Hyers-Ulam stability and exponential dichotomy of linear differential periodic systems are equivalent

Hyers-Ulam stability and exponential dichotomy of linear differential periodic systems are equivalent

Let $m$ be a positive integer and $q$ be a positive real number. We prove that the $m$-dimensional and $q$-periodic system \begin{equation}\tag{$\ast$} \dot x(t)=A(t)x(t),\qquad t\in\mathbb{R}_+, \qquad x(t)\in\mathbb{C}^m \end{equation} is Hyers-Ulam stable if and only if the monodromy matrix asso...

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Bibliographic Details
Main Authors: Constantin Buse, Dorel Barbu, Afshan Tabassum
Format: Article
Language:English
Published: University of Szeged 2015-09-01
Series:Electronic Journal of Qualitative Theory of Differential Equations
Subjects:
differential equations
dichotomy
hyers-ulam stability
Online Access:http://www.math.u-szeged.hu/ejqtde/periodica.html?periodica=1&paramtipus_ertek=publication&param_ertek=3918

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http://www.math.u-szeged.hu/ejqtde/periodica.html?periodica=1&paramtipus_ertek=publication&param_ertek=3918

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