Convolution of orbital measures on symmetric spaces of type Cp and Dp
Abstract
We study the absolute continuity of the convolution δeX δeY of two orbital measures on the symmetric spaces SO0(p,p)/ SO(p)× SO(p), (p,p)/ S( U(p)× U(p)) and (p,p)/ Sp (p)×(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.
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