Dynamical properties and characterization of gradient drift diffusions

Abstract

We study the dynamical properties of the Brownian diffusions having σ Id as diffusion coefficient matrix and b=∇ U as drift vector. We characterize this class through the equality D2+=D2-, where D+ (resp. D-) denotes the forward (resp. backward) stochastic derivative of Nelson's type. Our proof is based on a remarkable identity for D+2-D-2 and on the use of the martingale problem. We also give a new formulation of a famous theorem of Kolmogorov concerning reversible diffusions. We finally relate our characterization to some questions about the complex stochastic embedding of the Newton equation which initially motivated of this work.

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