Global Solution and Exponential Stability for a Laminated Beam with Fourier Thermal Law

Authors

Carlos Raposo Departamen of Mathematics, Federal University of São João del-Rei, Brazil.
Carlos Nonato Department of Mathematics, Federal University of Bahia, Brazil.
Octavio Paulo Vera Villagran Department of Mathematics, Universidad del Bío-Bío, Chile.
José Dávalos Chuquipoma Departamen of Mathematics, Federal University of São João del-Rei, Brazil.

DOI:

https://doi.org/10.4208/jpde.v33.n2.4

Keywords:

Global solution, laminated beam, Timoshenko, thermoelasticity, energy method.

Abstract

This paper focuses on the long-time dynamics of a thermoelastic laminated beam modeled from the well-established Timoshenko theory. From mathematical point of view, the study system consists of three hyperbolic motion equations coupled with the parabolic equation governed by Fouriers law of heat conduction and, in consequence, does not belong to one of the classical categories of PDE. We have proved the well-posedness and exponential stability of the system. The well-posedness is given by Hille-Yosida theorem. For the exponential decay we applied the energy method by introducing a Lyapunov functional.

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Published

2020-05-12

Issue

Vol. 33 No. 2 (2020)

Section

Articles