A note on spacelike hypersurfaces and timelike conformal vectors

Abstract

Any compact spacelike hypersurface immersed in a doubly warped product spacetime Ih × P with nondecreasing warping factor must be a spacelike slice, provided that the mean curvature satisfies H≥'/h everywhere on the hypersurface. The conclusion also holds, under suitable assumptions on the immersion, when the hypersurface is complete and noncompact. A similar rigidity property is shown for compact hypersurfaces in spacetimes carrying a conformal, strictly expanding, timelike vector field.