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References (8)
-
V. P. Palamodov (2000)
Dynamics of wave propagation and curvature of discriminantsAnn. Inst. Fourier, 50
-
R. Luneburg, Allen King (1966)
Mathematical Theory of OpticsAmerican Journal of Physics, 34
-
M. L. Levin, S. M. Rytov (1956)
The transition to a geometric approximation in the theory of elasticitySoviet Phys. Acoust., 2
-
V. Palamodov (2000)
Dynamics of wave propagation and curvature of discriminantsAnnales de l'Institut Fourier, 50
-
M. Kline, I. Kay (1965)
Electromagnetic theory and geometrical optics -
L. Hörmander (1995)
Fourier integral operators. IActa Mathematica, 127
-
W. Pauli (1932)
Dirac Wellengleichung des Elektrons und geometrische OptikHelv. Phys. Acta, 5
-
S. M. Rytov (1938)
The transition from wave to geometric opticsDoklady AN SSSR, 43
- Publisher
- Springer Journals
- Copyright
- Copyright © 2002 by Kluwer Academic Publishers
- Subject
- Mathematics; Mathematics, general; Computer Science, general; Theoretical, Mathematical and Computational Physics; Complex Systems; Classical Mechanics
- ISSN
- 0167-8019
- eISSN
- 1572-9036
- DOI
- 10.1023/A:1020565914977
- Publisher site
- See Article on Publisher Site
Abstract
The Maxwell system in inhomogeneous medium as well as the elasticity system are considered. We give a sharp form to the conservation laws of geometrical optics in the terms of the distribution theory. We show that the conservation laws keep to hold through any singular point of the wave front.
Journal
Acta Applicandae Mathematicae – Springer Journals
Published: Oct 10, 2004