Symplectic projective orbits of unimodular exponential Lie groups

Abstract: For an exponential Lie group $G$ and an irreducible unitary representation $(\pi,\mathcal{H}{\pi})$ of $G$, we consider the natural action defined by $\pi$ on the projective space of $\mathcal{H}{\pi}$, and show that the stabilisers of this action coincide with the projective kernel of $\pi$. Using this, we prove that, if $G/\mathrm{pker}(\pi)$ is unimodular, then $\pi$ admits a symplectic projective orbit if and only if $\pi$ is square-integrable modulo its projective kernel $\mathrm{pker}(\pi)$.