Morita's Theory for the Symplectic Groups
Abstract
We construct and study the holomorphic discrete series representation and the principal series representation of the symplectic group Sp(2n,F) over a p-adic field F as well as a duality between some sub-representations of these two representations. The constructions of these two representations generalize those defined in Morita and Murase's works. Moreover, Morita built a duality for SL(2, F) defined by residues. We view the duality we defined as an algebraic interpretation of Morita's duality in some extent and its generalization to the symplectic groups.
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