Dunkl operators are differential-difference operators on \b R^N which
generalize partial derivatives. They lead to generalizations of Laplace
operators, Fourier transforms, heat semigroups, Hermite polynomials, and so on.
In this paper we introduce two systems of biorthogonal polynomials with respect
to Dunkl's Gaussian distributions in a quite canonical way. These systems,
called Appell systems, admit many properties known from classical Hermite
polynomials, and turn out to be useful for the analysis of Dunkl's Gaussian
distributions. In particular, these polynomials lead to a new proof of a
generalized formula of Macdonald due to Dunkl.
The ideas for this paper are taken from recent works on non-Gaussian white
noise analysis and from the umbral calculus.Comment: 14 pages, Latex2