Construction and non-vanishing of a family of vector-valued Siegel Poincar\'e series

Abstract

Using Poincar\'e series of K -finite matrix coefficients of integrable antiholomorphic discrete series representations of Sp2n( R) , we construct a spanning set for the space S() of Siegel cusp forms of weight for , where is an irreducible polynomial representation of GLn( C) of highest weight ω∈ Zn with ω1≥…≥ωn>2n , and is a discrete subgroup of Sp2n( R) commensurable with Sp2n( Z) . Moreover, using a variant of Mui\'c's integral non-vanishing criterion for Poincar\'e series on unimodular locally compact Hausdorff groups, we prove a result on the non-vanishing of constructed Siegel Poincar\'e series.

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