Dualizing involutions on the n-fold metaplectic cover of (2)
Abstract
Let F be a non-Archimedean local field of characteristic zero and G=(2,F). Let n≥ 2 be a positive integer and G=(2,F) be the n-fold metaplectic cover of G. Let π be an irreducible smooth representation of G and π be the contragredient of π. Let τ be an involutive anti-automorphism of G satisfying πτ π. In this case, we say that τ is a dualizing involution. A well known theorem of Gelfand and Kazhdan says that the standard involution τ on G is a dualizing involution. In this paper, we show that any lift of the standard involution to G is a dualizing involution if and only if n=2.
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