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Analytic bootstrap at large spin

arXiv:1502.01437 · doi:10.1007/JHEP11(2015)083

Abstract

We use analytic conformal bootstrap methods to determine the anomalous dimensions and OPE coefficients for large spin operators in general conformal field theories in four dimensions containing a scalar operator of conformal dimension $Δ_ϕ$. It is known that such theories will contain an infinite sequence of large spin operators with twists approaching $2Δ_ϕ+2n$ for each integer $n$. By considering the case where such operators are separated by a twist gap from other operators at large spin, we analytically determine the $n$, $Δ_ϕ$ dependence of the anomalous dimensions. We find that for all $n$, the anomalous dimensions are negative for $Δ_ϕ$ satisfying the unitarity bound. We further compute the first subleading correction at large spin and show that it becomes universal for large twist. In the limit when $n$ is large, we find exact agreement with the AdS/CFT prediction corresponding to the Eikonal limit of a 2-2 scattering with dominant graviton exchange.

34 pages, 4 figures. v6: JHEP version