Dynamics of neighborhoods of points under a continuous mapping of an interval

Е. Ю. Романенко

Dynamics of neighborhoods of points under a continuous mapping of an interval

Authors

Ye. Yu. Romanenko

Abstract

Let

$\{ I, f Z^{+} \}$ be a dynamical system induced by the continuous map

$f$ of a closed bounded interval

$I$ into itself. In order to describe the dynamics of neighborhoods of points unstable under

$f$ , we suggest a notion of

$\varepsilon \omega - {\rm set} \omega_{f, \varepsilon}(x)$ of a point

$x$ as the

$\omega$ -limit set of

$\varepsilon$ -neighborhood of

$x$ . We investigate the association between the

$\varepsilon \omega - {\rm set}$ and the domain of influence of a point. We also show that the domain of influence of an unstable point is always a cycle of intervals. The results obtained can be directly applied in the theory of continuous time difference equations and similar equations.

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Published

25.11.2005

Issue

Vol. 57 No. 11 (2005)

Section

Research articles

How to Cite

Romanenko, Ye. Yu. “Dynamics of Neighborhoods of Points under a Continuous Mapping of an Interval”. Ukrains’kyi Matematychnyi Zhurnal, vol. 57, no. 11, Nov. 2005, pp. 1534–1547, https://umj.imath.kiev.ua/index.php/umj/article/view/3705.

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Dynamics of neighborhoods of points under a continuous mapping of an interval

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