RII type recurrence, generalized eigenvalue problem and orthogonal polynomials on the unit circle

Abstract

We consider a sequence of polynomials \Pn\n ≥ 0 satisfying a special RII type recurrence relation where the zeros of Pn are simple and lie on the real line. It turns out that the polynomial Pn, for any n ≥ 2, is the characteristic polynomial of a simple n × n generalized eigenvalue problem. It is shown that with this RII type recurrence relation one can always associate a positive measure on the unit circle. The orthogonality property satisfied by Pn with respect to this measure is also obtained. Finally, examples are given to justify the results.