Dongwen Liu, Zhicheng Wang
Published 2019-01-07Version 1
S.-Y. Pan decomposes the uniform projection of the Weil representation of a finite symplectic-odd orthogonal dual pair, in terms of Deligne-Lusztig virtual characters, assuming that the order of the finite field is large enough. In this paper we use Pan's decomposition to study the theta correspondence for this kind of dual pairs, following the approach of Adams-Moy and Aubert-Michel-Rouquier. Our results give the theta correspondence between unipotent representations and certain quadratic unipotent representations.
Comments: 19 pages, submitted. Comments are welcome!
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Quantization of symplectic vector spaces over finite fields
The space $L^2$ on semi-infinite Grassmannian over finite field
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