Spectral Properties and Stability of Self-Similar Wave Maps
Details
In this thesis the Cauchy problem and in particular the question of singularity formation for co-rotational wave maps from Minkowski space to the three-sphere is studied. Numerics indicate that self-similar solutions play a crucial role in dynamical time evolution. In particular, it is conjectured that a certain solution f defines a universal blow up pattern in the sense that the future development of a large set of generic blow up initial data approaches f. Thus, singularity formation is closely related to stability properties of self-similar solutions. In this work, the problem of linear stability is studied by functional analytic methods. In particular, a complete spectral analysis of the perturbation operators is given and well-posedness of the linearized Cauchy problem is proved by means of semigroup theory and, alternatively, the functional calculus for self-adjoint operators. These results lead to growth estimates which provide information on the stability of self-similar wave maps. The thesis is intended to be self-contained, i.e. all the mathematical requirements are carefully introduced, including proofs for many results which could be found elsewhere.
Autorentext
Roland Donninger, Mag. Dr.: Studies of Mathematics and Physics, University of Vienna, Austria. Postdoctoral researcher, Faculty of Physics, University of Vienna.
Weitere Informationen
- Allgemeine Informationen
- GTIN 09783838101873
- Sprache Deutsch
- Genre Weitere Mathematik-Bücher
- Größe H220mm x B150mm x T9mm
- Jahr 2009
- EAN 9783838101873
- Format Kartonierter Einband
- ISBN 978-3-8381-0187-3
- Veröffentlichung 02.02.2009
- Titel Spectral Properties and Stability of Self-Similar Wave Maps
- Autor Roland Donninger
- Untertitel Linear Stability of Co-rotational Solutions
- Gewicht 238g
- Herausgeber Südwestdeutscher Verlag für Hochschulschriften
- Anzahl Seiten 148