Non-BPS bubbling geometries in \(\mathrm{AdS}_3\)

DOI10.1007/JHEP02(2023)133arXiv2210.06483OpenAlexW4321096517WikidataQ126035688 ScholiaQ126035688MaRDI QIDQ6041730

Author name not available (Why is that?)

Publication date: 12 May 2023

Published in: (Search for Journal in Brave)

Abstract: We construct large classes of non-BPS smooth horizonless geometries that are asymptotic to AdS

_{3} i m e s

S

^{3} i m e s

T

^{4}

in type IIB supergravity. These geometries are supported by electromagnetic flux corresponding to D1-D5 charges. We show that Einstein equations for systems with eight commuting Killing vectors decompose into a set of Ernst equations, thereby admitting an integrable structure. This feature, which can a priori be applied to other AdS

_{D} i m e s m a t h c a l C

settings in supergravity, allows us to use solution-generating techniques associated with the Ernst formalism. We explicitly derive solutions by applying the charged Weyl formalism that we have previously developed. These are sourced internally by a chain of bolts that correspond to regions where the orbits of the commuting Killing vectors collapse smoothly. We show that these geometries can be interpreted as non-BPS T

^{4}

and S

^{3}

deformations on global AdS

_{3} i m e s

S

^{3} i m e s

T

^{4}

that are located at the center of AdS

_{3}

. These non-BPS deformations can be made arbitrarily small and should therefore correspond to non-supersymmetric operators in the D1-D5 CFT. Finally, we also construct interesting bound states of non-extremal BTZ black holes connected by regular bolts.

Full work available at URL: https://arxiv.org/abs/2210.06483

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