Completeness of compact Locally symmetric Lorentz manifolds
Abstract
The geodesic completeness of compact locally symmetric Lorentz manifolds has been established in several important cases, namely, the constant curvature, indecomposable, and Brinkmann settings. In this paper, we prove geodesic completeness in all remaining cases, thereby confirming the conjecture that all compact, locally symmetric Lorentz manifolds are geodesically complete. Along the way, we use the completeness result to give a comprehensive overview on four-dimensional compact locally symmetric Lorentz manifolds.
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