A type II blowup for the six dimensional energy critical heat equation

Abstract

We study blowup solutions of the 6D energy critical heat equation ut= u+|u|p-1u in n×(0,T). A goal of this paper is to show the existence of type II blowup solutions predicted by Filippas, Herrero and Vel\'azquez FilippasHV. The dimension six is a border case whether a type II blowup can occur or not. Therefore the behavior of the solution is quite different from other cases. In fact, our solution behaves like \[ u(x,t)≈ cases λ(t)-2 Q(λ(t)-1x) & in the inner region: |x|λ(t), -(p-1)1p-1(T-t)-1p-1 & in the selfsimilar region: |x|T-t cases \] with λ(t)=(1+o(1))(T-t)54|(T-t)|-158. The local energy Eloc(u) =12\|∇ u\|L2(|x|<1)2-13\|u\|L3(|x|<1)3 of the solution goes to -∞.