English

Anomalous Dimensions from Crossing Kernels

High Energy Physics - Theory 2019-12-18 v5

Abstract

In this note we consider the problem of extracting the corrections to CFT data induced by the exchange of a primary operator and its descendents in the crossed channel. We show how those corrections which are analytic in spin can be systematically extracted from crossing kernels. To this end, we underline a connection between: Wilson polynomials (which naturally appear when considering the crossing kernels given recently in arXiv:1804.09334), the spectral integral in the conformal partial wave expansion, and Wilson functions. Using this connection, we determine closed form expressions for the OPE data when the external operators in 4pt correlation functions have spins J1J_1-J2J_2-00-00, and in particular the anomalous dimensions of double-twist operators of the type [OJ1OJ2]n,[\mathcal{O}_{J_1}\mathcal{O}_{J_2}]_{n,\ell} in dd dimensions and for both leading and sub-leading twist. The OPE data are expressed in terms of Wilson functions, which naturally appear as a spectral integral of a Wilson polynomial. As a consequence, our expressions are manifestly analytic in spin and are valid up to finite spin. We present some applications to CFTs with slightly broken higher-spin symmetry. The Mellin Barnes integral representation for 6j6j symbols of the conformal group in general dd and its relation with the crossing kernels are also discussed.

Keywords

Cite

@article{arxiv.1807.05941,
  title  = {Anomalous Dimensions from Crossing Kernels},
  author = {Charlotte Sleight and Massimo Taronna},
  journal= {arXiv preprint arXiv:1807.05941},
  year   = {2019}
}

Comments

55 pages, 2 figures. v3: Finite spin expressions included in general d. Connection underlined between Wilson polynomials, the spectral function in the conformal partial wave expansion, and the Wilson function. References added. v4: Improved presentation and typos fixed. v5: typos fixed

R2 v1 2026-06-23T03:02:54.105Z