1990
DOI: 10.1017/s0308210500031371
|View full text |Cite
|
Sign up to set email alerts
|

Invariant manifolds in singular perturbation problems for ordinary differential equations

Abstract: SynopsisBased on Fenichel's geometric idea, invariant manifold theory is applied to singular perturbation problems. This approach clarifies the nature of outer and inner solutions. A specific condition is given to ensure the existence of heteroclinic connections between normally hyperbolic invariant manifolds. A method to approximate the connections is also presented.

Help me understand this report

Search citation statements

Order By: Relevance

Paper Sections

Select...
2
1
1

Citation Types

1
80
0

Year Published

1993
1993
2012
2012

Publication Types

Select...
7
1

Relationship

0
8

Authors

Journals

citations
Cited by 89 publications
(81 citation statements)
references
References 13 publications
1
80
0
Order By: Relevance
“…Later on, the works by Knobloch and Aulbach [25], Nipp [30], and Sakamoto [33] also presented results similar to [12]. By now, the theory is fairly standard, and there have been enormous applications to traveling waves of partial differential equations, see [23] and the references there.…”
Section: Geometric Singular Perturbation Theorymentioning
confidence: 94%
See 1 more Smart Citation
“…Later on, the works by Knobloch and Aulbach [25], Nipp [30], and Sakamoto [33] also presented results similar to [12]. By now, the theory is fairly standard, and there have been enormous applications to traveling waves of partial differential equations, see [23] and the references there.…”
Section: Geometric Singular Perturbation Theorymentioning
confidence: 94%
“…To apply geometric singular perturbation theorems to the vector field on R n × R m × [0, ε 0 ], we use the theorems stated in [33]. The following lemma is a restatement of the theorems in [33], and we refer to [33] for the proof.…”
Section: Geometric Singular Perturbation Theorymentioning
confidence: 99%
“…This theorem is formulated in a specific setting: we assume that the invariant manifold M is (nearly) the zero section of a trivial vector bundle. This is a slightly more general formulation than in [Hen81;Sak90]. There, it is assumed that in a product X × Y of Euclidean (or Banach) spaces, the invariant manifold M is given as the graph of a function h : X → Y .…”
Section: Persistence Of Noncompact Nhimsmentioning
confidence: 99%
“…This is similar, but developed independently from Sakamoto's work [Sak90] in which he used the same ideas to study singular perturbation problems. We improve these results in a couple of ways.…”
mentioning
confidence: 93%
“…The dynamics on I ε is governed byẋ = f 1 (x, h ε (x), ε), i.e., The C 1 b -estimate (5.34) is not given explicitly in [7], but may be validated along the lines of [16,15] …”
Section: Construction Of the Center Manifoldmentioning
confidence: 99%