Geometry driven Type II higher dimensional blow-up for the critical heat equation

Abstract

We consider the problem vt & = v+ |v|p-1v in \ × (0, T), v & =0 on ∂ × (0, T ) , v& >0 in \ × (0, T) . In a domain ⊂ Rd, d 7 enjoying special symmetries, we find the first example of a solution with type II blow-up for a power p less than the Joseph-Lundgren exponent pJL(d)=∞, & if 3 d 10, 1+4 d-4-2\,d-1, & if d11. No type II radial blow-up is present for p< pJL(d). We take p=d+1d-3, the Sobolev critical exponent in one dimension less. The solution blows up on circle contained in a negatively curved part of the boundary in the form of a sharply scaled Aubin-Talenti bubble, approaching its energy density a Dirac measure for the curve. This is a completely new phenomenon for a diffusion setting.