Expansions and Characterizations of Sieved Random Walk Polynomials

Abstract

We consider random walk polynomial sequences (Pn(x))n∈N0⊂eqR[x] given by recurrence relations P0(x)=1, P1(x)=x, x Pn(x)=(1-cn)Pn+1(x)+cn Pn-1(x), n∈N with (cn)n∈N⊂eq(0,1). For every k∈N, the k-sieved polynomials (Pn(x;k))n∈N0 arise from the recurrence coefficients c(n;k):=cn/k if k|n and c(n;k):=1/2 otherwise. A main objective of this paper is to study expansions in the Chebyshev basis \Tn(x) n∈N0\. As an application, we obtain explicit expansions for the sieved ultraspherical polynomials. Moreover, we introduce and study a sieved version Dk of the Askey-Wilson operator Dq. It is motivated by the sieved ultraspherical polynomials, a generalization of the classical derivative and obtained from Dq by letting q approach a k-th root of unity. However, for k≥2 the new operator Dk on R[x] has an infinite-dimensional kernel (in contrast to its ancestor), which leads to additional degrees of freedom and characterization results for k-sieved random walk polynomials. Similar characterizations are obtained for a sieved averaging operator Ak.