Elimination and recursions in the scattering equations

Carlos Cardona; Chrysostomos Kalousios

doi:10.1016/j.physletb.2016.03.003

Physics Letters B (May 2016)

Elimination and recursions in the scattering equations

Carlos Cardona,
Chrysostomos Kalousios

Affiliations

Carlos Cardona: Physics Division, National Center for Theoretical Sciences, National Tsing-Hua University, Hsinchu, 30013 Taiwan, ROC
Chrysostomos Kalousios: ICTP South American Institute for Fundamental Research, Instituto de Física Teórica, UNESP – Universidade Estadual Paulista, R. Dr. Bento T. Ferraz 271 – Bl. II, 01140-070, São Paulo, SP, Brazil

DOI: https://doi.org/10.1016/j.physletb.2016.03.003
Journal volume & issue: Vol. 756, no. C
pp. 180 – 187

Abstract

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We use the elimination theory to explicitly construct the (n−3)! order polynomial in one of the variables of the scattering equations. The answer can be given either in terms of a determinant of Sylvester type of dimension (n−3)! or a determinant of Bézout type of dimension (n−4)!. We present a recursive formula for the Sylvester determinant. Expansion of the determinants yields expressions in terms of Plücker coordinates. Elimination of the rest of the variables of the scattering equations is also presented.

Published in Physics Letters B

ISSN: 0370-2693 (Print); 1873-2445 (Online)
Publisher: Elsevier
Country of publisher: Netherlands
LCC subjects: Science: Physics
Website: http://www.journals.elsevier.com/physics-letters-b/

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