Sur la Stabilité de la poutre de Bresse

dc.contributor.author	Boulechfar, Selma
dc.contributor.author	Bouzettouta, Lamine
dc.date.accessioned	2024-03-26T10:45:33Z
dc.date.available	2024-03-26T10:45:33Z
dc.date.issued	2021
dc.description.abstract	In this thesis, we studied the stability of some one-dimensional linear thermoelastic Bresse systems where the heat conduction is given by Green and Naghdi theories (ther- moelasticity type III) with the presence of di§erent mechanisms of dissipation. The Örst is a system of Öve hyperbolic partial di§erential equations with three inÖnite memories. The second has the same form as the previous system, but we replaced the three inÖnite memory terms by two Önite memory terms. The last one is a system of four hyperbolic partial di§erential equations with two di§erent damping, they are constant delay and Önite memory. To show the stabilization of these three systems, we use a multipliers method, it is based on the construction of a Lyapunov function L equivalent to energy E of the solu- tions. In the proof, we used the second order energy function to estimate the terms R 1 0 1tx ('x + + l!) dx and R 1 0 2tx ('x + + l!) dx.
dc.identifier.uri	http://dspace.univ-skikda.dz:4000/handle/123456789/588
dc.language.iso	english
dc.publisher	Université 20 Août 1955 -Skikda
dc.title	Sur la Stabilité de la poutre de Bresse
dc.type	Thesis

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