The directional differentiability of the solution map of obstacle type quasi-variational inequalities (QVIs) with respect to perturbations on the forcing term is studied. The classical result of Mignot is then extended to the quasi-variational case under assumptions that allow multiple solutions of the QVI. The proof involves selection procedures for the solution set and represents the directional derivative as the limit of a monotonic sequence of directional derivatives associated to specific variational inequalities. Additionally, estimates on the coincidence set and several simplifications under higher regularity are studied. The theory is illustrated by a detailed study of an application to thermoforming comprising of modelling, analysi...
In this paper we study an inverse problem governed by a constrained nonlinear elliptic quasi-variati...
Abstract. The existence and uniqueness problems for some quasi-variational inequalities are studied ...
For equilibrium constrained optimization problems subject to nonlinear state equations, the property...
The directional differentiability of the solution map of obstacle type quasi-variational inequalitie...
We study parabolic quasi-variational inequalities (QVIs) of obstacle type. Under appropriate assumpt...
We focus on elliptic quasi-variational inequalities (QVIs) of obstacle type and prove a number of re...
In this short note, we prove that the minimal and maximal solution maps associated to elliptic quasi...
We consider state-of-the-art methods, theoretical limitations, and open problems in elliptic Quasi-V...
A class of nonlinear elliptic quasi-variational inequality (QVI) problems with gradientconstraints i...
A class of nonlinear elliptic quasi-variational inequality (QVI) problems with gra-dient constraints...
We consider state-of-the-art methods, theoretical limitations, and open problems in elliptic Quasi-V...
Quasi-Variationsungleichungen (QVIs) treten in einer Vielzahl mathematischer Modelle auf, welche kom...
A class of abstract nonlinear evolution quasi-variational inequality (QVI) problems in function spac...
We consider a generalized equation governed by a strongly monotone andLipschitz single-valued mappin...
For a class of quasi-variational inequalities (QVIs) of obstacle type the stability of its solution ...
In this paper we study an inverse problem governed by a constrained nonlinear elliptic quasi-variati...
Abstract. The existence and uniqueness problems for some quasi-variational inequalities are studied ...
For equilibrium constrained optimization problems subject to nonlinear state equations, the property...
The directional differentiability of the solution map of obstacle type quasi-variational inequalitie...
We study parabolic quasi-variational inequalities (QVIs) of obstacle type. Under appropriate assumpt...
We focus on elliptic quasi-variational inequalities (QVIs) of obstacle type and prove a number of re...
In this short note, we prove that the minimal and maximal solution maps associated to elliptic quasi...
We consider state-of-the-art methods, theoretical limitations, and open problems in elliptic Quasi-V...
A class of nonlinear elliptic quasi-variational inequality (QVI) problems with gradientconstraints i...
A class of nonlinear elliptic quasi-variational inequality (QVI) problems with gra-dient constraints...
We consider state-of-the-art methods, theoretical limitations, and open problems in elliptic Quasi-V...
Quasi-Variationsungleichungen (QVIs) treten in einer Vielzahl mathematischer Modelle auf, welche kom...
A class of abstract nonlinear evolution quasi-variational inequality (QVI) problems in function spac...
We consider a generalized equation governed by a strongly monotone andLipschitz single-valued mappin...
For a class of quasi-variational inequalities (QVIs) of obstacle type the stability of its solution ...
In this paper we study an inverse problem governed by a constrained nonlinear elliptic quasi-variati...
Abstract. The existence and uniqueness problems for some quasi-variational inequalities are studied ...
For equilibrium constrained optimization problems subject to nonlinear state equations, the property...