Convolution of -orbital Measures on Complex Grassmannians

Abstract

Let p and q be integers such that p≥ q ≥ 1 and let\\ SU(p+q)/ S(U(p)× U(q) ) be the corresponding complex Grassmannian. The aim of this paper is to extend the main result in anchouche1, Alhashami to the case of convolution of -orbital measures where is a character of S(U(p)× U(q) ) . More precisely, we give sufficient conditions for the C-smoothness of the Radon Nikodym derivative f a1,...,ar, =d(μa1, ...μar, ) /dμSU(p+q) of the convolution μa1, ...μar, of some orbital measures μaj, (see the definition below) with respect to the Haar measure μSU(p+q) of SU(p+q).