Kerr–Debye relaxation shock profiles for Kerr equations
| Autor: | Denise Aregba-Driollet, Bernard Hanouzet |
|---|---|
| Rok vydání: | 2011 |
| Předmět: |
Physics
Plane (geometry) Wave propagation Applied Mathematics General Mathematics Physics::Optics Sense (electronics) Classification of discontinuities Shock (mechanics) General Relativity and Quantum Cosmology Amplitude Classical mechanics Nonlinear medium Relaxation (approximation) Nonlinear Sciences::Pattern Formation and Solitons |
| Zdroj: | Communications in Mathematical Sciences. 9:1-31 |
| ISSN: | 1945-0796 1539-6746 |
| DOI: | 10.4310/cms.2011.v9.n1.a1 |
| Popis: | The electromagnetic wave propagation in a nonlinear medium can be described by a Kerr model in the case of an instantaneous response of the material, or by a Kerr-Debye model if the material exhibits a finite response time. Both models are quasilinear hyperbolic, and Kerr-Debye model is a physical relaxation approximation of Kerr model. In this paper we characterize the shocks in the Kerr model for which there exists a Kerr-Debye profile. First we consider 1D models for which explicit calculations are performed. Then we determine the plane discontinuities of the full vector 3D Kerr system and their admissibility in the sense of Liu and in the sense of Lax. At last we characterize the large amplitude Kerr shocks giving rise to the existence of Kerr-Debye relaxation profiles. |
| Databáze: | OpenAIRE |
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