TY - JOUR
T1 - Integration rules for scattering equations
AU - Baadsgaard, Christian
AU - Bjerrum-Bohr, N. E.J.
AU - Bourjaily, Jacob L.
AU - Damgaard, Poul H.
N1 - Publisher Copyright:
© 2015, The Author(s).
PY - 2015/9/29
Y1 - 2015/9/29
N2 - Abstract: As described by Cachazo, He and Yuan, scattering amplitudes in many quantum field theories can be represented as integrals that are fully localized on solutions to the so-called scattering equations. Because the number of solutions to the scattering equations grows quite rapidly, the contour of integration involves contributions from many isolated components. In this paper, we provide a simple, combinatorial rule that immediately provides the result of integration against the scattering equation constraints fo any Möbius-invariant integrand involving only simple poles. These rules have a simple diagrammatic interpretation that makes the evaluation of any such integrand immediate. Finally, we explain how these rules are related to the computation of amplitudes in the field theory limit of string theory.
AB - Abstract: As described by Cachazo, He and Yuan, scattering amplitudes in many quantum field theories can be represented as integrals that are fully localized on solutions to the so-called scattering equations. Because the number of solutions to the scattering equations grows quite rapidly, the contour of integration involves contributions from many isolated components. In this paper, we provide a simple, combinatorial rule that immediately provides the result of integration against the scattering equation constraints fo any Möbius-invariant integrand involving only simple poles. These rules have a simple diagrammatic interpretation that makes the evaluation of any such integrand immediate. Finally, we explain how these rules are related to the computation of amplitudes in the field theory limit of string theory.
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U2 - 10.1007/JHEP09(2015)129
DO - 10.1007/JHEP09(2015)129
M3 - Article
AN - SCOPUS:84942579365
SN - 1126-6708
VL - 2015
JO - Journal of High Energy Physics
JF - Journal of High Energy Physics
IS - 9
M1 - 129
ER -