Similarity manifolds and Inoue-Bombieri construction

We study compact quotients of Riemannian products $\mathbb R^q \times N$, with $N$ a complete, simply connected Riemannian manifold, by discrete subgroups $\Gamma$ of $\text{Sim}(\mathbb R^q) \times \text{Isom}(N)$ acting freely and properly. We assume that the projection of $\Gamma$ onto $\text{Sim} (\mathbb R^q)$ contains a non-isometric similarity. This construction, when $N$ is a symmetric space of non-compact type, is a generalization of the well-known Inoue surfaces. We prove that this situation is in fact equivalent to that of so-called LCP manifolds. We show a Bieberbach rigidity result in the case of symmetric spaces, providing a way to construct admissible groups $\Gamma$. We also consider the projection of $\Gamma$ onto $\text{Isom}(N)$ in the case where $N$ has negative curvature, leading to some classification results.