Upper Hőlder Continuity of Minimal Points
نویسنده
چکیده
In the present paper we derive criteria for upper Lipschitz/Hőlder continuity of the set of minimal points of a given subset A ⊂ Y of a normed space Y when A is subjected to perturbations. To this aim we introduce the rate of containment of A, a real-valued function of one real variable, which measures the depart from minimality as a function of the distance from the minimal point set. The main requirement we impose is that for small arguments the rate of containment is a sufficiently fast growing function. The obtained results are applied to parametric vector optimization problems to derive conditions for upper Hőlder continuity of the performance multifunction.
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تاریخ انتشار 2003