Invariant Spaces of Holomorphic Functions on the Siegel Upper Half-Space

Abstract

In this paper we consider the (ray) representations of the group Aut of biholomorphisms of the Siegel upper half-space U defined by Us() f=(f -1) (J -1)s/2, s∈ R, and characterize the semi-Hilbert spaces H of holomorphic functions on U satisfying the following assumptions: (a) H is strongly decent; (b) Us induces a bounded ray representation of the group Aff of affine automorphisms of U in H. We use this description to improve the known characterization of the semi-Hilbert spaces of holomorphic functions on U satisfying (a) and (b) with Aff replaced by Aut. In addition, we characterize the mean-periodic holomorphic functions on U under the representation U0 of Aff.

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