Improvement on the blow-up of the wave equation with the scale-invariant damping and combined nonlinearities

Abstract

We consider in this article the damped wave equation, in the scale-invariant case with combined two nonlinearities, which reads as follows: displaymath (E) 1cm utt- u+μ1+tut=|ut|p+|u|q, in\ N×[0,∞), displaymath with small initial data.\\ Compared to our previous work Our, we show in this article that the first hypothesis on the damping coefficient μ, namely μ < N(q-1)2, can be removed, and the second one can be extended from (0, μ*/2) to (0, μ*) where μ*>0 is solution of (q-1)((N+μ*-1)p-2) = 4. Indeed, owing to a better understanding of the influence of the damping term in the global dynamics of the solution, we think that this new interval for μ describe better the threshold between the blow-up and the global existence regions. Moreover, taking advantage of the techniques employed in the problem (E), we also improve the result in LT2,Palmieri in relationship with the Glassey conjecture for the solution of (E) but without the nonlinear term |u|q. More precisely, we extend the blow-up region from p ∈ (1, pG(N+σ)], where σ is given by sigma below, to p ∈ (1, pG(N+μ)] giving thus a better estimate of the lifespan in this case.