A basic analogue of the bessel polynomial

This paper deals with Hermite Pade polynomials in the case where the multiple orthogonality condition is related to semiclassical functionals. The polynomials, introduced in such a way, are a generalization of classical orthogonal polynomials (Jacobi, Laguerre, Hermite, and Bessel polynomials). They

The main object of this paper is to show how readily some general results on bilinear, bilateral, or mixed multilateral generating functions for the Bessel polyno-Ž . mials would provide unifications and generalizations of numerous generating functions which were proven recently by using group-theor

Szegö polynomials are associated with weight functions on the unit circle. M. G. Krein introduced a continuous analogue of these, a family of entire functions of exponential type associated with a weight function on the real line. An investigation of the asymptotics of the resolvent kernel of \(\sin

In this paper we give for generalized Bessel operators studied by M. I. Klyuchantsev a representation theory for solutions of the related heat equations. A new approach is given to develop this theory studied before by many authors. Our method is different from those given by D. T. Haimo, C. Markett