Published October 2022
| public
Journal Article
Feynman rules for scalar conformal blocks
Abstract
We complete the proof of "Feynman rules" for constructing M-point conformal blocks with external and internal scalars in any topology for arbitrary M in any spacetime dimension by combining the rules for the blocks (based on their Witten diagram interpretation) with the rules for the construction of conformal cross ratios (based on the OPE and "flow diagrams"). The full set of Feynman rules leads to blocks as power series of the hypergeometric type in the conformal cross ratios. We then provide a proof by recursion of the Feynman rules which relies heavily on the first Barnes lemma and the decomposition of the topology of interest in comb structures. Finally, we provide a nine-point example to illustrate the rules.
Additional Information
The work of JFF is supported by NSERC. The work of SH is supported by the National Science Foundation Graduate Research Fellowship under Grant No. 2021316516. The work of WJM is supported by the China Scholarship Council and in part by NSERC and FRQNT. The work of SP is supported in part by the Young Faculty Incentive Fellowship from IIT Delhi. The work of WS is supported in part by U.S. DOE HEP grant DE-SC00-17660. SCOAP3 supports the goals of the International Year of Basic Sciences for Sustainable Development.Additional details
- Eprint ID
- 117633
- Resolver ID
- CaltechAUTHORS:20221027-402241500.6
- Natural Sciences and Engineering Research Council of Canada (NSERC)
- 2021316516
- NSF Graduate Research Fellowship
- China Scholarship Council
- Fonds de recherche du Québec - Nature et technologies (FRQNT)
- IIT Delhi
- DE-SC0017660
- Department of Energy (DOE)
- SCOAP3
- Created
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2022-11-08Created from EPrint's datestamp field
- Updated
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2022-11-08Created from EPrint's last_modified field