Correlators in WN Minimal Model Revisited

Abstract

In this paper, we study a class of sphere and torus correlation functions in the WN minimal model. In particular, we show that a large class of exact sphere three-point functions of WN primaries, derived using affine Toda theory, exhibit large N factorization. This allows us to identify some fundamental particles and their bound states in the holographic dual, including light states. We also derive the torus two-point function of basic primaries, by directly constructing the relevant conformal blocks. The result can then be analytically continued to give the Lorentzian thermal two-point functions.