Well-posed models and computational algorithms are developed and analyzed for control of a class of partial differential equations that describe the motions of thermo-viscoelastic structures. An abstract (state space) framework and a general well-posedness result are presented that can be applied to a large class of thermo-elastic and thermo-viscoelastic models. This state space framework is used in the development of a computational scheme to be used in the solution of a linear quadratic regulator (LQR) control problem. A detailed convergence proof is provided for the viscoelastic model and several numerical results are presented to illustrate the theory and to analyze problems for which the theory is incomplete
This paper deals with a phase transitions model describing the evolution of damage in thermoviscoela...
The evolution in time of a viscoelastic body is described by an equation with memory, which can be s...
In this paper, we study, from the numerical point of view, a dynamic problem involving a mixture of ...
Control and estimator gains are computed for linear-quadratic-Gaussian (LQG) optimal control of the ...
An abstract approximation framework and convergence theory for the identification of thermoelastic s...
summary:Sufficient conditions for the stresses in the threedimensional linearized coupled thermoelas...
AbstractMathematical models for treating problems of linear viscoelasticity involving hereditary con...
This work is concerned with the numerical solution of the evolution equations of thermomechanical sy...
We consider a strongly coupled system of partial differential equations as a model for the dynamics ...
In this work computational approaches to the numerical simulation of steady-state viscoelastic fluid...
summary:In this paper, we develop a thermodynamically consistent description of the uniaxial behavio...
AbstractIn this article we study a boundary control problem for an Oseen-type model of viscoelastic ...
This thesis was submitted for the award of Doctor of Philosophy and was awarded by Brunel University...
An abstract approximation and convergence theory for the closed-loop solution of discrete-time linea...
AbstractA three-field finite element scheme designed for solving time-dependent systems of partial d...
This paper deals with a phase transitions model describing the evolution of damage in thermoviscoela...
The evolution in time of a viscoelastic body is described by an equation with memory, which can be s...
In this paper, we study, from the numerical point of view, a dynamic problem involving a mixture of ...
Control and estimator gains are computed for linear-quadratic-Gaussian (LQG) optimal control of the ...
An abstract approximation framework and convergence theory for the identification of thermoelastic s...
summary:Sufficient conditions for the stresses in the threedimensional linearized coupled thermoelas...
AbstractMathematical models for treating problems of linear viscoelasticity involving hereditary con...
This work is concerned with the numerical solution of the evolution equations of thermomechanical sy...
We consider a strongly coupled system of partial differential equations as a model for the dynamics ...
In this work computational approaches to the numerical simulation of steady-state viscoelastic fluid...
summary:In this paper, we develop a thermodynamically consistent description of the uniaxial behavio...
AbstractIn this article we study a boundary control problem for an Oseen-type model of viscoelastic ...
This thesis was submitted for the award of Doctor of Philosophy and was awarded by Brunel University...
An abstract approximation and convergence theory for the closed-loop solution of discrete-time linea...
AbstractA three-field finite element scheme designed for solving time-dependent systems of partial d...
This paper deals with a phase transitions model describing the evolution of damage in thermoviscoela...
The evolution in time of a viscoelastic body is described by an equation with memory, which can be s...
In this paper, we study, from the numerical point of view, a dynamic problem involving a mixture of ...