Infinite time blow-up for the three dimensional energy critical heat equation in bounded domains

Abstract

We consider the Dirichlet problem for the energy-critical heat equation equation* cases ut= u+u5,~& in × R+,\\ u(x,t)=0,~& on ∂ × R+,\\ u(x,0)=u0(x),~& in , cases equation* where is a bounded smooth domain in R3. Let Hγ(x,y) be the regular part of the Green function of --γ in , where γ ∈ (0,λ1) and λ1 is the first Dirichlet eigenvalue of -. Then, given a point q∈ such that 3γ(q)<λ1, where γ(q)=\ γ>0: Hγ(q,q)>0 \, we prove the existence of a non-radial global positive and smooth solution u(x,t) which blows up in infinite time with spike in q. The solution has the asymptotic profile u(x,t) 314 (μ(t)μ(t)2+|x-(t)|2)12 as t ∞, where - μ(t)= 2γ(q) t(1+o(1)), (t)=q+O(μ(t)) as t ∞.