Asymptotic dynamics of AdS$_3$ gravity with two asymptotic regions

TL;DR

This paper analyzes the asymptotic dynamics of AdS$_3$ gravity with two boundaries, revealing how holonomies couple the boundaries and reducing the action to free chiral components with zero mode couplings.

Contribution

It provides a detailed derivation of the boundary dynamics, including the role of holonomies and Wilson lines, for AdS$_3$ gravity with multiple boundaries, extending previous single-boundary analyses.

Findings

Holonomies couple fields on the two boundaries.

The action decomposes into four free chiral actions with zero mode couplings.

Iwasawa decomposition simplifies treatment of elliptic and parabolic holonomies.

Abstract

The asymptotic dynamics of AdS$_3$ gravity with two asymptotically anti-de Sitter regions is investigated, paying due attention to the zero modes, i.e., holonomies along non-contractible circles and their canonically conjugates. This situation covers the eternal black hole solution. We derive how the holonomies around the non-contractible circles couple the fields on the two different boundaries and show that their canonically conjugate variables, needed for a consistent dynamical description of the holonomies, can be related to Wilson lines joining the boundaries. The action reduces to the sum of four free chiral actions, one for each boundary and each chirality, with additional non-trivial couplings to the zero modes which are explicitly written. While the Gauss decomposition of the $SL(2,\mathbb{R})$ group elements is useful in order to treat hyperbolic holonomies, the Iwasawa decomposition turns out to be more convenient in order to deal with elliptic and parabolic holonomies. The connection with the geometric action is also made explicit. Although our paper deals with the specific example of two asymptotically anti-de Sitter regions, most of our global considerations on holonomies and radial Wilson lines qualitatively apply whenever there are multiple boundaries, independently of the form that the boundary conditions explicitly take there.