Construction of type II blow-up solutions for the energy-critical wave equation in dimension 5

Abstract

We consider the semilinear wave equation with focusing energy-critical nonlinearity in space dimension 5 with radial data. It is known that a solution (u, ∂t u) which blows up at t = 0 in a neighborhood (in the energy norm) of the family of solitons Wλ, asymptotically decomposes in the energy space as a sum of a bubble Wλ and an asymptotic profile (u0*, u1*), where t 0λ(t)/t = 0 and (u*0, u*1) ∈ H1× L2. We construct a blow-up solution of this type such that (u*0, u*1) is any pair of sufficiently regular functions with u0*(0) > 0. For these solutions the concentration rate is λ(t) t4. We also provide examples of solutions with concentration rate λ(t) t + 1 for > 8, related to the behaviour of the asymptotic profile near the origin.