AdS null deformations with inhomogeneities

TL;DR

This paper investigates inhomogeneous null deformations of AdS spaces, revealing their supersymmetric nature, horizon-like features, and implications for dual field theories with spatially varying momentum densities, including Lifshitz boundary conditions.

Contribution

It introduces new inhomogeneous AdS null deformation solutions with supersymmetry and horizon-like structures, extending previous homogeneous models and exploring Lifshitz asymptotics.

Findings

Inhomogeneous solutions preserve some supersymmetry.

Horizon-like features appear where timelike Killing vectors become null.

Holographic entanglement entropy is analyzed for these solutions.

Abstract

We study $AdS\times X$ null deformations arising as near horizon limits of D3-brane analogs of inhomogenous plane waves. Restricting to normalizable deformations for the $AdS_5$ case, these generically correspond in the dual field theory to SYM states with lightcone momentum density $T_{++}$ varying spatially, the homogenous case studied in arXiv:1202.5935 [hep-th] corresponding to uniform $T_{++}$. All of these preserve some supersymmetry. Generically these inhomogenous solutions exhibit analogs of horizons in the interior where a timelike Killing vector becomes null. From the point of view of $x^+$-dimensional reduction, the circle pinches off on these horizon loci in the interior. We discuss similar inhomogenous solutions with asymptotically Lifshitz boundary conditions, as well as aspects of Lifshitz singularities in string constructions involving $AdS$ null deformations. We also briefly discuss holographic entanglement entropy for some of these.