Stabilization of a Rao–Nakra Sandwich Beam System by Coleman–Gurtin’s Thermal Law and Nonlinear Damping of Variable-Exponent Type

Mohammed M. Al-Gharabli; Shadi Al-Omari; Adel M. Al-Mahdi

doi:10.1155/2024/1615178

Journal of Mathematics (Jan 2024)

Stabilization of a Rao–Nakra Sandwich Beam System by Coleman–Gurtin’s Thermal Law and Nonlinear Damping of Variable-Exponent Type

Mohammed M. Al-Gharabli,
Shadi Al-Omari,
Adel M. Al-Mahdi

Affiliations

Mohammed M. Al-Gharabli: The Preparatory Year Program
Shadi Al-Omari: The Preparatory Year Program
Adel M. Al-Mahdi: The Preparatory Year Program

DOI: https://doi.org/10.1155/2024/1615178
Journal volume & issue: Vol. 2024

Abstract

Read online

In this paper, we explore the asymptotic behavior of solutions in a thermoplastic Rao–Nakra (sandwich beam) beam equation featuring nonlinear damping with a variable exponent. The heat conduction in this context adheres to Coleman–Gurtin’s thermal law, encompassing linear damping, Fourier, and Gurtin–Pipkin’s laws as specific instances. By employing the multiplier approach, we establish general energy decay results, with exponential decay as a particular manifestation. These findings extend and generalize previous decay results concerning the Rao–Nakra sandwich beam equations.

Published in Journal of Mathematics

ISSN: 2314-4629 (Print); 2314-4785 (Online)
Publisher: Wiley
Country of publisher: United Kingdom
LCC subjects: Science: Mathematics
Website: https://onlinelibrary.wiley.com/journal/1469

About the journal