- Title
- On abstract convexity and set valued analysis
- Creator
- Burachik, Regina; Rubinov, Alex
- Date
- 2008
- Type
- Text; Journal article
- Identifier
- http://researchonline.federation.edu.au/vital/access/HandleResolver/1959.17/58067
- Identifier
- vital:2095
- Identifier
- ISSN:1345-4773
- Abstract
- Given a set L subset of R-X of functions defined on X, we consider abstract monotone (or, for short, L-monotone) multivalued operators T : X paired right arrows L. We extend the definition of enlargement of monotone operators to this framework and study semicontinuity properties of these mappings. We prove that sequential outer semicontinuity, which holds for maximal monotone operators and their enlargements in the classical case (i.e., when L = X* and X is a Banach space), holds also in our abstract setting. We also show through examples that some properties, known to hold in the classical case, may no longer be valid in the abstract setting. One of these properties is the maximality of the subdifferential and another one is the lack of inner semicontinuity of (point-to-set) monotone operators in the interior of their domain. We also focus on the structure of both the abstract subdifferential and the abstract epsilon-subdifferential. This is a key question in abstract convexity because these sets may be very large for certain choices of L and therefore it is important to be able to represent them by means of some special elements of the set of "affine" functions induced by L.
- Relation
- Journal of Nonlinear and Convex Analysis Vol. 9, no. 1 (2008), p. 105-123
- Rights
- Copyright Yokohama Publishers
- Rights
- This metadata is freely available under a CCO license
- Subject
- Abstract convexity; Abstract monotonicity; Subdifferential; Enlargements of set valued mappings; Semicontinuity of set valued mappings
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