Fractional diffusion for Fokker-Planck equation with heavy tail equilibrium: an \`a la Koch spectral method in any dimension

Abstract

In this paper, we extend the spectral method developed [Dechicha and Puel, 2023] to any dimension d≥slant 1, in order to construct an eigen-solution for the Fokker-Planck operator with heavy tail equilibria, of the form (1+|v|2)-β2, in the range β ∈ ]d,d+4[. The method developed in dimension 1 was inspired by the work of H. Koch on nonlinear KdV equation [Koch, Nonlinearity, 2015]. The strategy in this paper is the same as in dimension 1 but the tools are different, since dimension 1 was based on ODE methods. As a direct consequence of our construction, we obtain the fractional diffusion limit for the kinetic Fokker-Planck equation, for the correct density := ∫Rd f dv, with a fractional Laplacian (-x)β-d+26 and a positive diffusion coefficient .