A generalization of Seifert geometry based on the Siegel upper half-space

Abstract

The Seifert geometry, SL(2,R)-geometry, is one of Thurston's eight 3-dimensional geometries. It fibers over the hyperbolic plane H2, which is a special case of the Siegel upper half-space Sp(2n,R) Hn. In this paper we construct an analogous geometry fibering over the Siegel upper half-space, and provide a volume formula for some manifolds with this geometry. For n=2, a prototype is constructed via the normal bundle of an equivariant embedding into a Grassmannian manifold. It turns out that this geometry is the homogeneous space given by a central extension of Sp(2n,R), modulo its maximal compact subgroup. The volume of a Siegel--Seifert closed manifold of this geometry is shown to be the length of the fiber circle times the Euler characteristic of the base manifold, up to a sign. Examples of Siegel--Seifert manifolds are provided, and it is shown that the volume of representations for this geometry is constant on every path-connected component of the representation space.