Global existence and blow up for systems of nonlinear wave equations related to the weak null condition

TL;DR

This paper investigates the global existence and blow-up phenomena for a class of nonlinear wave systems, identifying critical conditions and demonstrating new results related to the weak null condition in multiple dimensions.

Contribution

It introduces a critical curve on the pq-plane dictating solution behavior and establishes global existence results for systems satisfying the weak null condition.

Findings

Existence of a critical curve separating global existence and blow-up regimes.

Global solutions exist on the critical curve for small initial data.

Higher-order term |u|^q significantly influences lifespan, especially in 2D cases.

Abstract

We discuss how the higher-order term $|u|^q$ $(q>1+2/(n-1))$ has nontrivial effects in the lifespan of small solutions to the Cauchy problem for the system of nonlinear wave equations $$ \partial_t^2 u-\Delta u=|v|^p, \qquad \partial_t^2 v-\Delta v=|\partial_t u|^{(n+1)/(n-1)} +|u|^q $$ in $n\,(\geq 2)$ space dimensions. We show the existence of a certain "critical curve" on the $pq$-plane such that for any $(p,q)$ $(p,q>1)$ lying below the curve, nonexistence of global solutions occurs, whereas for any $(p,q)$ $(p>1+3/(n-1),\,q>1+2/(n-1))$ lying exactly on it, this system admits a unique global solution for small data. When $n=3$, the discussion for the above system with $(p,q)=(3,3)$, which lies on the critical curve, has relevance to the study on systems satisfying the weak null condition, and we obtain a new result of global existence for such systems. Moreover, in the particular case of $n=2$ and $p=4$ it is observed that no matter how large $q$ is, the higher-order term $|u|^q$ never becomes negligible and it essentially affects the lifespan of small solutions.