Amplitude Relations in Non-linear Sigma Model
Abstract
In this paper, we investigate tree-level scattering amplitude relations in non-linear sigma model. We use Cayley parametrization. As was shown in the recent works [23,24] both on-shell amplitudes and off-shell currents with odd points have to vanish under Cayley parametrization. We prove the off-shell identity and fundamental BCJ relation for even-point currents. By taking the on-shell limits of the off-shell relations, we show that the color-ordered tree amplitudes with even points satisfy -decoupling identity and fundamental BCJ relation, which have the same formations within Yang-Mills theory. We further state that all the on-shell general KK, BCJ relations as well as the minimal-basis expansion are also satisfied by color-ordered tree amplitudes. As a consequence of the relations among color-ordered amplitudes, the total -point tree amplitudes satisfy DDM form of color decomposition as well as KLT relation.
Keywords
Cite
@article{arxiv.1311.1133,
title = {Amplitude Relations in Non-linear Sigma Model},
author = {Gang Chen and Yi-Jian Du},
journal= {arXiv preprint arXiv:1311.1133},
year = {2015}
}
Comments
27 pages, 8 figures, 4 tables, JHEP style, improved version