An integral inequality for the invariant measure of some finite dimensional stochastic differential equation

Abstract

We prove an integral inequality for the invariant measure of a stochastic differential equation with additive noise in a finite dimensional space H=d. As a consequence, we show that there exists the Fomin derivative of in any direction z∈ H and that it is given by vz= D,z, where is the density of with respect to the Lebesgue measure. Moreover, we prove that vz∈ Lp(H,) for any p∈[1,∞). Also we study some properties of the gradient operator in Lp(H,) and of his adjoint.