Regularity analysis for an abstract thermoelastic system with inertial term
Zhaobin Kuang, Zhuangyi Liu, Hugo D. Fernández Sare
Abstract
In this paper, we provide a complete regularity analysis for the following abstract thermoelastic system with inertial term [see formula in PDF] where A is a self-adjoint, positive definite operator on a complex Hilbert space H and [see formula in PDF] It is regarded as the second part of Fernández Sare et al. [ J. Diff. Eqs. 267 (2019) 7085–7134]. where the asymptotic stability of this model was investigated. We are able to decompose the region E into three parts where the associated semigroups are analytic, of Gevrey classes of specific order, and non-smoothing, respectively. Moreover, by a detailed spectral analysis, we will show that the orders of Gevrey class are sharp, under proper conditions. We also show that the orders of polynomial stability obtained in Fernández Sare et al. [ J. Diff. Eqs. 267 (2019) 7085–7134] are optimal.