97-106 Bambusi D.

LONG TIME STABILITY OF SOME SMALL AMPLITUDE SOLUTIONS IN NONLINEAR SCHR\"ODINGER EQUATIONS (252K, Postscript) Mar 7, 97

Abstract , Paper (src), View paper (auto. generated ps), Index of related papers

Abstract. We consider small perturbations of the Zakharov-Shabat nonlinear schroedinger equation on $[0,\pi]$ with vanishing or periodic boundary conditions; we prove a Nekhoroshev type result for solutions starting in the neighbourhood (in the $H^1$ topology) of the majority of small amplitude finite dimensional invariant tori of the linearized system. More precisely we will prove that along the considered solutions all the actions of the linearized system are approximatively constant up to times growing exponentially with the inverse of a suitable small parameter.

Files: 97-106.src( desc , 97-106.ps )