The blow-up rate for a log non-scaling invariant semilinear wave equation in the conformal regime

Abstract

We consider the blow-up behavior of solutions to the semilinear wave equation ∂t2 u - u = |u|p-1u a(u2+2), \ (x,t)∈ Rn × [0,T), in the conformal case p = pc = 1 + 4n-1. Previous results in HZjmaa2020, HZ2022 show that for a ∈ R , solutions in the subconformal regime p < pc blow up with a Type~I rate at any non-characteristic point. The objective of this work is to extend this blow-up rate to the conformal regime under the assumption a<0. We establish an a priori upper bound for any blow-up solution and construct a Lyapunov functional in similarity variables. The resulting functional exhibits only weak dissipation, which necessitates delicate energy arguments to obtain the sharp blow-up rate in the conformal case. To the best of our knowledge, this provides the first result for the blow-up rate in a critical framework for an evolution problem where the scaling symmetry is broken.