On classical orthogonal polynomials related to Hahn's operator

Abstract

Let u be a nonzero linear functional acting on the space of polynomials. Let Dq,ω be a Hahn operator acting on the dual space of polynomials. Suppose that there exist polynomials φ and , with deg\,φ≤2 and deg\,≤1, so that the functional equation Dq,ω(φ u)= u holds, where the involved operations are defined in a distributional sense. In this note we state necessary and sufficient conditions, involving only the coefficients of φ and , such that u is regular, that is, there exists a sequence of orthogonal polynomials with respect to u. A key step in the proof relies upon the fact that a distributional Rodrigues-type formula holds without assuming that u is regular.