Strichartz estimates for Maxwell equations in media: the fully anisotropic case
Abstract:
We prove Strichartz estimates for Maxwell equations in media in the fully anisotropic case with Hölder-continuous coefficients. To this end, we use the FBI transform to conjugate the problem to phase space. After reducing to a scalar estimate by means of a matrix symmetrizer, we show oscillatory integral estimates for a variable-coefficient Fourier extension operator. The characteristic surface has conical singularities for any non-vanishing time frequency. Combined with energy estimates, we improve the local well-posedness for certain fully anisotropic quasilinear Maxwell equations.
| Zugehörige Institution(en) am KIT | Institut für Analysis (IANA) Sonderforschungsbereich 1173 (SFB 1173) |
| Publikationstyp | Forschungsbericht/Preprint |
| Publikationsmonat/-jahr | 11.2022 |
| Sprache | Englisch |
| Identifikator | ISSN: 2365-662X KITopen-ID: 1000153212 |
| Verlag | Karlsruher Institut für Technologie (KIT) |
| Umfang | 40 S. |
| Serie | CRC 1173 Preprint ; 2022/65 |
| Projektinformation | SFB 1173, 258734477 (DFG, DFG KOORD, SFB 1173/2 2019) |
| Externe Relationen | Siehe auch |
| Schlagwörter | Maxwell equations, Strichartz estimates, quasilinear wave equation, rough coefficients, half wave equation, FBI transform |