Exact solution of three-point functions in critical loop models

Abstract

We propose an exact formula for three-point functions on the sphere in critical loop models with primary fields V(r,s) characterized by 2r legs and a parameter \(s\) that describes diagonal fields for r=0 and the momentum of legs for r>0. We demonstrate its validity in three ways: the conformal bootstrap method for 4-point functions, a transfer-matrix study of the lattice model, and a probabilistic method based on conformal loop ensemble and Liouville quantum gravity. This work provides a crucial missing piece for solving critical loop models and reveals a deep unity between three fundamental approaches to 2D statistical physics: transfer matrix, conformal field theory, and probability theory.