Smoothness of convolution products of orbital measures on rank one compact symmetric spaces

Abstract

We prove that all convolution products of pairs of continuous orbital measures in rank one, compact symmetric spaces are absolutely continuous and determine which convolution products are in L2 (meaning, their density function is in L2). Characterizations of the pairs whose convolution product is either absolutely continuous or in L2 are given in terms of the dimensions of the corresponding double cosets. In particular, we prove that if G/K is not SU(2)/SO(2), then the convolution of any two regular orbital measures is in L2, while in SU(2)/SO(2) there are no pairs of orbital measures whose convolution product is in L2.