Complete Closedness of Maximal Monotone Operators
Copyright policy )Complete Closedness of Maximal Monotone Operators
(This paper is dedicated to the memory of Professor Kwan Chao-Chin, former academic member and director of the Institute of System Science of the Academy of Chinese Sciences.) A maximal monotone operator in Rn is completely closed, i.e., not only closed for points, but also closed for directions. Such a completely closed operator is locally bounded at a point if and only if it is bounded at that point.
- University of Wisconsin–Oshkosh United States
strong closedness properties of maximal monotone operators, Convex sets in topological linear spaces; Choquet theory, set-valued operator, Monotone operators and generalizations, completely closed operator, recession cone
strong closedness properties of maximal monotone operators, Convex sets in topological linear spaces; Choquet theory, set-valued operator, Monotone operators and generalizations, completely closed operator, recession cone
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