Covariance Group for Null Geodesic Expansion Calculations, and its Application to the Apparent Horizon

Abstract

We show that the recipe for computing the expansions θ and θn of outgoing and ingoing null geodesics normal to a surface admits a covariance group with nonconstant scalar (x), corresponding to the mapping θ θ, θn -1 θn. Under this mapping, the product θ θn is invariant, and thus the marginal surface computed from the vanishing of θ, which is used to define the apparent horizon, is invariant. This covariance group naturally appears in comparing the expansions computed with different choices of coordinate system.