A new class of orthogonal polynomials

Abstract

We consider random walk polynomial sequences (Pn(x))n∈N0⊂eqR[x] given by recurrence relations of the form P0(x)=1, P1(x)=x and x Pn(x)=an Pn+1(x)+cn Pn-1(x)\;(n∈N), where an and cn are positive and sum up to 1. (Pn(x))n∈N0 is said to satisfy nonnegative linearization of products if the product of any two polynomials Pm(x), Pn(x) is a convex combination of P|m-n|(x),…,Pm+n(x). This property gives rise to a hypergroup structure and a sophisticated harmonic analysis. We are interested in examples such that both the original sequence (Pn(x))n∈N0 and the sequence (Pn(x))n∈N0 which corresponds to switched roles of (an)n∈N and (cn)n∈N satisfy nonnegative linearization of products. Such considerations were recently started by Lasser and Obermaier and can be motivated from a harmonic analytic, combinatorial or probabilistic point of view. However, Lasser and Obermaier left open the question whether examples besides the trivial example of the Chebyshev polynomials of the first kind (Tn(x))n∈N0 (with an cn1/2) actually exist. We provide a sufficient criterion and explicitly construct such nontrivial examples. Moreover, we provide characterizations of (Tn(x))n∈N0 by additionally involving properties of the duals and Haar measures. Our criterion also enables us to solve open problems concerning the Haar measure of polynomial hypergroups stated by Kahler and Szwarc.

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