Horizons that gyre and gimble: a differential characterization of null hypersurfaces
Permanent link
https://hdl.handle.net/10037/34809Date
2024-06-04Type
Journal articleTidsskriftartikkel
Peer reviewed
Abstract
Motivated by the thermodynamics of black hole
solutions conformal to stationary solutions, we study the
geometric invariant theory of null hypersurfaces. It is wellknown that a null hypersurface in a Lorentzian manifold can
be treated as a Carrollian geometry. Additional structure can
be added to this geometry by choosing a connection which
yields a Carrollian manifold. In the literature various authors
have introduced Koszul connections to study the study the
physics on these hypersurfaces. In this paper we examine
the various Carrollian geometries and their relationship to
null hypersurface embeddings. We specify the geometric
data required to construct a rigid Carrollian geometry, and
we argue that a connection with torsion is the most natural
object to study Carrollian manifolds. We then use this connection to develop a hypersurface calculus suitable for a study
of intrinsic and extrinsic differential invariants on embedded
null hypersurfaces; motivating examples are given, including
geometric invariants preserved under conformal transformations.
Publisher
Springer NatureCitation
Blitz, McNutt. Horizons that gyre and gimble: a differential characterization of null hypersurfaces. European Physical Journal C. 2024;84(6)Metadata
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Copyright 2024 The Author(s)