Your search keyword '"Lee Manseob"' showing total 18 results

1. Asymptotic measure-expansiveness for generic diffeomorphisms

Author

Lee Manseob

Subjects

expansive, measure expansive, asymptotic measure expansive, generic, axiom a, homoclinic class, hyperbolic, 37c20, 37d20, Mathematics, QA1-939

Abstract

In this paper, we will assume MM to be a compact smooth manifold and f:M→Mf:M\to M to be a diffeomorphism. We herein demonstrate that a C1{C}^{1} generic diffeomorphism ff is Axiom A and has no cycles if ff is asymptotic measure expansive. Additionally, for a C1{C}^{1} generic diffeomorphism ff, if a homoclinic class H(p,f)H\left(\hspace{0.08em}p,f) that contains a hyperbolic periodic point pp of ff is asymptotic measure-expansive, then H(p,f)H\left(\hspace{0.08em}p,f) is hyperbolic of ff.

Published

2021

2. Orbital shadowing property on chain transitive sets for generic diffeomorphisms

Author

Lee Manseob

Subjects

shadowing, orbital shadowing, chain transitive set, homoclinic class, chain recurrence class, hyperbolic, generic, primary 37c50, secondary 34d10, Mathematics, QA1-939

Abstract

Let f : M → M be a diffeomorphism on a closed smooth n(≥ 2) dimensional manifold M. We show that C1 generically, if a diffeomorphism f has the orbital shadowing property on locally maximal chain transitive sets which admits a dominated splitting then it is hyperbolic.

Published

2020

3. Lyapunov stable homoclinic classes for smooth vector fields

Author

Lee Manseob

Subjects

homoclinic class, lyapunov stable, shadowing, generic, hyperbolic, 37c50, 37c10, 37c20, 37c29, 37d05, Mathematics, QA1-939

Abstract

In this paper, we show that for generic C1, if a flow Xt has the shadowing property on a bi-Lyapunov stable homoclinic class, then it does not contain any singularity and it is hyperbolic.

Published

2019

4. Asymptotic orbital shadowing property for diffeomorphisms

Author

Lee Manseob

Subjects

shadowing, limit shadowing, orbital limit shadowing, asymptotic orbital shadowing, chain transitive, hyperbolic, generic, primary 37c50, 37c20, secondary 37d20, Mathematics, QA1-939

Abstract

Let M be a closed smooth Riemannian manifold and let f : M → M be a diffeomorphism. We show that if f has the C1 robustly asymptotic orbital shadowing property then it is an Anosov diffeomorphism. Moreover, for a C1 generic diffeomorphism f, if f has the asymptotic orbital shadowing property then it is a transitive Anosov diffeomorphism. In particular, we apply our results to volume-preserving diffeomorphisms.

Published

2019

5. Vector fields satisfying the barycenter property

Author

Lee Manseob

Subjects

barycenter property, singular point, generic, hyperbolic, axiom a, anosov, 37d20, 37c75, Mathematics, QA1-939

Abstract

We show that if a vector field X has the C1 robustly barycenter property then it does not have singularities and it is Axiom A without cycles. Moreover, if a generic C1-vector field has the barycenter property then it does not have singularities and it is Axiom A without cycles. Moreover, we apply the results to the divergence free vector fields. It is an extension of the results of the barycenter property for generic diffeomorphisms and volume preserving diffeomorphisms [1].

Published

2018

6. Continuum-wise expansive homoclinic classes for robust dynamical systems

Author

Lee, Manseob

Published

2019

7. The barycenter property for robust and generic diffeomorphisms

Author

Lee, Manseob

Published

2016

8. The ergodic shadowing property from the robust and generic view point

Author

Lee, Manseob

Published

2014

9. Generic diffeomorphisms with weak limit shadowing

Author

Lu, Gang, Lee, Keonhee, and Lee, Manseob

Published

2013

10. Vector Fields with the Asymptotic Orbital Pseudo-orbit Tracing Property.

Author

Lee, Manseob and Park, Junmi

Abstract

In this paper, we introduce the notion of the asymptotic orbital pseudo-orbit tracing property for a vector field X of a compact smooth manifold M. We show that if a vector field X has the C 1 robust asymptotic orbital pseudo-orbit tracing property, then it is Anosov, and if a C 1 generic vector field X has the asymptotic orbital pseudo-orbit tracing property, then it is Anosov. Moreover, we also show our results for divergence-free vector fields and Hamiltonian systems. [ABSTRACT FROM AUTHOR]

Published

2020

11. A Type of the Shadowing Properties for Generic View Points.

Author

Lee, Manseob

Subjects

*SHADOWING theorem (Mathematics), *DIMENSIONAL analysis, *AXIOMS, *MANIFOLDS (Mathematics), *MATHEMATICAL singularities

