Stochastic quantization of finite temperature systems

The method of Parisi and Wu to quantize classical fields is applied to instanton solutions . I of euclidian non-linear theory in one dimension. The solution . = of the corresponding Langevin equation is built through a singular perturbative expansion in == 1Â2 in the frame of the center of mass of t

Existence conditions and techniques for partitioning the states of finite stochastic systems into cyclic classes are given in this paper. For the special class of preserved finite stochastic systems, such cyclic partitions are shown to be evaluated, explicitly, in terms of those cyclic partitions as

The equivalence between a scalar quantum field theory in D dimensions and its classical counterpart in D + 2 dimensions which is coupled to an external random source with Gaussian correlations was observed by previous authors. This stochastic quantization is extended to gauge theories. The proof exp