Stability of mappings with a spectrum on a unit circle

Ya M. Goltser

doi:10.1006/jmaa.1995.1447

Stability of mappings with a spectrum on a unit circle

Ya M. Goltser

Department of Mathematics

Research output: Contribution to journal › Article › peer-review

3 Scopus citations

Abstract

Nonlinear mappings with neutral fixed points are considered. It is assumed that the linear approximation spectrum is non-resonant and lies on a unit circle. Conditions for asymptotic stability and instability of a fixed point of a mapping under various degrees of the stability degeneration problem are obtained. In the main case they are necessary and sufficient conditions. For mappings in the normal form the Lyapunov and Chetayev polynomial functions have been designed and the instability zones constructed.

Original language	English
Pages (from-to)	841-860
Number of pages	20
Journal	Journal of Mathematical Analysis and Applications
Volume	196
Issue number	3
DOIs	https://doi.org/10.1006/jmaa.1995.1447
State	Published - 15 Dec 1995

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10.1006/jmaa.1995.1447

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abstract = "Nonlinear mappings with neutral fixed points are considered. It is assumed that the linear approximation spectrum is non-resonant and lies on a unit circle. Conditions for asymptotic stability and instability of a fixed point of a mapping under various degrees of the stability degeneration problem are obtained. In the main case they are necessary and sufficient conditions. For mappings in the normal form the Lyapunov and Chetayev polynomial functions have been designed and the instability zones constructed.",

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AB - Nonlinear mappings with neutral fixed points are considered. It is assumed that the linear approximation spectrum is non-resonant and lies on a unit circle. Conditions for asymptotic stability and instability of a fixed point of a mapping under various degrees of the stability degeneration problem are obtained. In the main case they are necessary and sufficient conditions. For mappings in the normal form the Lyapunov and Chetayev polynomial functions have been designed and the instability zones constructed.

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Stability of mappings with a spectrum on a unit circle

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