On uniform exponential stability of periodic evolution operators in Banach spaces.

Megan, M.; Sasu, L.; Sasu, B.

Displaying similar documents to “On uniform exponential stability of periodic evolution operators in Banach spaces.”

Exponential stability for periodic evolution families of bounded linear operators.

Buşe, C. (2001)

Rendiconti del Seminario Matematico

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Aronszajn-Smith conditions for open $C^{1}$ sets. (Conditions d'Aronszajn-Smith pour les ouverts de classe $C^{1}$ .)

Moukaddem, N. (2001)

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A characterization of exponential stability for periodic evolution families in terms of lower semicontinuous functionals.

Buşe, Constantin (2003)

Electronic Journal of Qualitative Theory of Differential Equations [electronic only]

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Local attractivity in nonautonomous semilinear evolution equations

Joël Blot, Constantin Buşe, Philippe Cieutat (2014)

Nonautonomous Dynamical Systems

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We study the local attractivity of mild solutions of equations in the form u’(t) = A(t)u(t) + f (t, u(t)), where A(t) are (possible) unbounded linear operators in a Banach space and where f is a (possible) nonlinear mapping. Under conditions of exponential stability of the linear part, we establish the local attractivity of various kinds of mild solutions. To obtain these results we provide several results on the Nemytskii operators on the space of the functions which converge to zero...

A note on stability for linear partial differential equations

D. Žubrinić (1987)

Matematički Vesnik

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Banach function spaces and exponential instability of evolution families

Mihail Megan, Adina Luminiţa Sasu, Bogdan Sasu (2003)

Archivum Mathematicum

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In this paper we give necessary and sufficient conditions for uniform exponential instability of evolution families in Banach spaces, in terms of Banach function spaces. Versions of some well-known theorems due to Datko, Neerven, Rolewicz and Zabczyk, are obtained for the case of uniform exponential instability of evolution families.

Exponential stability of stochastic discrete-time, periodic systems in Hilbert spaces.

Ungureanu, Viorica Mariela (2004)

Acta Universitatis Apulensis. Mathematics - Informatics

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On the exponential stability and dichotomy of $C_{0}$ -semigroups

Phóng Vũ (1999)

Studia Mathematica

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A characterization of exponentially dichotomic and exponentially stable $C_{0}$ -semigroups in terms of solutions of an operator equation of Lyapunov type is presented. As a corollary a new and shorter proof of van Neerven’s recent characterization of exponential stability in terms of boundedness of convolutions of a semigroup with almost periodic functions is given.

On uniform exponential $N$ -dichotomy

M. Megan, D.R. Latcu (1994)

Annales mathématiques Blaise Pascal

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