Subdifferential and optimality conditions for the difference of set-valued mappings
|dc.contributor.author||Teo, Kok Lay|
|dc.identifier.citation||Guo, X. and Li, S. and Teo, K.L. 2012. Subdifferential and optimality conditions for the difference of set-valued mappings. Positivity. 16 (2): pp. 321-337.|
In this paper, an existence theorem of the subgradients for set-valued mappings, which introduced by Borwein (Math Scand 48:189-204, 1981), and relations between this subdifferential and the subdifferential introduced by Baier and Jahn (J Optim Theory Appl 100:233-240, 1999), are obtained. By using the concept of this subdifferential, the sufficient optimality conditions for generalized D. C. multiobjective optimization problems are established. And the necessary optimality conditions, which are the generalizations of that in Gadhi (Positivity 9:687-703, 2005), are also established. Moreover, by using a special scalarization function, a real set-valued optimization problem is introduced and the equivalent relations between the solutions are proved for the real set-valued optimization problem and a generalized D. C. multiobjective optimization problem.
|dc.title||Subdifferential and optimality conditions for the difference of set-valued mappings|
|curtin.department||Department of Mathematics and Statistics|
|curtin.accessStatus||Fulltext not available|
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