Structure of globally hyperbolic spacetimes with timelike boundary

Abstract

Globally hyperbolic spacetimes with timelike boundary (M = M ∂ M, g) are the natural class of spacetimes where regular boundary conditions (eventually asymptotic, if M is obtained by means of a conformal embedding) can be posed. ∂ M represents the naked singularities and can be identified with a part of the intrinsic causal boundary. Apart from general properties of ∂ M, the splitting of any globally hyperbolic (M,g) as an orthogonal product R× with Cauchy slices with boundary \t\× is proved. This is obtained by constructing a Cauchy temporal function τ with gradient ∇ τ tangent to ∂ M on the boundary. To construct such a τ, results on stability of both, global hyperbolicity and Cauchy temporal functions are obtained. Apart from having their own interest, these results allow us to circumvent technical difficulties introduced by ∂ M. As a consequence, the interior M both, splits orthogonally and can be embedded isometrically in LN, extending so properties of globally spacetimes without boundary to a class of causally continuous ones.