Reciprocity and Self-Tuning Relations without Wrapping

Reciprocity and Self-Tuning Relations without Wrapping

We consider scalar Wilson operators of N = 4 SYM at high spin, s, and generic twist in the multicolor limit. We show that the corresponding (non)linear integral equations (originating from the asymptotic Bethe Ansatz equations) respect certain “reciprocity” and functional “self-tuning” relations up...

Full description

Bibliographic Details
Main Authors: Davide Fioravanti, Gabriele Infusino, Marco Rossi
Format: Article
Language:English
Published: Hindawi Limited 2015-01-01
Series:Advances in High Energy Physics
Online Access:http://dx.doi.org/10.1155/2015/762481
id doaj-b4234cc583ba446c8f80ffb4b2281e63
record_format Article
spelling doaj-b4234cc583ba446c8f80ffb4b2281e632020-11-24T21:34:00ZengHindawi LimitedAdvances in High Energy Physics1687-73571687-73652015-01-01201510.1155/2015/762481762481Reciprocity and Self-Tuning Relations without WrappingDavide Fioravanti0Gabriele Infusino1Marco Rossi2Sezione INFN di Bologna, Dipartimento di Fisica e Astronomia, Università di Bologna, Via Irnerio 46, 40126 Bologna, ItalyDipartimento di Fisica dell’Università della Calabria, Arcavacata, Rende, 87036 Cosenza, ItalyDipartimento di Fisica dell’Università della Calabria and INFN, Gruppo Collegato di Cosenza, Arcavacata, Rende, 87036 Cosenza, ItalyWe consider scalar Wilson operators of N = 4 SYM at high spin, s, and generic twist in the multicolor limit. We show that the corresponding (non)linear integral equations (originating from the asymptotic Bethe Ansatz equations) respect certain “reciprocity” and functional “self-tuning” relations up to all terms 1/s(ln s)n (inclusive) at any fixed ’t Hooft coupling λ. Of course, this relation entails straightforwardly the well-known (homonymous) relations for the anomalous dimension at the same order in s. On this basis we give some evidence that wrapping corrections should enter the nonlinear integral equation and anomalous dimension expansions at the next order (ln s)2/s2, at fixed ’t Hooft coupling, in such a way to reestablish the aforementioned relation (which fails otherwise).http://dx.doi.org/10.1155/2015/762481
collection DOAJ
language English
format Article
sources DOAJ
author Davide Fioravanti
Gabriele Infusino
Marco Rossi
spellingShingle Davide Fioravanti
Gabriele Infusino
Marco Rossi
Reciprocity and Self-Tuning Relations without Wrapping
Advances in High Energy Physics
author_facet Davide Fioravanti
Gabriele Infusino
Marco Rossi
author_sort Davide Fioravanti
title Reciprocity and Self-Tuning Relations without Wrapping
title_short Reciprocity and Self-Tuning Relations without Wrapping
title_full Reciprocity and Self-Tuning Relations without Wrapping
title_fullStr Reciprocity and Self-Tuning Relations without Wrapping
title_full_unstemmed Reciprocity and Self-Tuning Relations without Wrapping
title_sort reciprocity and self-tuning relations without wrapping
publisher Hindawi Limited
series Advances in High Energy Physics
issn 1687-7357
1687-7365
publishDate 2015-01-01
description We consider scalar Wilson operators of N = 4 SYM at high spin, s, and generic twist in the multicolor limit. We show that the corresponding (non)linear integral equations (originating from the asymptotic Bethe Ansatz equations) respect certain “reciprocity” and functional “self-tuning” relations up to all terms 1/s(ln s)n (inclusive) at any fixed ’t Hooft coupling λ. Of course, this relation entails straightforwardly the well-known (homonymous) relations for the anomalous dimension at the same order in s. On this basis we give some evidence that wrapping corrections should enter the nonlinear integral equation and anomalous dimension expansions at the next order (ln s)2/s2, at fixed ’t Hooft coupling, in such a way to reestablish the aforementioned relation (which fails otherwise).
url http://dx.doi.org/10.1155/2015/762481
work_keys_str_mv AT davidefioravanti reciprocityandselftuningrelationswithoutwrapping
AT gabrieleinfusino reciprocityandselftuningrelationswithoutwrapping
AT marcorossi reciprocityandselftuningrelationswithoutwrapping
_version_ 1725950799850242048

Similar Items