Unitary Representations of Lattices of Free Nilpotent Lie Groups of Step-Two
Abstract
Using a theorem proved by Bekka and Driutti, we show that if f is a freely generated nilpotent Lie algebra of step-two, then almost every irreducible representation of the corresponding Lie group restricted to some lattice is an irreducible representation of if the dimension of the Lie algebra is odd. However, if the dimension of the Lie algebra is even, then almost every unitary irreducible representation of the Lie group restricted to is reducible.
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