Complete space-like hypersurfaces in locally symmetric Lorentz spaces

## Abstract Let__M__ be a complete non‐compact stable minimal hypersurface in a locally symmetric space __N__ of nonnegative Ricci curvature. We prove that if the integral of square norm of the second fundamental form is finite, i.e., ∫~__M__~ |__A__ |^2^ __dv__ < ∞, then __M__ must be totally geo

We consider the region of closed time-like curves (CTCs) in three-dimensional flat Lorentz space-times. The interest in this global geometrical feature goes beyond the purely mathematical one. Such space-times are lower-dimensional toy models of sourceless Einstein gravity or cosmology. In three dim

We study compact spacelike hypersurfaces (necessarily with non-empty boundary) with constant mean curvature in the (n + 1)-dimensional Lorentz-Minkowski space. In particular, when the boundary is a round sphere we prove that the only such hypersurfaces are the hyperplanar round balls (with zero mean

## Abstract We extend Ekeland's variational principle to locally complete locally convex spaces. As an application of the extension, we obtain a drop theorem in locally convex spaces which improves the related known result.