Existence of Neumann and singular solutions of the fast diffusion equation

Abstract

Let be a smooth bounded domain in n, n 3, 0<mn-2n, a1,a2,..., ai0∈, δ0=1 i i0dist (ai,\1) and let δ=i=1i0Bδ(ai) and =\a1\,...,ai0\. For any 0<δ<δ0 we will prove the existence and uniqueness of positive solution of the Neumann problem for the equation ut= um in δ× (0,T) for some T>0. We will prove the existence of singular solutions of this equation in × (0,T) for some T>0 that blow-up at the points a1,..., ai0.