1. Wigner functions versus WKB‐methods in multivalued geometrical optics.
- Author
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Sparber, Christof, Markowich, Peter A., and Mauser, Norbert J.
- Subjects
- *
CAUCHY problem , *SCALAR field theory , *ASYMPTOTIC theory in mathematical physics , *CAUSTICS (Optics) , *FOURIER integral operators - Abstract
We consider the Cauchy problem for a class of scalar linear dispersive equations with rapidly oscillating initial data. The problem of the 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 pre‐breaking regime. Further we show how 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. [ABSTRACT FROM AUTHOR]
- Published
- 2003