Add to ORKGIn this work, we consider a one-dimensional Timoshenko system of thermoelasticity of type III with past history and distributive delay. It is known that an arbitrarily small delay may be the source of instability. We establish the well-posedness and the stability of the system for the cases of equal and nonequal speeds of wave propagation respectively. Our results show that the damping effect is strong enough to uniformly stabilize the system even in the presence of time delay under suitable conditions and improve the related results
This paper is concerned with the asymptotic behavior of the solution of a Timoshenko system with two...
We show that the solutions of a thermoelastic system with a localized nonlinear distributed damping ...
We consider the Timoshenko model for vibrating beams under effect of two nonlinear and localized fri...
Abstract In this paper, we consider a nonlinear thermoelastic system of Timoshenko type with delay. ...
The paper deals with a one-dimensional porous-elastic system with thermoelasticity of type III and d...
AbstractIn this paper we consider a one-dimensional linear thermoelastic system of Timoshenko type, ...
AbstractIn this paper we consider a one-dimensional linear thermoelastic system of Timoshenko type, ...
In this paper, we consider the following Timoshenko system of thermo-viscoelasticity of type III wit...
This paper is concerned with a nonlinear Timoshenko system modeling clamped thin elastic beams with ...
AbstractIn this paper, we consider a one-dimensional porous thermoelasticity system of type III with...
In this work we study the asymptotic behavior as t → ∞ of the solution for the Timoshenko system wit...
In this paper, we study the energy decay rate for a mixed type II and type III thermoelastic system....
In this paper, we study the energy decay rate for a mixed type II and type III thermoelastic system....
We consider a one-dimensional linear thermoelastic Bresse system with delay term, forcing, and infin...
Numerous studies have been conducted to investigate porous systems under different damping effects. ...
This paper is concerned with the asymptotic behavior of the solution of a Timoshenko system with two...
We show that the solutions of a thermoelastic system with a localized nonlinear distributed damping ...
We consider the Timoshenko model for vibrating beams under effect of two nonlinear and localized fri...
Abstract In this paper, we consider a nonlinear thermoelastic system of Timoshenko type with delay. ...
The paper deals with a one-dimensional porous-elastic system with thermoelasticity of type III and d...
AbstractIn this paper we consider a one-dimensional linear thermoelastic system of Timoshenko type, ...
AbstractIn this paper we consider a one-dimensional linear thermoelastic system of Timoshenko type, ...
In this paper, we consider the following Timoshenko system of thermo-viscoelasticity of type III wit...
This paper is concerned with a nonlinear Timoshenko system modeling clamped thin elastic beams with ...
AbstractIn this paper, we consider a one-dimensional porous thermoelasticity system of type III with...
In this work we study the asymptotic behavior as t → ∞ of the solution for the Timoshenko system wit...
In this paper, we study the energy decay rate for a mixed type II and type III thermoelastic system....
In this paper, we study the energy decay rate for a mixed type II and type III thermoelastic system....
We consider a one-dimensional linear thermoelastic Bresse system with delay term, forcing, and infin...
Numerous studies have been conducted to investigate porous systems under different damping effects. ...
This paper is concerned with the asymptotic behavior of the solution of a Timoshenko system with two...
We show that the solutions of a thermoelastic system with a localized nonlinear distributed damping ...
We consider the Timoshenko model for vibrating beams under effect of two nonlinear and localized fri...