Abstract

We show that if a C¹ generic diffeomorphism of a closed smooth two-dimensional manifold has the average shadowing property or the asymptotic average shadowing property, then it is Anosov. Moreover, if a C¹ generic vector field of a closed smooth three-dimensional manifold has the average shadowing property or the asymptotic average shadowing property, then it satisfies singular Axiom A without cycles. [ABSTRACT FROM AUTHOR]

Published

2018

12. Weak measure expansiveness for partially hyperbolic diffeomorphisms.

Author

Lee, Manseob

Subjects

*DIFFEOMORPHISMS, *HYPERBOLIC differential equations, *RIEMANNIAN manifolds, *LEBESGUE measure, *TANGENT function

Abstract

Let M be a closed connected smooth Riemannian manifold with dim M ≥ 2 and let f: M → M be a diffeomorphism. In the paper, we show that C 1 generically, if a diffeomorphism f does not present a homoclinic tangency then it is weak Lebesgue measure expansive and, as an example, we find a partially hyperbolic diffeomorphism which is not weak measure expansive. Moreover, for a surface, if a diffeomorphism f has a homoclinic tangency then there is a diffeomorphism g C 1 close to f such that g is not weak measure expansive. [ABSTRACT FROM AUTHOR]

Published

2017

13. The ergodic shadowing property for robust and generic volume-preserving diffeomorphisms.

Author

Lee, Manseob

Subjects

*ERGODIC theory, *DIFFEOMORPHISMS, *ROBUST control, *DIFFERENTIAL topology, *MATHEMATICAL analysis

Abstract

In this paper, we show the followings: (i) If a volume preserving diffeomorphism f belongs to the C¹-interior of the set of all volume preserving diffeomorphims having the ergodic shadowing property then it is transitive Anosov. Moreover, (ii) if a C¹-generic volume-preserving diffeomorphism f has the ergodic shadowing property then it is transitive Anosov. [ABSTRACT FROM AUTHOR]

Published

2015

14. Partial hyperbolicity and pseudo orbit tracing properties.

Author

Lee, Manseob and Ahn, Jiweon

Subjects

*ORBITS (Astronomy), *HYPERBOLOID structures, *INVARIANT sets

Abstract

It is known that if a closed invariant set Λ of a diffeomorphism f of a compact smooth manifold M is hyperbolic then f has the pseudo orbit tracing property. For a weak notion of hyperbolicity, in [4] if a transitive set of a diffeomorphism f of the three dimensional manifold M has a partially hyperbolic structure then f does not have the pseudo orbit tracing property. From the results, we consider a compact smooth manifold M which the dimension is greater than three. It is a general version of the three dimensional manifold M. More detail, we show that if a transitive diffeomorphism f of a compact smooth manifold M is partially hyperbolic, then f does not have the pseudo orbit tracing property. Moreover, if f is partially hyperbolic on M then f does not have the asymtotic and the ergodic pseudo orbit tracing properties. [ABSTRACT FROM AUTHOR]

Published

2022

15. Generic diffeomorphisms with measure-expansive homoclinic classes.

Author

Koo, Namjip, Lee, Keonhee, and Lee, Manseob

Subjects

DIFFEOMORPHISMS, RIEMANNIAN metric, ERGODIC theory, STABILITY theory, PROBABILITY measures

Abstract

We prove that forC1generic diffeomorphisms, every measure-expansive locally maximal homoclinic class is hyperbolic. [ABSTRACT FROM PUBLISHER]

Published

2014

16. Topologically Stable Chain Recurrence Classes for Diffeomorphisms.

Author

Lee, Manseob

Subjects

*RIEMANNIAN manifolds

Abstract

Let f : M → M be a diffeomorphism of a finite dimension, smooth compact Riemannian manifold M. In this paper, we demonstrate that if a diffeomorphism f lies within the C 1 interior of the set of all chain recurrence class-topologically stable diffeomorphisms, then the chain recurrence class is hyperbolic. [ABSTRACT FROM AUTHOR]

Published

2020

17. Measure-Expansive Homoclinic Classes for C1 Generic Flows.

Author

Lee, Manseob

Subjects

*MANIFOLDS (Mathematics), *NONEXPANSIVE mappings, *VECTOR fields

Abstract

In this paper, we prove that for a generically C 1 vector field X of a compact smooth manifold M, if a homoclinic class H (γ , X) which contains a hyperbolic closed orbit γ is measure expansive for X then H (γ , X) is hyperbolic. [ABSTRACT FROM AUTHOR]

Published

2020

18. Positively Continuum-Wise Expansiveness for C1 Differentiable Maps.

Author

Lee, Manseob

Subjects

*RIEMANNIAN manifolds

Abstract

We show that if a differentiable map f of a compact smooth Riemannian manifold M is C 1 robustly positive continuum-wise expansive, then f is expanding. Moreover, C 1 -generically, if a differentiable map f of a compact smooth Riemannian manifold M is positively continuum-wise expansive, then f is expanding. [ABSTRACT FROM AUTHOR]

Published

2019