New type II Finite time blow-up for the energy supercritical heat equation

Abstract

We consider the energy supercritical heat equation with the (n-3)-th Sobolev exponent equation* cases ut= u+u3,~& in × (0,T),\\ u(x,t)=u|∂,~& on ∂× (0,T),\\ u(x,0)=u0(x),~& in , cases equation* where 5≤ n≤ 7, =n or ⊂ n is a smooth, bounded domain enjoying special symmetries. We construct type II finite time blow-up solution u(x,t) with the singularity taking place along an (n-4)-dimensional shrinking sphere in . More precisely, at leading order, the solution u(x,t) is of the sharply scaled form u(x,t)≈ -1(t)221+|(r,z)-(r(t),z(t))(t)|2 where r=x12+·s+xn-32, z=(xn-2,xn-1,xn) with x=(x1,·s,xn)∈. Moreover, the singularity location (r(t),z(t)) (2(n-4)(T-t),z0)~ as ~t T, for some fixed z0, and the blow-up rate (t) T-t|(T-t)|2~ as ~t T. This is a completely new phenomenon in the parabolic setting.