Instability of marginally outer trapped surfaces from initial data set symmetry
Abstract
Let (,hab,Kab) be an initial data set and let xa be a symmetry vector of . Consider a MOTS S in and let the symmetry vector be decomposable along the unit normal to S in , and along S. In this note we present some basic results with regards to the stability of S. The vector decomposition allows us to characterize the instability of S by the nature of the zero set of the normal component to S and the divergence of the component along S. Further observations are made under the assumption of S having a constant mean curvature, and being an Einstein manifold.
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