Recursion Relations, Generating Functions, and Unitarity Sums in N=4 SYM Theory
Abstract
We prove that the MHV vertex expansion is valid for any NMHV tree amplitude of N=4 SYM. The proof uses induction to show that there always exists a complex deformation of three external momenta such that the amplitude falls off at least as fast as 1/z for large z. This validates the generating function for n-point NMHV tree amplitudes. We also develop generating functions for anti-MHV and anti-NMHV amplitudes. As an application, we use these generating functions to evaluate several examples of intermediate state sums on unitarity cuts of 1-, 2-, 3- and 4-loop amplitudes. In a separate analysis, we extend the recent results of arXiv:0808.0504 to prove that there exists a valid 2-line shift for any n-point tree amplitude of N=4 SYM. This implies that there is a BCFW recursion relation for any tree amplitude of the theory.
Keywords
Cite
@article{arxiv.0808.1720,
title = {Recursion Relations, Generating Functions, and Unitarity Sums in N=4 SYM Theory},
author = {Henriette Elvang and Daniel Z. Freedman and Michael Kiermaier},
journal= {arXiv preprint arXiv:0808.1720},
year = {2009}
}
Comments
42pp, 7 figures; v2: completion of 4-loop spin sum, typos corrected, new figure added