Proof of the MHV vertex expansion for all tree amplitudes in N=4 SYM
  theory

A. Brandhuber; A. Brandhuber; C. Cheung; D. Vaman; Daniel Z Freedman; F. Cachazo; F. Cachazo; G. Georgiou; H. Elvang; H. Feng; Henriette Elvang; J. McGreevy; J.H. Ettle; J.H. Ettle; J.M. Drummond; J.M. Drummond; J.M. Drummond; J.M. Drummond; J.M. Drummond; K. Risager; L. Mason; L.F. Alday; L.F. Alday; M. Bianchi; M.B. Green; Michael Kiermaier; N. Arkani-Hamed; N. Arkani-Hamed; N. Berkovits; N.E.J. Bjerrum-Bohr; N.E.J. Bjerrum-Bohr; N.E.J. Bjerrum-Bohr; N.E.J. Bjerrum-Bohr; P. Mansfield; R. Boels; S.J. Bidder; Z. Bern

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Proof of the MHV vertex expansion for all tree amplitudes in N=4 SYM theory

Abstract

We prove the MHV vertex expansion for all tree amplitudes of N=4 SYM theory. The proof uses a shift acting on all external momenta, and we show that every N^kMHV tree amplitude falls off as 1/z^k, or faster, for large z under this shift. The MHV vertex expansion allows us to derive compact and efficient generating functions for all N^kMHV tree amplitudes of the theory. We also derive an improved form of the anti-NMHV generating function. The proof leads to a curious set of sum rules for the diagrams of the MHV vertex expansion.Comment: 40 pages, 7 figure

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