Globally Hyperbolic AdS$_3$ and its Holography
2024
Online
report
We show that a $(\mathbb {RP}^1 \times \mathbb{RP}^1)$-gauged $\mathbb{Z}_2$ quotient of $\mathbb R^{2,2}$ embeds an AdS$_3/\mathbb Z_2/ (\mathbb{RP}^1 \times \mathbb{RP}^1)$ spacetime that is globally hyperbolic, unlike regular AdS$_3$. This embedded spacetime possesses a single cover of AdS$_3$'s isometries without producing closed timelike curves and a non-timelike boundary. After including its gauge symmetries, its AdS$_3$/CFT$_2$ correspondence becomes equivalent to an embedded $\frac{\text{AdS}_3}{\mathbb Z_2}$ / $\frac{\mathbb R^{2,2}}{\mathbb Z_2}$ embedding correspondence.
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Globally Hyperbolic AdS$_3$ and its Holography
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Autor/in / Beteiligte Person: | Pathak, Shivesh ; Kovalsky, Lucas Kocia |
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Veröffentlichung: | 2024 |
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