English

Exploring transcendentality in superstring amplitudes

High Energy Physics - Theory 2021-06-29 v3 Number Theory

Abstract

It is well known that the low energy expansion of tree-level superstring scattering amplitudes satisfies a suitably defined version of maximum transcendentality. In this paper it is argued that there is a natural extension of this definition that applies to the genus-one four-graviton Type II superstring amplitude to all orders in the low-energy expansion. To obtain this result, the integral over the genus-one moduli space is partitioned into a region MR{\cal M}_R surrounding the cusp and its complement ML{\cal M}_L, and an exact expression is obtained for the contribution to the amplitude from MR{\cal M}_R. The low-energy expansion of the MR{\cal M}_R contribution is proven to be free of irreducible multiple zeta-values to all orders. The contribution to the amplitude from ML{\cal M}_L is computed in terms of modular graph functions up to order D12R4D^{12} {\cal R}^4 in the low-energy expansion, and general arguments are used beyond this order to conjecture the transcendentality properties of the ML{\cal M}_L contributions. Maximal transcendentality of the full amplitude holds provided we assign a non-zero weight to certain harmonic sums, an assumption which is familiar from transcendentality assignments in quantum field theory amplitudes.

Keywords

Cite

@article{arxiv.1906.01652,
  title  = {Exploring transcendentality in superstring amplitudes},
  author = {Eric D'Hoker and Michael B. Green},
  journal= {arXiv preprint arXiv:1906.01652},
  year   = {2021}
}

Comments

65 pages, 4 figures; typos corrected, reference added, minor edits in version 2; factor of 4 corrected in theorem 4.1 in version 3

R2 v1 2026-06-23T09:42:02.465Z