On Abstract Quasi Variational Inequalities. Approximation of Solutions. II

In the early seventies A. BENSOUWAN and J. L. LIONS (cf.e.g. [2]) introduced the notion of a quasi variational inequality (q.v.i.) in connection with a problem of impulse control. C. BAIOCCHI and others (cf. e.g. [l]) succeeded in treating some free boundary problems (concerning earth dams separatin

By means of time discretization, we approximate evolution variational inequalities by the corresponding elliptic variational inequalities. Using ROTHE'S method (method of lines), an approximate solution is constructed by means of direct variational methods. Existence, uniqueness and regularity of so

This article is concerned with the development, implementation and application of variational inequalities to treat the general elastodynamic contact problem. The solution strategy is based upon the iterative use of two subproblems. Quadratic programming and Lagrange multipliers are used to solve th

The main aim of this paper is to provide a sufficient condition which guarantees the connected property of the solution set for a kind of weak vector variational inequality.