A blow-up result for the wave equation with localized initial data: the scale-invariant damping and mass term with combined nonlinearities

Abstract

We are interested in this article in studying the damped wave equation with localized initial data, in the scale-invariant case with mass term and two combined nonlinearities. More precisely, we consider the following equation: (E) 1cm utt- u+μ1+tut+2(1+t)2u=|ut|p+|u|q, in\ RN×[0,∞), with small initial data. Under some assumptions on the mass and damping coefficients, and μ>0, respectively, we show that blow-up region and the lifespan bound of the solution of (E) remain the same as the ones obtained in Our2 in the case of a mass-free wave equation, it i.e. (E) with =0. Furthermore, using in part the computations done for (E), we enhance the result in Palmieri on the Glassey conjecture for the solution of (E) with omitting the nonlinear term |u|q. Indeed, the blow-up region is extended from p ∈ (1, pG(N+σ)], where σ is given by (1.12) below, to p ∈ (1, pG(N+μ)] yielding, hence, a better estimate of the lifespan when (μ-1)2-42<1. Otherwise, the two results coincide. Finally, we may conclude that the mass term has no influence on the dynamics of (E) (resp. (E) without the nonlinear term |u|q), and the conjecture we made in Our2 on the threshold between the blow-up and the global existence regions obtained holds true here.