Conformal symmetries and MOTS stability

Abstract

Let \Σt\ be a spacelike foliation of a spacetime M, and suppose each Σt is foliated by 2-surfaces S with spacelike unit normal in Σt. We show that under mild energy conditions, a MOTS S that intersects integral curves of past-pointing conformal Killing vector field lying in the normal space of S is strictly stable and evolves smoothly to a spacelike horizon. We also show that if the restriction of the divergence of the vector field to S is non-negative, S is unstable, and if negative and S is a 2-sphere, S must be strictly stable.

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