# Cluster adjacency and the four-loop NMHV heptagon

**Authors:** James Drummond, Jack Foster, \"Omer G\"urdo\u{g}an, Georgios, Papathanasiou

arXiv: 1812.04640 · 2020-04-16

## TL;DR

This paper constructs the four-loop NMHV heptagon amplitude in planar $	ext{N}=4$ super Yang-Mills theory using cluster adjacency, matching known results and providing new predictions in the multi-Regge limit.

## Contribution

It introduces a cluster adjacency-based ansatz for the amplitude's symbol and determines its parameters through physical consistency, advancing the understanding of scattering amplitudes at four loops.

## Key findings

- Agreement with previous results up to next-to-leading logarithm in multi-Regge limit
- New predictions up to next-to-3-leading-logarithmic accuracy
- Construction of the amplitude's symbol using cluster adjacency

## Abstract

We exploit the recently described property of cluster adjacency for scattering amplitudes in planar $\mathcal{N}=4$ super Yang-Mills theory to construct the symbol of the four-loop NMHV heptagon amplitude. We use a manifestly cluster adjacent ansatz and describe how the parameters of this ansatz are determined using simple physical consistency requirements. We then specialise our answer for the amplitude to the multi-Regge limit, finding agreement with previously available results up to the next-to-leading logarithm, and obtaining new predictions up to (next-to)$^3$-leading-logarithmic accuracy.

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Source: https://tomesphere.com/paper/1812.04640