On A-parameters containing unitary lowest weight representations of U(p, q)
Abstract
In this paper, we determine all the Arthur packets containing an irreducible unitary lowest weight representation π of real unitary group G = U(p, q), including non-scalar cases. Our methods are the Barbasch-Vogan parametrization of representations of G and Trapa's algorithm to calculate the cohomologically induced representations. In particular, we show that an Arthur packet has at most one irreducible unitary lowest weight representation of G. As a consequence, if an irreducible unitary lowest weight representation π exists in the Arthur packet of , we give an explicit formula of the lowest K-type of π.
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