Global solutions to a non-local diffusion equation with quadratic non-linearity

Abstract

In this paper we prove the global in time well-posedness of the following non-local diffusion equation with α ∈[0,2/3): ∂t u = (-)-1u u + α u2, u(t=0) = u0. The initial condition u0 is positive, radial, and non-increasing with u0∈ L1 L2+δ() for some small δ >0. There is no size restriction on u0. This model problem appears of interest due to its structural similarity with Landau's equation from plasma physics, and moreover its radically different behavior from the semi-linear Heat equation: ut = u + α u2.