Polynomial stability for Lord–Shulman porous elasticity with microtemperature and strong time delay

Anderson J. A. Ramos, Anderson L. A. Araujo, Mirelson M. Freitas, Manoel J. Dos Santos, Alberto S. Noé
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Abstract

In this paper, we study a porous thermoelastic system with microtemperature and strong time delay acting on the volume fraction equation. The thermal effect of microtemperature is based on the Lord–Shulman theory (J Mech Phys Solids. 15(5) (1967), 299–309.), while the strong delay is motivated by Makheloufi's et al. recent work (Math Meth Appl Sci. 44 (2021), 6301–6317.). To prove the well‐posedness of the system, lack of exponential stability and the polynomial decay with optimal rate, we use the semigroup theory of linear operators.
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具有微温和强时间延迟的 Lord-Shulman 多孔弹性的多项式稳定性
本文研究了一个多孔热弹性系统,该系统具有微温度和作用于体积分数方程的强时间延迟。微温的热效应基于 Lord-Shulman 理论(J Mech Phys Solids.15(5)(1967),299-309.),而强延迟则是由 Makheloufi 等人最近的研究成果(Math Meth Appl Sci.为了证明系统的好求解性、缺乏指数稳定性以及多项式衰减的最佳速率,我们使用了线性算子的半群理论。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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