A new approach to the study of spacelike submanifolds in a spherical Robertson-Walker spacetime: characterization of the stationary spacelike submanifolds as an application

Abstract

A natural one codimension isometric embedding of each (n+1)-dimensional spherical Robertson-Walker (RW) spacetime I×f Sn in (n+2)-dimensional Lorentz-Minkowski spacetime Ln+2 permits to contemplate I×f Sn as a rotation Lorentzian hypersurface of Ln+2. After a detailed study of such Lorentzian hypersurfaces, any k-dimensional spacelike submanifold of such an RW spacetime can be contemplated as a spacelike submanifold of Ln+2. Then, we use that situation to study k-dimensional stationary (i.e., of zero mean curvature vector field) spacelike submanifolds of the RW spacetime. In particular, we prove a wide extension of the Lorentzian version of the classical Takahashi theorem, giving a characterization of stationary spacelike submanifolds of I×f Sn when contemplating them as spacelike submanifolds of Ln+2.