On linearly related sequences of difference derivatives of discrete orthogonal polynomials

Abstract

Let Dv the difference operator and q-difference operators defined by Dω p(x) = p(x+ω)-p(x)ω and Dq p(x) = p(qx)-p(x)(q-1)x, respectively. Let U and V be two moment regular linear functionals and let (Pn)n and Qn)n be their corresponding orthogonal polynomial sequences (OPS). We discuss an inverse problem in the theory of discrete orthogonal polynomials involving the above two OPS assuming that their difference derivatives D of higher orders m and k (resp.) are connected by a linear algebraic structure relation such as Σi=0M ai,n Dm Pn+m-i(x) = Σi=0N bi,n Dk Qn+k-i(x), n≥ 0, where $M,N,m,k=0,1,2,... Under certain conditions, we prove that U and V are related by a rational factor c (in the distributional sense). Moreover, when m≠ k then both U and V are Dv-semiclassical functionals. This leads us to the concept of (M,N)-Dv-coherent pair of order (m,k) extending to the discrete case several previous works. As an application we consider the OPS with respect to a certain following Sobolev-type discrete inner product.