The FBSDE approach to sine-Gordon up to 6π

Abstract

We develop a stochastic analysis of the sine-Gordon Euclidean quantum field ( (βφ))2 on the full space up to the second threshold, i.e. for β2 < 6 π. The basis of our method is a forward-backward stochastic differential equation (FBSDE) for a decomposition (Xt)t ≥slant 0 of the interacting Euclidean field X∞ along a scale parameter t ≥slant 0. This FBSDE describes the optimiser of the stochastic control representation of the Euclidean QFT introduced by Barashkov and one of the authors. We show that the FBSDE provides a description of the interacting field without cut-offs and that it can be used effectively to study the sine-Gordon measure to obtain results about large deviations, integrability, decay of correlations for local observables, singularity with respect to the free field, Osterwalder-Schrader axioms and other properties.