, and use this information to establish sufficient conditions for the existence of a gap in the support of μ at z=1. These results are easily reformulated in order to find gaps in the support of μ at any other z∈ T. We provide also some examples showing that the bounds are tight and illustrating their computational applications.