Anomalous diffusion and anisotropic nonlinear Fokker-Planck equation

Abstract

We analyse a bidimensional nonlinear Fokker-Planck equation by considering an anisotropic case, whose diffusion coefficients are Dx |x|-θ and Dy |y|-γ with θ, γ ∈ R. In this context, we also investigate two situations with the drift force F(r,t)=(-kxx, -ky y). The first one is characterized by kx/ky=(2+γ)/(2+θ) and the second is given by kx=k and ky=0. In these cases, we can verify an anomalous behavior induced in different directions by the drift force applied. The found results are exact and exhibit, in terms of the q-exponentials, functions which emerge from the Tsallis formalism. The generalization for the D-dimensional case is discussed.

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