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Communications in Number Theory and Physics
Volume 16 (2022)
Number 1
Identities among higher genus modular graph tensors
Pages: 35 – 74
DOI: https://dx.doi.org/10.4310/CNTP.2022.v16.n1.a2
Authors
Abstract
Higher genus modular graph tensors map Feynman graphs to functions on the Torelli space of genus‑$h$ compact Riemann surfaces which transform as tensors under the modular group $Sp(2h, \mathbb{Z})$, thereby generalizing a construction of Kawazumi. An infinite family of algebraic identities between one-loop and tree-level modular graph tensors are proven for arbitrary genus and arbitrary tensorial rank. We also derive a family of identities that apply to modular graph tensors of higher loop order.
Keywords
higher-genus modular form, string scattering amplitude
The research of Eric D’Hoker was supported in part by NSF grant PHY-19-14412.
The research of Oliver Schlotterer was supported by the European Research Council under ERCSTG-804286 UNISCAMP.
Received 22 December 2020
Accepted 14 September 2021
Published 1 February 2022