Existence and stability of infinite time bubble towers in the energy critical heat equation

Abstract

We consider the energy critical heat equation in Rn for n 7 \ aligned ut & = u+ |u| 4n-2u in \ Rn × (0, ∞), \\ u(·,0) & = u0 \ in \ Rn, aligned. which corresponds to the L2-gradient flow of the Sobolev-critical energy J(u) = ∫ Rn e[u] , e[u] := 12 |∇ u|2 - n-22n |u| 2nn-2 . Given any k 2 we find an initial condition u0 that leads to sign-changing solutions with multiple blow-up at a single point (tower of bubbles) as t +∞. It has the form of a superposition with alternate signs of singularly scaled Aubin-Talenti solitons, u(x,t) = Σj=1k (-1)j-1 μj- n-22 U ( xμj )\, +\, o(1) as t +∞ where U(y) is the standard soliton U(y) = % (n(n-2)) 1n-2 αn ( 11+|y|2)n-22 and μj(t) = βj t- αj, αj = 12 ( \, ( n-2n-6)j-1 -1 ). Letting δ0 the Dirac mass, we have energy concentration of the form e[ u(·, t)]- e[U] (k-1) Sn\,δ0 as t +∞ where Sn=J(U). The initial condition can be chosen radial and compactly supported. We establish the codimension k+ n (k-1) stability of this phenomenon for perturbations of the initial condition that have space decay u0(x) =O( |x|-α), α > n-22, which yields finite energy of the solution.