Koichi Arashi
Published 2022-05-15Version 1
We investigate the multiplicity-freeness property of holomorphic multiplier representations of an affine transformation group on a Siegel domain of the second kind. We first deal with a generalized Heisenberg group. Next, for a certain smaller group, we give some necessary and sufficient conditions for the representation defined by the trivial multiplier to be multiplicity-free. We relate the multiplicity-freeness property to the coisotropicity and the visibility of the group action and to the commutativity of the algebra of invariant differential operators.
Smooth vectors and Weyl-Pedersen calculus for representations of nilpotent Lie groups
Weyl-Pedersen calculus for some semidirect products of nilpotent Lie groups
Beurling's Theorem and $L^p-L^q$ Morgan's Theorem for Step Two Nilpotent Lie Groups
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