On the boundedness and unboundedness of certain convolution operators on nilpotent Lie groups

Abstract:

One method of proving irreducibility of the “principal series” representations of semisimple Lie groups involves showing that a certain nonintegrable function on a nilpotent subgroup $X$ cannot be regularized to give a bounded convolution operator on ${L_2}(X)$. This note gives an elementary proof of this unboundedness property for the groups $X$ which occur in real-rank one semisimple groups.