AdS3 × S3 Virasoro-Shapiro amplitude with KK modes

Abstract

We study the first curvature correction to the string amplitude of four Kaluza--Klein (KK) modes on AdS3 × S3 × M4, with M4=K3 or T4, in type IIB string theory, which is holographically dual to the four--point correlator Op1 Op2 Op3 Op4 of certain half--BPS operators in the boundary D1--D5 CFT. The result takes the form of an integral over the Riemann sphere, analogous to the flat-space Virasoro--Shapiro amplitude, but with insertions of single-valued multiple polylogarithms of weight three. Our results are obtained in two steps. First, we derive the AdS3 × S3 Virasoro--Shapiro amplitude in the special case Op Op O1 O1 , by matching the CFT block expansion with an ansatz based on single-valued multiple polylogarithms. We then employ the AdS × S Mellin formalism to generalize the result to the general case of four arbitrary KK modes Op1 Op2 Op3 Op4 . Our analysis yields an infinite set of results for operator anomalous dimensions and OPE data in D1--D5 CFT at strong coupling. In particular, the resulting scaling dimensions of certain operators are shown to be consistent with classical string theory computations.