Fonctions presque-périodiques et Équations Différentielles

Abstract : This PhD thesis deals with the evolution equations and is organised in three parts. The first part is devoted to the almost periodic solutions of certain differential equations. Classic results on the almostperiodic functions are collected in the first chapter. The second chapter of this thesis aims to prove the existence of an almost-periodic solution of Besicovitch of a second-order differential equation on Hilbert space. The used approach is based on a variational formalism. In the second part of this thesis, we study the asymptotic behavior of Cauchy problems in the non-autonomous case. We give in the third chapter important results on semigroups and evolution families, namely, those allowing to characterize the stability of semigroups and periodic evolution families. We prove in the fourth chapter sufficient conditions for the uniform exponential stability of a strongly continuous, q-periodic evolution family acting on a complex Banach space. The last part in this work focuses the attention on some results on the exponential dichotomy as a property for the asymptotic behavior of the differential systems. Some well-known results are given in the fifth chapter which introduces briefly the concept of the exponential dichotomy. A characterization of the exponential dichotomy for evolution family in terms of boundedness of the solutions to periodic operatorial Cauchy problems will be established.
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Dhaou Lassoued. Fonctions presque-périodiques et Équations Différentielles. Analyse fonctionnelle [math.FA]. Université Panthéon-Sorbonne - Paris I, 2013. Français. ⟨tel-00942969⟩

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