Global existence and lifespan for semilinear wave equations with mixed nonlinear terms

Abstract

Firstly, we study the equation u = |u|qc+ |∂ u|p with small data, where qc is the critical power of Strauss conjecture and p≥ qc. We obtain the optimal lifespan (T)≈-qc(qc-1) in n=3, and improve the lower-bound of T from (c-(qc-1)) to (c-(qc-1)2/2) in n=2. Then, we study the Cauchy problem with small initial data for a system of semilinear wave equations u = |v|q, v = |∂t u|p in 3-dimensional space with q<2. We obtain that this system admits a global solution above a p-q curve for spherically symmetric data. On the contrary, we get a new region where the solution will blow up.