Asymptotic expansions of solutions of fractional diffusion equations

Abstract

In this paper we obtain the precise description of the asymptotic behavior of the solution u of ∂t u+(-)θ2u=0in RN×(0,∞), u(x,0)=(x)in RN, where 0<θ<2 and ∈ LK:=L1( RN,\,(1+|x|)K\,dx) with K 0. Furthermore, we develop the arguments in [15] and [18] and establish a method to obtain the asymptotic expansions of the solutions to a nonlinear fractional diffusion equation ∂t u+(-)θ2u=|u|p-1uin RN×(0,∞), where 0<θ<2 and p>1+θ/N.