Unimodular measures on the space of all Riemannian manifolds

Abstract

We study unimodular measures on the space Md of all pointed Riemannian d-manifolds. Examples can be constructed from finite volume manifolds, from measured foliations with Riemannian leaves, and from invariant random subgroups of Lie groups. Unimodularity is preserved under weak* limits, and under certain geometric constraints (e.g. bounded geometry) unimodular measures can be used to compactify sets of finite volume manifolds. One can then understand the geometry of manifolds M with large, finite volume by passing to unimodular limits. We develop a structure theory for unimodular measures on Md, characterizing them via invariance under a certain geodesic flow, and showing that they correspond to transverse measures on a foliated `desingularization' of Md. We also give a geometric proof of a compactness theorem for unimodular measures on the space of pointed manifolds with pinched negative curvature, and characterize unimodular measures supported on hyperbolic 3-manifolds with finitely generated fundamental group.