Optimality for Henig Proper Efficiency in Vector Optimization Involving Dini Set-Valued Directional Derivatives ()
ABSTRACT
This note studies the optimality conditions of vector optimization problems involving generalized convexity in locally convex spaces. Based upon the concept of Dini set-valued directional derivatives, the necessary and sufficient optimality conditions are established for Henig proper and strong minimal solutions respectively in generalized preinvex vector optimization problems.
Share and Cite:
G. Yu and H. Bai, "Optimality for Henig Proper Efficiency in Vector Optimization Involving Dini Set-Valued Directional Derivatives,"
Applied Mathematics, Vol. 2 No. 7, 2011, pp. 922-925. doi:
10.4236/am.2011.27126.
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