English

Accelerating fronts in semilinear wave equations

Analysis of PDEs 2013-01-28 v2

Abstract

We study dynamics of interfaces in solutions of the equation ϵu+1ϵfϵ(u)=0\epsilon \Box u + \frac 1 \epsilon f_\epsilon(u)=0, for fϵf_\epsilon of the form fϵ(u)=(u21)(2uϵκ)f_\epsilon(u) = (u^2-1)(2u- \epsilon\kappa), for κR\kappa\in {\mathbb R}, as well as more general, but qualitatively similar, nonlinearities. We consider equations of this form both in (1+n)(1+n)-dimensional Minkowski space, n1n\ge 1, and on certain more general Lorentzian manifolds, and we prove that for suitable initial data, solutions exhibit interfaces that sweep out timelike hypersurfaces of mean curvature proportional to κ\kappa. In particular, in 1 dimension these interfaces behave like a relativistic point particle subject to constant acceleration.

Keywords

Cite

@article{arxiv.1301.5609,
  title  = {Accelerating fronts in semilinear wave equations},
  author = {Bernardo Galvão-Sousa and Robert L. Jerrard},
  journal= {arXiv preprint arXiv:1301.5609},
  year   = {2013}
}

Comments

28 pages, 2 figures

R2 v1 2026-06-21T23:14:22.072Z