- 06-243 Thierry Gallay and Mariana Haragus
- Orbital stability of periodic waves for the nonlinear Schr dinger equation
(397K, PDF)
Sep 1, 06
-
Abstract ,
Paper (src),
View paper
(auto. generated pdf),
Index
of related papers
-
Abstract. The nonlinear Schr dinger equation has several families of
quasi-periodic travelling waves, each of which can be parametrized
up to symmetries by two real numbers: the period of the modulus of
the wave profile, and the variation of its phase over a period
(Floquet exponent). In the defocusing case, we show that these
travelling waves are orbitally stable within the class of solutions
having the same period and the same Floquet exponent. This
generalizes a previous work where only small amplitude
solutions were considered. A similar result is obtained in the
focusing case, under a non-degeneracy condition which can be checked
numerically. The proof relies on the general approach to orbital
stability as developed by Grillakis, Shatah, and Strauss,
and requires a detailed analysis of the Hamiltonian system satisfied
by the wave profile.
- Files:
06-243.src(
06-243.keywords ,
Large.pdf.mm )