Siegel p2 Vectors for Representations of GSp(4)
Abstract
Let F be a p-adic field and (π, V) an irreducible complex representation of G=GSp(4, F) with trivial central character. Let Si(p2)⊂ G denote the Siegel congruence subgroup of level p2 and u∈ NG( Si(p2)) the Atkin-Lehner element. We compute the dimension of the space of Si(p2)-fixed vectors in V as well as the signatures of the involutions π(u) acting on these spaces.
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