Add to ORKGIn this paper, we extend the sensitivity analysis framework developed re-cently for variational inequalities by Noor and Yen to variational inclu-sions relying on Wiener-Hopf equation techniques. We prove the continui-ty and the Lipschitz continuity of the locally unique solution to parametric variational inclusions without assuming differentiability of the given data
This paper is devoted to the study of sensitivity to perturbation of parametrized varia-tional inclu...
International audienceWe provide a sensitivity result for the solutions to the following finite-dime...
AbstractIt is well known that the implicit resolvent equations are equivalent to the quasivariationa...
It is well known that the Wiener-Hopf equations are equivalent to the general variational inequaliti...
It is well known that the Wiener-Hopf equations are equivalent to the general variational inequalit...
Includes bibliographical references (leaves 25-26).Supported by the National Science Foundation Prog...
AbstractIn the present paper, we study a perturbed iterative method for solving a general class of v...
AbstractDafermos studied the sensitivity properties of the solutions of a variational inequality wit...
International audienceIn this paper we investigate the sensitivity analysis of parameterized nonline...
AbstractWe introduce the concept of Fréchet approximate Jacobian matrices for continuous vector func...
AbstractThe aim of this paper is twofold. First, it is to extend the sensitivity analysis framework,...
We provide a sensitivity result for the solutions to the following finite-dimensional quasi-variatio...
AbstractWe obtain a result on the Hölder continuity of solutions to variational inequalities of the ...
AbstractIn this paper, we use the implicit resolvent operator technique to study the sensitivity ana...
AbstractIn this paper we provide an account of some of the fundamental aspects of variational inequa...
This paper is devoted to the study of sensitivity to perturbation of parametrized varia-tional inclu...
International audienceWe provide a sensitivity result for the solutions to the following finite-dime...
AbstractIt is well known that the implicit resolvent equations are equivalent to the quasivariationa...
It is well known that the Wiener-Hopf equations are equivalent to the general variational inequaliti...
It is well known that the Wiener-Hopf equations are equivalent to the general variational inequalit...
Includes bibliographical references (leaves 25-26).Supported by the National Science Foundation Prog...
AbstractIn the present paper, we study a perturbed iterative method for solving a general class of v...
AbstractDafermos studied the sensitivity properties of the solutions of a variational inequality wit...
International audienceIn this paper we investigate the sensitivity analysis of parameterized nonline...
AbstractWe introduce the concept of Fréchet approximate Jacobian matrices for continuous vector func...
AbstractThe aim of this paper is twofold. First, it is to extend the sensitivity analysis framework,...
We provide a sensitivity result for the solutions to the following finite-dimensional quasi-variatio...
AbstractWe obtain a result on the Hölder continuity of solutions to variational inequalities of the ...
AbstractIn this paper, we use the implicit resolvent operator technique to study the sensitivity ana...
AbstractIn this paper we provide an account of some of the fundamental aspects of variational inequa...
This paper is devoted to the study of sensitivity to perturbation of parametrized varia-tional inclu...
International audienceWe provide a sensitivity result for the solutions to the following finite-dime...
AbstractIt is well known that the implicit resolvent equations are equivalent to the quasivariationa...