On the product formula on non-compact Grassmannians

Abstract

We study the absolute continuity of the convolution δeX δeY of two orbital measures on the symmetric space SO0(p,q)/SO(p)×SO(q), q>p. We prove sharp conditions on X, Y∈ for the existence of the density of the convolution measure. This measure intervenes in the product formula for the spherical functions. We show that the sharp criterion developed for 0(p,q)/(p)×(q) will also serve for the spaces SU(p,q)/S(U(p)×U(q)) and Sp(p,q)/Sp(p)×Sp(q), q>p. We also apply our results to the study of absolute continuity of convolution powers of an orbital measure δeX.