Detecting horizons of symmetric black holes using relative differential invariants

Abstract

Let k be a nontrivial finite-dimensional Lie algebra of vector fields on a manifold M, and consider the family of Lorentzian metrics on M whose Killing algebra contains k. We show that scalar relative differential invariants, with respect to a Lie algebra of vector fields on M preserving k, can be used to detect the horizons of several well-known black holes. In particular, using the Lie algebra structure of k, we construct a general relative differential invariant of order 0 that always vanishes on k-invariant Killing horizons.

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