The characteristic group of locally conformally product structures

Abstract

A compact manifold M together with a Riemannian metric h on its universal cover M for which π1(M) acts by similarities is called a similarity structure. In the case where π1(M) ⊂ Isom( M, h) and ( M, h) is reducible but not flat, this is a Locally Conformally Product (LCP) structure. The so-called characteristic group of these manifolds, which is a connected abelian Lie group, is the key to understand how they are built. We focus in this paper on the case where this group is simply connected, and give a description of the corresponding LCP structures. It appears that they are quotients of trivial Rp-principal bundle over simply-connected manifolds by certain discrete subgroups of automorphisms. We prove that, conversely, it is always possible to endow such quotients with an LCP structure.