Recurrence equations and their classical orthogonal polynomial solutions on a quadratic or q-quadratic lattice

Abstract

Every classical orthogonal polynomial system pn(x) satisfies a three-term recurrence relation of the type \[ pn+1(x)=(Anx+Bn)pn(x)-Cnpn-1(x)~ (n=0,1,2,…, p-1 0), \] with CnAnAn-1>0. Moreover, Favard's theorem states that the converse is true. A general method to derive the coefficients An, Bn, Cn in terms of the polynomial coefficients of the divided-difference equations satisfied by orthogonal polynomials on a quadratic or q-quadratic lattice is recalled. The Maple implementations rec2ortho of Koorwinder and Swarttouw or retode of Koepf and Schmersau were developed to identify classical orthogonal polynomials given by their three-term recurrence relation as special functions. The two implementations rec2ortho and retode do not handle classical orthogonal polynomials on a quadratic or q-quadratic lattice. In this manuscript, the Maple implementation retode of Koepf and Schmersau is extended to cover classical orthogonal polynomials on quadratic or q-quadratic lattices and to answer as application an open problem submitted by Alhaidari during the 14th International Symposium on Orthogonal Polynomials, Special Functions and Applications.