Unitary Representations and Heisenberg Parabolic Subgroup
Abstract
In this paper, we study the restriction of an irreducible unitary representation π of the universal covering Sp2n( R) to a Heisenberg maximal parabolic group P. We prove that if π| P is irreducible, then π must be a highest weight module or a lowest weight module. This is in sharp constrast with the GLn( R) case. In addition, we show that for a unitary highest or lowest weight module, π| P decomposes discretely. We also treat the groups U(p,q) and O*(2n).
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