Rates of decay to weak thermoelastic Bresse system

• Published in: IMA journal of applied mathematics Vol. 75; no. 6; pp. 881 - 904
• Main Authors: Fatori, L. H., Munoz Rivera, J. E.
• Format: Journal Article
• Language: English
• Published: Oxford Oxford University Press 01.12.2010
• Subjects: Bresse thermoelastic systems; Decay; Decay rate; Dissipation; Exact sciences and technology; Mathematical analysis; Mathematics; Optimization; polynomial stability; Regularity; Sciences and techniques of general use; Stability; thermoelasticity decay rate; Wave propagation; Polynomial; Necessary condition; Wave propagation; Applied mathematics; Bresse thermoelastic systems; polynomial stability; Numerical stability; thermoelasticity decay rate
• ISSN: 0272-4960; 1464-3634
• DOI: 10.1093/imamat/hxq038

We consider the Bresse system with temperature and we show that there exist exponential stability if and only if the wave propagation is equal. We show that, in general, the system is not exponentially stable but that there exists polynomial stability with rates that depend on the wave propagations and the regularity of the initial data. Moreover, we introduce a necessary condition to dissipative semigroup decay polynomially. This result allows us to show some optimality to the polynomial rate of decay.