A positive product formula of integral kernels of k-Hankel transforms

Abstract

The k-Hankel transform Fk,1 (or the (k,1)-generalized Fourier transform) is the Dunkl analogue of the unitary inversion operator in the minimal representation of a conformal group initiated by T. Kobayashi and G. Mano. It is one of the two most significant cases in (k,a)-generalized Fourier transforms. We will establish a positive radial product formula for the integral kernels of Fk,1. Such a product formula is equivalent to a representation of the generalized spherical mean operator in terms of the probability measure σx,tk,1(ξ). We will then study the representing measure σx,tk,1(ξ) and analyze the support of this measure, and derive a weak Huygens's principle for the deformed wave equation in (k,1)-generalized Fourier analysis.