# Lower Bound of the Lifespan of the Solution to Systems of Quasi-linear   Wave Equations with Multiple Propagation Speeds

**Authors:** Akira Hoshiga

arXiv: 1706.09127 · 2017-06-29

## TL;DR

This paper investigates the lifespan of solutions to 2D systems of quasi-linear wave equations with multiple speeds, especially when cubic nonlinearities do not satisfy the strong null-condition, using advanced energy and estimate techniques.

## Contribution

It provides a lower bound on the lifespan of solutions when the strong null-condition is not met, extending understanding of solution longevity in complex wave systems.

## Key findings

- Established a lower bound for solution lifespan
- Extended analysis to cases lacking strong null-condition
- Improved energy estimate methods for quasi-linear systems

## Abstract

We consider the Cauchy problem of systems of quasilinear wave equations in 2-dimensional space. We assume that the propagation speeds are distinct and that the nonlinearities contain quadratic and cubic terms of the first and second order derivatives of the solution. We know that if the all quadratic and cubic terms of nonlinearities satisfy $Strong$ $Null$-$condition$, then there exists a global solution for sufficiently small initial data. In this paper, we study about the lifespan of the smooth solution, when the cubic terms in the quasi-linear nonlinearities do not satisfy the Strong null-condition. In the proof of our claim, we use the $ghost$ $weight$ energy method and the $L^{\infty}$-$L^{\infty}$ estimates of the solution, which is slightly improved.

## Full text

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## References

12 references — full list in the complete paper: https://tomesphere.com/paper/1706.09127/full.md

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Source: https://tomesphere.com/paper/1706.09127