Error analysis of an acceleration corrected diffusion approximation of Langevin dynamics with background flow
Abstract
We consider the problem of approximating the Langevin dynamics of inertial particles being transported by a background flow. In particular, we study an acceleration corrected advection-diffusion approximation to the Langevin dynamics, a popular approximation in the study of turbulent transport. We prove error estimates in the averaging regime in which the dimensionless relaxation timescale is the small parameter. We show that for any finite time interval, the approximation error is of order O() in the strong sense and O(2) in the weak sense, whose optimality is checked against computational experiment. Furthermore, we present numerical evidence suggesting that this approximation also captures the long-time behavior of the Langevin dynamics.
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