A degenerate Whittaker criterion for GL2n
Abstract
Let F be a non-Archimedean local field. Let N be the unipotent radical of the standard parabolic subgroup of GL2n(F) of type (n,n) with fixed nondegenerate additive character ψ. For an irreducible admissible representation π of GL2n(F), a theorem due to Gomez--Gourevitch--Sahi on generalized Whittaker models gives a criterion for the vanishing of the twisted Jacquet module πN,ψ in terms of the wave-front set. We translate this orbit-theoretic answer into Langlands--Zelevinsky data: if π=L( m), then πN,ψ=0 if and only if the Zelevinsky dual m t contains a segment of length at least n+1. We do this in response to a conjecture proposed by D.Prasad about the vanishing of πN,ψ in terms of the adjoint L-function L(s,π×π). We prove that, for every irreducible representation π, vanishing of πN,ψ implies the pole inequalities predicted by D.Prasad. However, we show that the converse implication is false by an explicit counterexample for GL4(F). For the generalized Steinberg constituents vPβG of the principal series containing the trivial representation, we make an explicit calculation of when πN,ψ is zero. In particular, for GL6(F), exactly three of the 32 constituents of such a principal series violate the converse direction of the conjecture proposed by D.Prasad.
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