English

Spinning Mellin Bootstrap: Conformal Partial Waves, Crossing Kernels and Applications

High Energy Physics - Theory 2019-04-08 v2

Abstract

We study conformal partial waves (CPWs) in Mellin space with totally symmetric external operators of arbitrary integer spin. The exchanged spin is arbitrary, and includes mixed symmetry and (partially)-conserved representations. In a basis of CPWs recently introduced in arXiv:1702.08619, we find a remarkable factorisation of the external spin dependence in their Mellin representation. This property allows a relatively straightforward study of inversion formulae to extract OPE data from the Mellin representation of spinning 4pt correlators and in particular, to extract closed-form expressions for crossing kernels of spinning CPWs in terms of the hypergeometric function 4F3{}_4F_3. We consider numerous examples involving both arbitrary internal and external spins, and for both leading and sub-leading twist operators. As an application, working in general dd we extract new results for O(1/N){\cal O}\left(1/N\right) anomalous dimensions of double-trace operators induced by double-trace deformations constructed from single-trace operators of generic twist and integer spin. In particular, we extract the anomalous dimensions of double-trace operators [OJΦ]n,l[\mathcal{O}_J\Phi]_{n,l} with OJ{\cal O}_J a single-trace operator of integer spin JJ.

Keywords

Cite

@article{arxiv.1804.09334,
  title  = {Spinning Mellin Bootstrap: Conformal Partial Waves, Crossing Kernels and Applications},
  author = {Charlotte Sleight and Massimo Taronna},
  journal= {arXiv preprint arXiv:1804.09334},
  year   = {2019}
}

Comments

101 pages, 12 figures, 2 tables. v2: refs added, typos fixed

R2 v1 2026-06-23T01:34:48.542Z