An abstract proof of the L2-singular dichotomy for orbital measures on Lie algebras and groups

Abstract

Let G be a compact, connected simple Lie group and g its Lie algebra. It is known that if μ is any G-invariant measure supported on an adjoint orbit in g, then for each integer k, the k% -fold convolution product of μ with itself is either singular or in % L2. This was originally proven by computations that depended on the Lie type of g, as well as properties of the measure. In this note, we observe that the validity of this dichotomy is a direct consequence of the Duistermaat-Heckman theorem from symplectic geometry and that, in fact, any convolution product of (even distinct) orbital measures is either singular or in L2+ for some >0. An abstract transference result is given to show that the L2-singular dichotomy holds for certain of the G-invariant measures supported on conjugacy classes in G.