We consider a weak vector generalized quasivariational inequal- ity. By introducing a method of scalarization which does not require any as- sumption on the data and by using previous results of the authors concerning scalar generalized quasivariational inequalities, we present Kuhn-Tucker-like conditions for this problem in the case in which the set-valued operator of the constraints is defined by a finite number of inequalities.
Scalarization and Kuhn-Tucker-like conditions for weak-vector generalized quasivariational inequalities / Morgan, Jacqueline; M., Romaniello. - In: JOURNAL OF OPTIMIZATION THEORY AND APPLICATIONS. - ISSN 0022-3239. - STAMPA. - 130(2):(2006), pp. 309-316. [10.1007/s10957-006-9104-x]
Scalarization and Kuhn-Tucker-like conditions for weak-vector generalized quasivariational inequalities
MORGAN, JACQUELINE;
2006
Abstract
We consider a weak vector generalized quasivariational inequal- ity. By introducing a method of scalarization which does not require any as- sumption on the data and by using previous results of the authors concerning scalar generalized quasivariational inequalities, we present Kuhn-Tucker-like conditions for this problem in the case in which the set-valued operator of the constraints is defined by a finite number of inequalities.File | Dimensione | Formato | |
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