Maciej J. Capiński, Piotr Zgliczyński
Published 2015-03-11Version 1
We present a new proof of the existence of normally hyperbolic manifolds and their whiskers for maps. Our result is not perturbative. Based on the bounds on the map and its derivative, we establish the existence of the manifold within a given neighbourhood. Our proof follows from a graph transform type method and is performed in the state space of the system. We do not require the map to be invertible. From our method follows also the smoothness of the established manifolds, which depends on the smoothness of the map, as well as rate conditions, which follow from bounds on the derivative of the map. Our method is tailor made for rigorous, interval arithmetic based, computer assisted validation of the needed assumptions.
Comments: 64 pages, 4 figures
Normally hyperbolic invariant manifolds near strong double resonance
The exponential dichotomy and invariant manifolds for some classes of differential equations
A geometric proof of the Affability Theorem for planar tilings
![QR code for arXiv:1503.03323 [math.DS]](http://oss.arxitics.com/images/favicon.svg)