On wave equations of the p-Laplacian type with supercritical nonlinearities

Abstract

This article focuses on a quasilinear wave equation of p-Laplacian type: \[ utt - p u - ut = f(u) \] in a bounded domain ⊂ R3 with a sufficiently smooth boundary =∂ subject to a generalized Robin boundary condition featuring boundary damping and a nonlinear source term. The operator p, 2<p<3, denotes the classical p-Laplacian. The interior and boundary terms f(u), h(u) are sources that are allowed to have a supercritical exponent, in the sense that their associated Nemytskii operators are not locally Lipschitz from W1,p() into L2() or L2(). Under suitable assumptions on the parameters we provide a rigorous proof of existence of a local weak solution which can be extended globally in time, provided the damping terms dominates the corresponding sources in an appropriate sense. Moreover, a blow-up result is proved for solutions with negative initial total energy.