In this paper, an abstract evolutionary hemivariational inequality with a history-dependent operator is studied. First, a result on its unique solvability and solution regularity is proved by applying the Rothe method. Next, we introduce a numerical scheme to solve the inequality and derive error estimates. We apply the results to a quasistatic frictional contact problem in which the material is modeled with a viscoelastic constitutive law, the contact is given in the form of multivalued normal compliance, and friction is described with a subgradient of a locally Lipschitz potential. Finally, for the contact problem, we provide the optimal error estimate
AbstractWe consider a mathematical model which describes the frictional contact between a piezoelect...
In this paper, a dynamic frictional contact problem for viscoelastic materials with long memory is s...
Contact phenomena arise in a variety of industrial process and engineering applications. For this re...
In this paper we consider an abstract class of time-dependent quasi variational–hemivariational ineq...
In this paper we consider an abstract class of time-dependent quasi variational-hemivariational ineq...
We survey recent results on the mathematical modeling of nonconvex and nonsmooth contact problems ar...
In this paper we present results on existence, uniqueness and convergence of solutions to the Cauchy...
The purpose of this work is to introduce and investigate a complicated variational–hemivariational i...
International audienceThe present paper represents a continuation of Sofonea and Matei's paper (Sofo...
AbstractWe consider a class of abstract evolutionary variational inequalities arising in the study o...
International audienceA new class of history-dependent quasivariational inequalities was recently st...
A new class of history-dependent quasivariational inequalities was recently studied in [M....
International audienceWe consider an abstract class of variational–hemivariational inequalities whic...
A quasistatic nonsmooth frictional contact problem for a viscoelastic material is studied. The conta...
We consider a quasistatic problem which models the contact between a deformable body and an obstacle...
AbstractWe consider a mathematical model which describes the frictional contact between a piezoelect...
In this paper, a dynamic frictional contact problem for viscoelastic materials with long memory is s...
Contact phenomena arise in a variety of industrial process and engineering applications. For this re...
In this paper we consider an abstract class of time-dependent quasi variational–hemivariational ineq...
In this paper we consider an abstract class of time-dependent quasi variational-hemivariational ineq...
We survey recent results on the mathematical modeling of nonconvex and nonsmooth contact problems ar...
In this paper we present results on existence, uniqueness and convergence of solutions to the Cauchy...
The purpose of this work is to introduce and investigate a complicated variational–hemivariational i...
International audienceThe present paper represents a continuation of Sofonea and Matei's paper (Sofo...
AbstractWe consider a class of abstract evolutionary variational inequalities arising in the study o...
International audienceA new class of history-dependent quasivariational inequalities was recently st...
A new class of history-dependent quasivariational inequalities was recently studied in [M....
International audienceWe consider an abstract class of variational–hemivariational inequalities whic...
A quasistatic nonsmooth frictional contact problem for a viscoelastic material is studied. The conta...
We consider a quasistatic problem which models the contact between a deformable body and an obstacle...
AbstractWe consider a mathematical model which describes the frictional contact between a piezoelect...
In this paper, a dynamic frictional contact problem for viscoelastic materials with long memory is s...
Contact phenomena arise in a variety of industrial process and engineering applications. For this re...