Characterization of Orthogonal Polynomials on lattices

Abstract

We consider two sequences of orthogonal polynomials (Pn)n≥ 0 and (Qn)n≥ 0 such that Σj=1 M aj,nSxDx k Pk+n-j (z)=Σj=1 N bj,nDx m Qm+n-j (z)\;, with k,m,M,N ∈ N, aj,n and bj,n are sequences of complex numbers, 2Sxf(x(s))=( +2\,I)f(z),~~ Dxf(x(s))= x(s-1/2)f(z), z=x(s-1/2), I is the identity operator, x defines a lattice, and f(s)=f(s+1)-f(s). We show that under some natural conditions, both involved orthogonal polynomials sequences (Pn)n≥ 0 and (Qn)n≥ 0 are semiclassical whenever k=m. Some particular cases are studied closely where we characterize the continuous dual Hahn and Wilson polynomials for quadratic lattices.