The W-algebra bootstrap of 6d N=(2,0) theories

Abstract

6d (2,0) SCFTs of type g have protected subsectors that were conjectured in arxiv:1404.1079 to be captured by Wg algebras. We write down the crossing equations for mixed four-point functions Sk1 Sk2Sk3Sk4 of 1/2-BPS operators Ski in 6d (2,0) theories and detail how a certain twist reduces this system to a 2d meromorphic CFT multi-correlator bootstrap problem. We identify the relevant 6d (2,0) W-algebras of type g = \AN-1,DN\ as truncations of W1+∞ and solve OPE associativity conditions for their structure constants, both using OPEdefs and the holomorphic bootstrap of arxiv:1503.07111. With this, we solve the multi-correlator bootstrap for twisted 6d four-point correlators Fk1k2k3k4 involving all Ski up to \ki\=4 and extract closed-form expressions for 6d OPE coefficients. We describe the implications of our CFT data on conformal Regge trajectories of the (2,0) theories and finally, demonstrate the consistency of our results with protected higher-derivative corrections to graviton scattering in M-theory on AdS7× S4/Zo.