Global Existence Of Smooth Solutions Of A 3D Loglog Energy-Supercritical Wave Equation

Abstract

We prove global existence of smooth solutions of the 3D loglog energy-supercritical wave equation ∂tt u - u = -u5 c (log(10+u2)) with 0 < c < 8/225 and smooth initial data (u(0)=u0, ∂t u(0)=u1). First we control the Lt4 Lx12 norm of the solution on an arbitrary size time interval by an expression depending on the energy and an a priori upper bound of its Lt∞ H2(R3) norm, with H2(R3):=H2(R3) H1(R3). The proof of this long time estimate relies upon the use of some potential decay estimates bahger, shatstruwe and a modification of an argument in taolog. Then we find an a posteriori upper bound of the Lt∞ H2(R3) norm of the solution by combining the long time estimate with an induction on time of the Strichartz estimates.