Blow-up for sign-changing solutions of the critical heat equation in domains with a small hole

Abstract

We consider the critical heat equation equation CHCH arraylr vt- v =|v|4n-2v & ε× (0, +∞) \\ v=0 & ∂ε× (0, +∞) \\ v=v0 & in ε× \t=0\ array equation in ε:= Bε(x0) where is a smooth bounded domain in RN, N≥ 3 and Bε(x0) is a ball of RN of center x0∈ and radius ε >0 small. \\ We show that if ε>0 is small enough, then there exists a sign-changing stationary solution φε of CH such that the solution of CH with initial value v0=λ φε blows up in finite time if |λ -1|>0 is sufficiently small.\\ This shows in particular that the set of the initial conditions for which the solution of CH is global and bounded is not star-shaped.