Fractional diffusion limit for a kinetic Fokker-Planck equation with diffusive boundary conditions in the half-line
Abstract
We consider a particle living in R+, whose velocity is a positive recurrent diffusion with heavy-tailed invariant distribution when the particle lives in (0,∞). When it hits the boundary x=0, the particle restarts with a random strictly positive velocity. We show that the properly rescaled position process converges weakly to a stable process reflected on its infimum. From a P.D.E. point of view, the time-marginals of (Xt, Vt)t≥0 solve a kinetic Fokker-Planck equation on (0,∞)×R+ × R with diffusive boundary conditions. Properly rescaled, the space-marginal converges to the solution of some fractional heat equation on (0,∞)×R+.
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