Test function method for blow-up phenomena of semilinear wave equations and their weakly coupled systems

Abstract

In this paper we consider the wave equations with power type nonlinearities including time-derivatives of unknown functions and their weakly coupled systems. We propose a framework of test function method and give a simple proof of the derivation of sharp upper bound of lifespan of solutions to nonlinear wave equations and their systems. We point out that for respective critical case, we use a family of self-similar solution to the standard wave equation including Gauss's hypergeometric functions which are originally introduced by Zhou (1992). However, our framework is much simpler than that. As a consequence, we found new (p,q)-curve for the system ∂t2u- u=|v|q, ∂t2v- v=|∂tu|p and lifespan estimate for small solutions for new region.