Dual Variational Methods for a nonlinear Helmholtz system
Analysis of PDEs
2018-08-10 v2
Abstract
This paper considers a pair of coupled nonlinear Helmholtz equations \begin{align*} -\Delta u - \mu u = a(x) \left( |u|^\frac{p}{2} + b(x) |v|^\frac{p}{2} \right)|u|^{\frac{p}{2} - 2}u, \end{align*} \begin{align*} -\Delta v - \nu v = a(x) \left( |v|^\frac{p}{2} + b(x) |u|^\frac{p}{2} \right)|v|^{\frac{p}{2} - 2}v \end{align*} on where . The existence of nontrivial strong solutions in is established using dual variational methods. The focus lies on necessary and sufficient conditions on the parameters deciding whether or not both components of such solutions are nontrivial.
Keywords
Cite
@article{arxiv.1710.04526,
title = {Dual Variational Methods for a nonlinear Helmholtz system},
author = {Rainer Mandel and Dominic Scheider},
journal= {arXiv preprint arXiv:1710.04526},
year = {2018}
}
Comments
Published version. Contains minor revisions: Quote added, explanations on p.12 concerning F_{\mu\nu} = \infty, correction of exponent on p.18