Characterization of Orthogonal Polynomials on lattices

TL;DR

This paper characterizes orthogonal polynomials on lattices, showing they are semiclassical under certain conditions, and identifies specific cases like continuous dual Hahn and Wilson polynomials for quadratic lattices.

Contribution

It establishes conditions under which two sequences of orthogonal polynomials on lattices are semiclassical, and characterizes special cases such as continuous dual Hahn and Wilson polynomials.

Findings

Both polynomial sequences are semiclassical when $k=m$.

Characterization of continuous dual Hahn polynomials.

Identification of Wilson polynomials on quadratic lattices.

Abstract

We consider two sequences of orthogonal polynomials $(P_n)_{n\geq 0}$ and $(Q_n)_{n\geq 0}$ such that $$ \sum_{j=1} ^{M} a_{j,n}\mathrm{S}_x\mathrm{D}_x ^k P_{k+n-j} (z)=\sum_{j=1} ^{N} b_{j,n}\mathrm{D}_x ^{m} Q_{m+n-j} (z)\;, $$ with $k,m,M,N \in \mathbb{N}$, $a_{j,n}$ and $b_{j,n}$ are sequences of complex numbers, $$2\mathrm{S}_xf(x(s))=(\triangle +2\,\mathrm{I})f(z),~~ \mathrm{D}_xf(x(s))=\frac{\triangle}{\triangle x(s-1/2)}f(z),$$ $z=x(s-1/2)$, $\mathrm{I}$ is the identity operator, $x$ defines a lattice, and $\triangle f(s)=f(s+1)-f(s)$. We show that under some natural conditions, both involved orthogonal polynomials sequences $(P_n)_{n\geq 0}$ and $(Q_n)_{n\geq 0}$ are semiclassical whenever $k=m$. Some particular cases are studied closely where we characterize the continuous dual Hahn and Wilson polynomials for quadratic lattices.