Celestial insights into the S-matrix bootstrap

Ghosh, Sudip Kumar; Sinha, Aninda; Raman, Prashanth

doi:10.48550/arxiv.2204.07617

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2022

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“…• An important application will be to show the geometric function theory connection to Feynman block recently discussed in [52].…”

Section: Summary and Future Directionsmentioning

confidence: 99%

Locality and Analyticity of the Crossing Symmetric Dispersion Relation

Chowdhury,

Haldar,

Zahed

2022

Preprint

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This paper discusses the locality and analyticity of the crossing symmetric dispersion relation (CSDR). Imposing locality constraints on the CSDR gives rise to a local and fully crossing symmetric expansion of scattering amplitudes, dubbed as Feynman block expansion. A general formula is provided for the contact terms that emerge from the expansion. The analyticity domain of the expansion is also derived analogously to the Lehmann-Martin ellipse. Our observation of type-II super-string tree amplitude suggests that the Feynman block expansion has a bigger analyticity domain and better convergence. The formula derived for the contact terms is directly applicable to CFT Mellin amplitudes.

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“…• An important application will be to show the geometric function theory connection to Feynman block recently discussed in [52].…”

Section: Summary and Future Directionsmentioning

confidence: 99%