2021
DOI: 10.48550/arxiv.2106.10274
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AdS Bulk Locality from Sharp CFT Bounds

Simon Caron-Huot,
Dalimil Mazac,
Leonardo Rastelli
et al.

Abstract: It is a long-standing conjecture that any CFT with a large central charge and a large gap ∆ gap in the spectrum of higher-spin single-trace operators must be dual to a local effective field theory in AdS. We prove a sharp form of this conjecture by deriving numerical bounds on bulk Wilson coefficients in terms of ∆ gap using the conformal bootstrap. Our bounds exhibit the scaling in ∆ gap expected from dimensional analysis in the bulk. Our main tools are dispersive sum rules that provide a dictionary between C… Show more

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Cited by 7 publications
(26 citation statements)
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References 76 publications
(209 reference statements)
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“…k ij < 0. In particular, for equal operators, the k = (0, −1, −1, 0) subtraction scheme, or equivalently (0, 0, −1, −1), applied to the B k;v|34 functional corresponds to the anti-subtracted functional B −2 introduced in [30]. We will show that anti-subtractions change the Mellin-space domain of convergence.…”
Section: Convergence and Positivity Properties: A Plethora Of Subtrac...mentioning
confidence: 95%
See 4 more Smart Citations
“…k ij < 0. In particular, for equal operators, the k = (0, −1, −1, 0) subtraction scheme, or equivalently (0, 0, −1, −1), applied to the B k;v|34 functional corresponds to the anti-subtracted functional B −2 introduced in [30]. We will show that anti-subtractions change the Mellin-space domain of convergence.…”
Section: Convergence and Positivity Properties: A Plethora Of Subtrac...mentioning
confidence: 95%
“…Moreover, the presence of the double discontinuity suppresses doubletwist operators thereby allowing us to probe non-perturbative features of CFTs. Finally, they enjoy positivity properties due to the double-zeros that make them desirable for the numerical 2 Our convention differs from that of [29,30]: for equal operators, the u-channel identity is always present. Therefore, they define their sum rules to be normalized as follows:…”
Section: Overview Of Dispersive Cft Sum Rulesmentioning
confidence: 99%
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