Continuous inverse shadowing and hyperbolicity

Keonhee Lee

doi:10.1017/S0004972700033487

Abstract

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We study the concepts of continuous shadowing and continuous inverse shadowing with respect to various classes of admissible pseudo orbits, and characterize hyperbolicity and structural stability using the notion of continuous inverse shadowing.

References

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Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Lee, Keon-Hee and Lee, Zoon-Hee 2003. INVERSE SHADOWING FOR EXPANSIVE FLOWS. Bulletin of the Korean Mathematical Society, Vol. 40, Issue. 4, p. 703.

Park, Jong-Jin and Lee, Keonhee 2004. Inverse shadowing of circle maps. Bulletin of the Australian Mathematical Society, Vol. 69, Issue. 3, p. 353.

Han, Yinghao and Lee, Keonhee 2004. Inverse shadowing for structurally stable flows. Dynamical Systems, Vol. 19, Issue. 4, p. 371.

Choi, Tae-Young Kim, Sung-Sook and Lee, Keon-Hee 2006. WEAK INVERSE SHADOWING AND GENERICITY. Bulletin of the Korean Mathematical Society, Vol. 43, Issue. 1, p. 43.

Choi, Tae-Young and Lee, Keon-Hee 2006. VARIOUS INVERSE SHADOWING IN LINEAR DYNAMICAL SYSTEMS. Communications of the Korean Mathematical Society, Vol. 21, Issue. 3, p. 515.

Choi, Taeyoung Lee, Keonhee and Zhang, Yong 2006. Characterisations of Ω-stability and structural stability via inverse shadowing. Bulletin of the Australian Mathematical Society, Vol. 74, Issue. 2, p. 185.

Lee, Keon-Hee Lee, Zoon-Hee and Zhang, Yong 2008. STRUCTURAL STABILITY OF VECTOR FIELDS WITH ORBITAL INVERSE SHADOWING. Journal of the Korean Mathematical Society, Vol. 45, Issue. 6, p. 1505.

Oh, Jang-Heon 2009. A NOTE ON THE FIRST LAYERS OF ℤp-EXTENSIONS. Communications of the Korean Mathematical Society, Vol. 24, Issue. 1, p. 1.

Honary, Bahman and Bahabadi, Alireza Zamani 2009. Weak Strictly Persistence Homeomorphisms and Weak Inverse Shadowing Property and Genericity. Kyungpook mathematical journal, Vol. 49, Issue. 3, p. 411.

Lee, Man-Seob 2009. C1-STABLE INVERSE SHADOWING CHAIN COMPONENTS FOR GENERIC DIFFEOMORPHISMS. Communications of the Korean Mathematical Society, Vol. 24, Issue. 1, p. 127.

Lee, Man-Seob 2010. C2DIFFEOMORPHISMS WITH THE INVERSE SHADOWING PROPERTY. Communications of the Korean Mathematical Society, Vol. 25, Issue. 2, p. 257.

Lee, Manseob 2011. C2-stably inverse shadowing diffeomorphisms. Dynamical Systems, Vol. 26, Issue. 2, p. 161.

Lee, Manseob 2012. Volume-preserving diffeomorphisms with inverse shadowing. Journal of Inequalities and Applications, Vol. 2012, Issue. 1,

Honary, B. and Bahabadi, Alireza Zamani 2012. Inverse Shadowing and Weak Inverse Shadowing Property. Applied Mathematics, Vol. 03, Issue. 05, p. 478.

Lee, Keonhee and Lee, Manseob 2013. Divergence-free vector fields with inverse shadowing. Advances in Difference Equations, Vol. 2013, Issue. 1,

Lee, Manseob 2013. Symplectic diffeomorphisms with inverse shadowing. Journal of Inequalities and Applications, Vol. 2013, Issue. 1,

Kim, Daejung and Lee, Seunghee 2014. SPECTRAL DECOMPOSITION OF k-TYPE NONWANDERING SETS FOR ℤ2-ACTIONS. Bulletin of the Korean Mathematical Society, Vol. 51, Issue. 2, p. 387.

Das, Pramod and Das, Tarun 2018. Various Types of Shadowing and Specification on Uniform Spaces. Journal of Dynamical and Control Systems, Vol. 24, Issue. 2, p. 253.

Mitchell, Joel 2019. Orbital shadowing, ω-limit sets and minimality. Topology and its Applications, Vol. 268, Issue. , p. 106903.

Petrov, Alexey 2019. Relations between Shadowing and Inverse Shadowing in Dynamical Systems. Axioms, Vol. 8, Issue. 1, p. 11.

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Continuous inverse shadowing and hyperbolicity

Abstract

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REFERENCES

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