Chain sequences and Zeros of a perturbed RII type recurrence relation

Abstract

In this manuscript, new algebraic and analytic aspects of the orthogonal polynomials satisfying RII type recurrence relation given by align* Pn+1(x) = (x-cn)Pn(x)-λn (x-an)(x-bn)Pn-1(x), n ≥ 0, align* where λn is a positive chain sequence and an, bn, cn are sequences of real or complex numbers with P-1(x) = 0 and P0(x) = 1 are investigated when the recurrence coefficients are perturbed. Specifically, representation of new perturbed polynomials (co-polynomials of RII type) in terms of original ones with the interlacing and monotonicity properties of zeros are given. For finite perturbations, a transfer matrix approach is used to obtain new structural relations. Effect of co-dilation in the corresponding chain sequences and their consequences onto the unit circle are analysed. A particular perturbation in the corresponding chain sequence called complementary chain sequences and its effect on the corresponding Verblunsky coefficients is also studied.