Proof of a conjecture of Kudla and Rallis on quotients of degenerate principal series
Abstract
In this paper we prove a conjecture of Kudla and Rallis. Let be a unitary character, s∈ C and W a symplectic vector space over a non-archimedean field with symmetry group G(W). Denote by I(,s) the degenerate principal series representation of G(W W). Pulling back I(,s) along the natural embedding G(W)× G(W) G(W W) gives a representation IW,W(,s) of G(W)× G(W). Let π be an irreducible smooth complex representation of G(W). We then prove \[ CHomG(W)× G(W)(IW,W(,s),π π)=1.\] We also give analogous statements for W orthogonal or unitary. This gives in particular a new proof of the conservation relation of the local Theta correspondence for symplectic-orthogonal and unitary dual pairs.
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