Evaluation of the probability current in the stochastic path integral formalism

The probability current is a vital quantity in the Fokker-Planck description of stochastic processes. It characterizes nonequilibrium stationary states, appears in linear response calculation, and has been related to the entropy production and the heat flux. We recover and review the probability current in the Onsager-Machlup functional approach to Markov processes. We derive a self contained expression for the stationary probability current and the non-equilibrium fluctuation-dissipation theorem using field theoretical methods. The derived formulas are explicitly evaluated in the Ornstein-Uhlenbeck process of a harmonically bound particle in shear flow as exemplary analytic expressions. Our work closes a gap since it removes a missing link, i.e.~the probability current, in the supposed equivalence of the Fokker-Planck and the path-integral approach.