Wave equation with concentrated nonlinearities
Abstract
In this paper we address the problem of wave dynamics in presence of concentrated nonlinearities. Given a vector field on an open subset of and a discrete set with elements, we define a nonlinear operator on which coincides with the free Laplacian when restricted to regular functions vanishing at , and which reduces to the usual Laplacian with point interactions placed at when is linear and is represented by an Hermitean matrix. We then consider the nonlinear wave equation and study the corresponding Cauchy problem, giving an existence and uniqueness result in the case is Lipschitz. The solution of such a problem is explicitly expressed in terms of the solutions of two Cauchy problem: one relative to a free wave equation and the other relative to an inhomogeneous ordinary differential equation with delay and principal part . Main properties of the solution are given and, when is a singleton, the mechanism and details of blow-up are studied.
Cite
@article{arxiv.math-ph/0411060,
title = {Wave equation with concentrated nonlinearities},
author = {Diego Noja and Andrea Posilicano},
journal= {arXiv preprint arXiv:math-ph/0411060},
year = {2009}
}
Comments
Revised version. To appear in Journal of Physics A: Mathematical and General, special issue on Singular Interactions in Quantum Mechanics: Solvable Models