Spinning dispersive CFT sum rules and bulk scattering
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1.
California Institute of Technology
Abstract
We use commutativity of null-integrated operators on the same null plane to construct dispersive CFT sum rules for spinning operators. The contribution of heavy blocks to these sum rules is dominated by a saddle configuration that we call the “scattering crystal.” Correlators in this configuration have a natural flat-space interpretation, which allows us to build a dictionary between dispersive CFT sum rules for stress-tensors and flat-space dispersion relations for gravitons. This dictionary is a crucial step for establishing the HPPS conjecture for stress tensor correlators.
Copyright and License
© The Authors. This article is distributed under the terms of the Creative Commons Attribution License (CC-BY 4.0), which permits any use, distribution and reproduction in any medium, provided the original author(s) and source are credited.
Article funded by SCOAP3.
Acknowledgement
We thank Simon Caron-Huot, Yue-Zhou Li, Dalimil Mazáč, Julio Parra-Martinez, and Leonardo Rastelli for helpful discussions. We are supported by Simons Foundation grant 488657 (Simons Collaboration on the Nonperturbative Bootstrap) and a DOE Early Career Award under grant no. DE-SC0019085. YL is additionally supported by the National Science Foundation Graduate Research Fellowship under grant no. DGE-1745301
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Additional details
- Simons Foundation
- 488657
- United States Department of Energy
- DE-SC0019085
- National Science Foundation
- Graduate Research Fellowship DGE-1745301
- SCOAP3
- Accepted
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2025-02-25
- Available
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2025-04-01Published
- Caltech groups
- Division of Physics, Mathematics and Astronomy (PMA), Walter Burke Institute for Theoretical Physics
- Publication Status
- Published