Effective stability for Gevrey and finitely differentiable prevalent Hamiltonians

Mathematics – Dynamical Systems

Scientific paper

Rate now

  [ 0.00 ] – not rated yet Voters 0   Comments 0

Details

Scientific paper

For perturbations of integrable Hamiltonians systems, the Nekhoroshev theorem shows that all solutions are stable for an exponentially long interval of time, provided the integrable part satisfies a steepness condition and the system is analytic. This fundamental result has been extended in two distinct directions. The first one is due to Niederman, who showed that under the analyticity assumption, the result holds true for a prevalent class of integrable systems which is much wider than the steep systems. The second one is due to Marco-Sauzin but it is limited to quasi-convex integrable systems, for which they showed exponential stability if the system is assumed to be only Gevrey regular. If the system is finitely differentiable, the author showed polynomial stability, still in the quasi-convex case. The goal of this work is to generalize all these results in a unified way, by proving exponential or polynomial stability for Gevrey or finitely differentiable perturbations of prevalent integrable Hamiltonian systems.

No associations

LandOfFree

Say what you really think

Search LandOfFree.com for scientists and scientific papers. Rate them and share your experience with other people.

Rating

Effective stability for Gevrey and finitely differentiable prevalent Hamiltonians does not yet have a rating. At this time, there are no reviews or comments for this scientific paper.

If you have personal experience with Effective stability for Gevrey and finitely differentiable prevalent Hamiltonians, we encourage you to share that experience with our LandOfFree.com community. Your opinion is very important and Effective stability for Gevrey and finitely differentiable prevalent Hamiltonians will most certainly appreciate the feedback.

Rate now

     

Profile ID: LFWR-SCP-O-241700

  Search
All data on this website is collected from public sources. Our data reflects the most accurate information available at the time of publication.