Wigner Functions versus WKB-Methods in Multivalued Geometrical Optics
Abstract
We consider the Cauchy-problem for a class of scalar linear dispersive equations with rapidly oscillating initial data. The problem of high-frequency asymptotics of such models is reviewed,in particular we highlight the difficulties in crossing caustics when using (time-dependent) WKB-methods. Using Wigner measures we present an alternative approach to such asymptotic problems. We first discuss the connection of the naive WKB solutions to transport equations of Liouville type (with mono-kinetic solutions) in the prebreaking regime. Further we show that the Wigner measure approach can be used to analyze high-frequency limits in the post-breaking regime, in comparison with the traditional Fourier integral operator method. Finally we present some illustrating examples.
Cite
@article{arxiv.math-ph/0109029,
title = {Wigner Functions versus WKB-Methods in Multivalued Geometrical Optics},
author = {Christof Sparber and Peter A. Markowich and Norbert J. Mauser},
journal= {arXiv preprint arXiv:math-ph/0109029},
year = {2007}
}
Comments
38 pages