Accelerating fronts in semilinear wave equations

Abstract

We study dynamics of interfaces in solutions of the equation ε u + 1 ε fε(u)=0, for fε of the form fε(u) = (u2-1)(2u- ε), for ∈ R, as well as more general, but qualitatively similar, nonlinearities. We consider equations of this form both in (1+n)-dimensional Minkowski space, n 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 . In particular, in 1 dimension these interfaces behave like a relativistic point particle subject to constant acceleration.