AbstractWe study the existence of global solutions for large data for a class of systems of thermoelastic type with non-local nonlinearities. Moreover, we investigate smoothing properties of such coupled systems in an abstract setting, including some models for thermoelastic plates. In this setting, classical second-order thermoelasticity and viscoleasticity of integral type are recognized as limiting cases. Decay rates of Sobolev norms of the solutions as time tends to infinity are also investigated
The uniform stability of a thermoelastic plate model is investigated, this model being described by ...
In this paper we study the existence, stability and the smoothness of a bounded solution of the foll...
This book presents recent findings on the global existence, the uniqueness and the large-time behavi...
We study the existence of global solutions for large data for a class of systems of thermoelastic ty...
AbstractWe study the existence of global solutions for large data for a class of systems of thermoel...
We consider an initial-boundary-value problem for a thermoelastic Kirchhoff & Love plate, thermally ...
AbstractWe prove the existence of global small solutions to the initial value problem in three-dimen...
AbstractWe study dissipative models for plates and we show that the solutions have a smoothing effec...
In this note we report on different thermoelastic systems. They are models for the description of el...
AbstractWe consider a nonlinear plate equation with thermal memory effects due to non-Fourier heat f...
summary:This paper is devoted to the analysis of a one-dimensional model for phase transition phenom...
We consider the Cauchy problem in Rn for some fully nonlinear thermoelastic Kirchhoff type plate equ...
We consider a quasilinear PDE system which models nonlinear vibrations of a thermoelastic plate defi...
AbstractWe investigate the linear system of thermoelasticity, consisting of an elasticity equation a...
In this paper we prove existence of global in time weak solutions for a highly nonlinear PDE system ...
The uniform stability of a thermoelastic plate model is investigated, this model being described by ...
In this paper we study the existence, stability and the smoothness of a bounded solution of the foll...
This book presents recent findings on the global existence, the uniqueness and the large-time behavi...
We study the existence of global solutions for large data for a class of systems of thermoelastic ty...
AbstractWe study the existence of global solutions for large data for a class of systems of thermoel...
We consider an initial-boundary-value problem for a thermoelastic Kirchhoff & Love plate, thermally ...
AbstractWe prove the existence of global small solutions to the initial value problem in three-dimen...
AbstractWe study dissipative models for plates and we show that the solutions have a smoothing effec...
In this note we report on different thermoelastic systems. They are models for the description of el...
AbstractWe consider a nonlinear plate equation with thermal memory effects due to non-Fourier heat f...
summary:This paper is devoted to the analysis of a one-dimensional model for phase transition phenom...
We consider the Cauchy problem in Rn for some fully nonlinear thermoelastic Kirchhoff type plate equ...
We consider a quasilinear PDE system which models nonlinear vibrations of a thermoelastic plate defi...
AbstractWe investigate the linear system of thermoelasticity, consisting of an elasticity equation a...
In this paper we prove existence of global in time weak solutions for a highly nonlinear PDE system ...
The uniform stability of a thermoelastic plate model is investigated, this model being described by ...
In this paper we study the existence, stability and the smoothness of a bounded solution of the foll...
This book presents recent findings on the global existence, the uniqueness and the large-time behavi...