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For an exponential Lie group G and an irreducible unitary representation (, H_) of G, we consider the natural action defined by on the projective space of H_, and show that the stabilisers of this action coincide with the projective kernel of. Using this, we prove that, if G/pker () is unimodular, then admits a symplectic projective orbit if and only if is square-integrable modulo its projective kernel pker ().
Beltiţă et al. (Thu,) studied this question.
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