Higher Spin Symmetry and N=4 SYM

A. Bredthauer; A. Dhar; A. Mikhailov; A.V. Kotikov; B.C. Vallilo; D. Anselmi; D. Anselmi; D. Berenstein; E. D'Hoker; E. Sezgin; E. Sezgin; E. Witten; E. Witten; E. Witten; G. Bonelli; G. Pólya; H Samtleben; I. Bakas; I. Bars; I. Bars; I. Bena; J. Son; J.A. Minahan; J.F Morales; J.F. Morales; J.F. Morales; J.M. Maldacena; K.A. Intriligator; L. Andrianopoli; L. Brink; L. Dolan; L.F. Alday; M Bianchi; M. Bianchi; M. Bianchi; M. Bianchi; M. Günaydin; M.A. Vasiliev; M.A. Vasiliev; N Beisert; N. Beisert; N. Beisert; N. Berkovits; N. Berkovits; N. Berkovits; N. Itzhaki; N.R. Constable; O. Aharony; P. Claus; P. de Medeiros; P. Haggi-Mani; P.J. Heslop; R. Gopakumar; R. Gopakumar; R.R. Metsaev; S. Bellucci; S. Fernando; S. Ferrara; S. Ferrara; S.E. Konstein; V.K. Dobrev; V.K. Dobrev; V.K. Dobrev; V.K. Dobrev

research

Higher Spin Symmetry and N=4 SYM

Abstract

We assemble the spectrum of single-trace operators in free N=4 SU(N) SYM theory into irreducible representations of the Higher Spin symmetry algebra hs(2,2|4). Higher Spin representations or YT-pletons are associated to Young tableaux (YT) corresponding to representations of the symmetric group compatible with the cyclicity of color traces. After turning on interactions, YT-pletons decompose into infinite towers of representations of the superconformal algebra PSU(2,2|4) and anomalous dimensions are generated. We work out the decompositions of tripletons with respect to the N=4 superconformal algebra PSU(2,2|4) and compute their one anomalous dimensions at large N. We then focus on operators/states sitting in semishort superconformal multiplets. By passing them through a semishort-sieve that removes superdescendants, we derive compact expressions for the partition function of semishort primaries.Comment: 38 pages, no figures. v2: references adde