On the Positivity of Kirillov's Character Formula

Abstract

We give a direct proof for the positivity of Kirillov's character on the convolution algebra of smooth, compactly supported functions on a connected, simply connected nilpotent Lie group G. Then we use this positivity result to construct a representation of G× G and establish a G× G-equivariant isometric isomorphism between our representation and the Hilbert--Schmidt operators on the underlying representation of G. In fact, we provide a more general framework in which we establish the positivity of Kirillov's character for coadjoint orbits of groups such as SL(2, R) under additional hypotheses that are automatically satisfied in the nilpotent case. These hypotheses include the existence of a real polarization and the Pukanzsky condition.