Hyperbolic Limit Sets
Open Access
- 1 May 1972
- journal article
- Published by JSTOR in Transactions of the American Mathematical Society
- Vol. 167, 125-150
- https://doi.org/10.2307/1996131
Abstract
Many known results for diffeomorphisms satisfying Axiom A are shown to be true with weaker assumptions. It is proved that if the negative limit set of a diffeomorphism f is hyperbolic, then the periodic points of f are dense in . A spectral decomposition theorem and a filtration theorem for such diffeomorphisms are obtained and used to prove that if is hyperbolic and has no cycles, then f satisfies Axiom A, and hence is -stable. Examples are given where is hyperbolic, there are cycles, and f fails to satisfy Axiom A.
Keywords
This publication has 9 references indexed in Scilit:
- NONGENERICITY OF Ω-STABILITYPublished by World Scientific Pub Co Pte Ltd ,2010
- A Structural Stability TheoremAnnals of Mathematics, 1971
- On semi-stability for diffeomorphismsInventiones Mathematicae, 1971
- Neighborhoods of hyperbolic setsInventiones Mathematicae, 1970
- Stable manifolds and hyperbolic setsPublished by American Mathematical Society (AMS) ,1970
- The Ω-stability theoremPublished by American Mathematical Society (AMS) ,1970
- Structural stability theoremsProceedings of Symposia in Pure Mathematics, 1970
- On Morse-Smale dynamical systemsTopology, 1969
- Diffeomorphisms with Many Periodic PointsPublished by Walter de Gruyter GmbH ,1965