Please use this identifier to cite or link to this item: https://repository.usc.edu.co/handle/20.500.12421/258
Title: Elliptic scattering equations
Authors: Cardona, Carlos A.
Gomez, Humberto
Keywords: Differential and Algebraic Geometry;Field Theories in Higher Dimensions;Scattering Amplitudes
Issue Date: 1-Jun-2016
Publisher: Springer Verlag
Abstract: Recently the CHY approach has been extended to one loop level using elliptic functions and modular forms over a Jacobian variety. Due to the difficulty in manipulating these kind of functions, we propose an alternative prescription that is totally algebraic. This new proposal is based on an elliptic algebraic curve embedded in a ℂP 2 space. We show that for the simplest integrand, namely the n − gon, our proposal indeed reproduces the expected result. By using the recently formulated Λ−algorithm, we found a novel recurrence relation expansion in terms of tree level off-shell amplitudes. Our results connect nicely with recent results on the one-loop formulation of the scattering equations. In addition, this new proposal can be easily stretched out to hyperelliptic curves in order to compute higher genus. © 2016, The Author(s).
URI: https://repository.usc.edu.co/handle/20.500.12421/258
ISSN: 11266708
Appears in Collections:Artículos Científicos

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