On the Inoue-Bombieri construction
Abstract
We study compact quotients of a Riemannian product Rq × (N, gN), where (N, gN) is a complete Riemannian manifold, by discrete subgroups of Sim(Rq) × Isom(N). When N is a symmetric space of non-compact type, this construction generalizes the well-known Inoue--Bombieri surfaces. We show that this setting is actually equivalent to that of the so-called LCP manifolds, and we establish a Bieberbach-type rigidity result in the case where N is symmetric. In addition, we provide a classification of the manifolds N and the groups when N is a Hadamard manifold with strictly negative curvature.
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