Six-point remainder function in multi-Regge-kinematics: an efficient approach in momentum space
Open access
Datum
2016-05Typ
- Journal Article
Abstract
Starting from the known all-order expressions for the BFKL eigenvalue and impact factor, we establish a formalism allowing the direct calculation of the six-point remainder function in N = 4 super-Yang-Mills theory in momentum space to — in principle — all orders in perturbation theory. Based upon identities which relate different integrals contributing to the inverse Fourier-Mellin transform recursively, the formalism allows to easily access the full remainder function in multi-Regge kinematics up to 7 loops and up to 10 loops in the fourth logarithmic order. Using the formalism, we prove the all-loop formula for the leading logarithmic approximation proposed by Pennington and investigate the behavior of several newly calculated functions. Mehr anzeigen
Persistenter Link
https://doi.org/10.3929/ethz-b-000117036Publikationsstatus
publishedExterne Links
Zeitschrift / Serie
Journal of High Energy PhysicsBand
Seiten / Artikelnummer
Verlag
SpringerThema
Scattering Amplitudes; Extended SupersymmetryOrganisationseinheit
03896 - Beisert, Niklas / Beisert, Niklas