Slow Manifolds for Infinite-Dimensional Evolution Equations
Abstract
We extend classical finite-dimensional Fenichel theory in two directions to infinite dimensions. Under comparably weak assumptions we show that the solution of an infinite-dimensional fast-slow system is approximated well by the corresponding slow flow. After that we construct a two-parameter family of slow manifolds under more restrictive assumptions on the linear part of the slow equation. The second parameter does not appear in the finite-dimensional setting and describes a certain splitting of the slow variable space in a fast decaying part and its complement. The finite-dimensional setting is contained as a special case in which does not depend on . Finally, we apply our new techniques to three examples of fast-slow systems of partial differential equations.
Cite
@article{arxiv.2008.10700,
title = {Slow Manifolds for Infinite-Dimensional Evolution Equations},
author = {Felix Hummel and Christian Kuehn},
journal= {arXiv preprint arXiv:2008.10700},
year = {2020}
}
Comments
53 pages