Translation Invariant Diffusions in the space of tempered distributions

Abstract

In this paper we prove existence and pathwise uniqueness for a class of stochastic differential equations (with coefficients σij,bi and initial condition y in the space of tempered distributions) that maybe viewed as a generalisation of Ito's original equations with smooth coefficients . The solutions are characterized as the translates of a finite dimensional diffusion whose coefficients σij y,bi y are assumed to be locally Lipshitz.Here denotes convolution and y is the distribution which on functions, is realised by the formula y(r) := y(-r) . The expected value of the solution satisfies a non linear evolution equation which is related to the forward Kolmogorov equation associated with the above finite dimensional diffusion.