Asymptotic large time behavior of singular solutions of the fast diffusion equation

Abstract

Let n 3, 0<m<n-2n, α=2β-11-m and 21-m<αβ<n-2m. We give a new direct proof using fixed point method on the existence of singular radially symmetric forward self-similar solution of the form V(x,t)=t-α f(t-βx) ∀ x∈Rn\0\, t>0, for the fast diffusion equation ut= (um/m) in (Rn\0\)× (0,∞), where f satisfies equation* (fm/m) + α f + β x · ∇ f =0 in \; Rn\0\ equation* with |x| 0 |x| αβf(x)=A and |x| ∞f(x) = DA for some constants A>0, DA > 0. We also obtain an asymptotic expansion of such singular radially symmetric solution f near the origin. We will also prove the asymptotic large time behaviour of the singular solutions of the fast diffusion equation ut= (um/m) in (Rn\0\)× (0,∞), u(x,0)=u0(x) in Rn\0\, satisfying the condition A1|x|-γ≤ u0(x)≤ A2|x|-γ in Rn\0\, for some constants A2>A1>0 and nγ<n-2m.