TL;DR
This paper introduces null normal coordinates constructed via Riemann normal coordinates along null geodesics, facilitating the study of local causal horizons and approximate Killing vectors in small regions.
Contribution
It develops a new coordinate system called null normal coordinates and a method to construct approximate Killing vectors, generalizing Fermi-Walker transport.
Findings
Null normal coordinates are effective near null surfaces.
A vector field satisfying the Killing equation approximately is constructed.
The method generalizes Fermi-Walker transport to null surfaces.
Abstract
Locally inertial coordinates are constructed by carrying Riemann normal coordinates on a codimension two spacelike surface along the geodesics normal to it. Since the normal tangents are labelled by components with respect to a null basis, these coordinates are referred to as null normal coordinates. They are convenient in the study of local causal horizons. As an application, the coordinate system is used to specify a vector field that satisfies the Killing equation approximately in a small region and the Killing identity exactly on a single null geodesic. We also construct a vector field on a surface, starting from a vector at a given point on the surface. This construction may be regarded as a generalisation of the notion of Fermi-Walker transport.
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