A Partial Cayley Transform of Siegel-Jacobi Disk

Abstract

Let Hg and Dg be the Siegel upper half plane and the generalized unit disk of degree g respectively. Let C(h,g) be the Euclidean space of all h× g complex matrices. We present a partial Cayley transform of the Siegel-Jacobi disk Dg× C(h,g) onto the Siegel-Jacobi space Hg× C(h,g) which gives a partial bounded realization of Hg× C(h,g) by Dg× C(h,g). We prove that the natural actions of the Jacobi group on Dg× C(h,g) and Hg× C(h,g) are compatible via a partial Cayley transform. A partial Cayley transform plays an important role in computing differential operators on the Siegel-Jacobi disk Dg× C(h,g) invariant under the natural action of the Jacobi group on Dg× C(h,g) explicitly.

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