Normally hyperbolic invariant manifold explained
A normally hyperbolic invariant manifold (NHIM) is a natural generalization of a hyperbolic fixed point and a hyperbolic set. The difference can be described heuristically as follows: For a manifold
to be normally hyperbolic we are allowed to assume that the dynamics of
itself is neutral compared with the dynamics nearby, which is not allowed for a hyperbolic set. NHIMs were introduced by Neil Fenichel in 1972.
[1] In this and subsequent papers,
[2] [3] Fenichel proves that NHIMs possess stable and unstable manifolds and more importantly, NHIMs and their stable and unstable manifolds persist under small perturbations. Thus, in problems involving perturbation theory, invariant manifolds exist with certain hyperbolicity properties, which can in turn be used to obtain qualitative information about a dynamical system.
[4] Definition
Let M be a compact smooth manifold, f: M → M a diffeomorphism, and Df: TM → TM the differential of f. An f-invariant submanifold Λ of M is said to be a normally hyperbolic invariant manifold if the restriction to Λ of the tangent bundle of M admits a splitting into a sum of three Df-invariant subbundles, one being the tangent bundle of
, the others being the
stable bundle and the
unstable bundle and denoted
Es and
Eu, respectively. With respect to some Riemannian metric on
M, the restriction of
Df to
Es must be a contraction and the restriction of
Df to
Eu must be an expansion, and must be relatively neutral on
. Thus, there exist constants
and
c > 0 such that
(Df)x
=
and(Df)x
=
forallx\inΛ,
\|Dfnv\|\lecλn\|v\|forallv\inEsandn>0,
\|Df-nv\|\lecλn\|v\|forallv\inEuandn>0,
and
\|Dfnv\|\lec\mu|n|\|v\|forallv\inTΛandn\inZ.
See also
References
- Persistence and Smoothness of Invariant Manifolds for Flows. Indiana Univ. Math. J.. 1972. N . Fenichel. 21. 3. 193 - 226. 10.1512/iumj.1971.21.21017. free.
- Asymptotic Stability With Rate Conditions. Indiana Univ. Math. J.. 1974. N . Fenichel. 23. 12. 1109 - 1137. 10.1512/iumj.1974.23.23090. free.
- Asymptotic Stability with Rate Conditions II. Indiana Univ. Math. J.. 1977. N . Fenichel. 26. 1. 81 - 93. 10.1512/iumj.1977.26.26006. free.
- A. Katok and B. HasselblattIntroduction to the Modern Theory of Dynamical Systems, Cambridge University Press (1996),
- M.W. Hirsch, C.C Pugh, and M. Shub Invariant Manifolds, Springer-Verlag (1977),