Tensor products of complementary series of rank one Lie groups

Abstract

We consider the tensor product πα πβ of complementary series representations πα and πβ of classical rank one groups SO0(n, 1), SU(n, 1) and Sp(n, 1). We prove that there is a discrete component πα+β for small parameters α, β (in our parametrization). We prove further that for G=SO0(n, 1) there are finitely many complementary series of the form πα+β + 2j, j=0, 1, ·s, k, appearing in the tensor product πα πβ of two complementary series πα and πβ, where k=k(α, β, n) depends on α, β, n.