Super fast vanishing solutions of the fast diffusion equation

Abstract

We will extend a recent result of B.Choi, P.Daskalopoulos and J.King. For any n 3, 0<m<n-2n+2 and γ>0, we will construct subsolutions and supersolutions of the fast diffusion equation ut=n-1m um in Rn× (t0,T), t0<T, which decay at the rate (T-t)1+γ1-m as t T. As a consequence we obtain the existence of unique solution of the Cauchy problem ut=n-1m um in Rn× (t0,T), u(x,t0)=u0(x) in Rn, which decay at the rate (T-t)1+γ1-m as t T when u0 satisfies appropriate decay condition.