Construction of a non-Gaussian and rotation-invariant 4-measure and associated flow on R3 through stochastic quantization

Abstract

A new construction of non-Gaussian, rotation-invariant and reflection positive probability measures μ associated with the 43-model of quantum field theory is presented. Our construction uses a combination of semigroup methods, and methods of stochastic partial differential equations (SPDEs) for finding solutions and stationary measures of the natural stochastic quantization associated with the 43-model. Our starting point is a suitable approximation μM,N of the measure μ we intend to construct. μM,N is parametrized by an M-dependent space cut-off function M: R3→ R and an N-dependent momentum cut-off function N: R3 R3 → R, that act on the interaction term (nonlinear term and counterterms). The corresponding family of stochastic quantization equations yields solutions (XtM,N, t≥ 0) that have μM,N as an invariant probability measure. By a combination of probabilistic and functional analytic methods for singular stochastic differential equations on negative-indices weighted Besov spaces (with rotation invariant weights) we prove the tightness of the family of continuous processes (XtM,N,t ≥ 0)M,N. Limit points in the sense of convergence in law exist, when both M and N diverge to +∞. The limit processes (Xt; t≥ 0) are continuous on the intersection of suitable Besov spaces and any limit point μ of the μM,N is a stationary measure of X. μ is shown to be a rotation-invariant and non-Gaussian probability measure and we provide results on its support. It is also proven that μ satisfies a further important property belonging to the family of axioms for Euclidean quantum fields, it is namely reflection positive.