Infinite time blow-up for the 3-dimensional energy critical heat equation

Abstract

We construct globally defined in time, unbounded positive solutions to the energy-critical heat equation in dimension three ut = u + u5 , in 3 × (0,∞), \ \ u(x, 0)= u0 (x)∈n 3. For each γ>1 we find initial data (not necessarily radially symmetric) with r ∞ |x|γ u0 (x) >0 such that as t ∞ \| u(· ,t ) \|∞ tγ-1 2 , if 1<γ <2, \| u(· ,t ) \|∞ t, if γ >2, and \| u(· , t)\|∞ t\, ( t )-1 , if γ = 2. Furthermore we show that this infinite time blow-up is co-dimensional one stable. The existence of such solutions was conjectured by Fila and King.