Geometric reflective boundary conditions for asymptotically Anti-de Sitter spaces

TL;DR

This paper introduces a new family of geometric reflective boundary conditions for asymptotically Anti-de Sitter spaces in Einstein's vacuum equations, establishing local existence, uniqueness, and boundary data analysis.

Contribution

It develops a novel class of boundary conditions involving conformal class and stress-energy tensor, extending previous work and providing a framework for analyzing asymptotically Anti-de Sitter spaces.

Findings

Established local existence and uniqueness for the new boundary conditions.

Derived conditions for smoothness of unphysical fields at the boundary.

Provided examples illustrating boundary stress-energy tensor configurations.

Abstract

This article solves the initial boundary value problem for the vacuum Einstein equations with a negative cosmological constant in dimension 4, giving rise to asymptotically Anti-de Sitter spaces. We introduce a new family of geometric reflective boundary conditions, which can be regarded as the homogeneous Robin boundary conditions, involving both the conformal class and the stress-energy tensor of the timelike conformal boundary. This family includes as a special case the homogeneous Neumann boundary condition, consisting of setting the boundary stress-energy tensor to zero. It also agrees, in a limit case, with the homogeneous Dirichlet boundary condition, where one fixes a locally conformally flat conformal class on the boundary, already covered in Friedrich's pioneering work of 1995. The proof of local existence and uniqueness for this family of boundary conditions relies notably on Friedrich's framework and his extended conformal Einstein equations. These are rewritten in a tensorial formalism, rather than a spinorial one, as it facilitates the comparison with the Fefferman-Graham expansion of asymptotically Anti-de Sitter metrics. Similarly to Friedrich's proof, our geometric boundary conditions are eventually inferred from gauge-dependent boundary conditions by means of an auxiliary system on the conformal boundary. In addition, our analysis also comprises new necessary and sufficient conditions for the unphysical fields associated to the initial data to be smooth up to the conformal boundary. Finally, the paper contains examples of asymptotically Anti-de Sitter spaces, with a focus on their conformal boundary data. This provides valuable insight into the possible shapes of boundary stress-energy tensors.