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Volume 3, Issue 3, 31 December 2021, Pages 309-316
Abstract. We prove both necessary and sufficient conditions for the weak sharp minima of convex composite functions, where the latter requires neither the (lower semi-)continuity of the convex function nor the restriction on Banach spaces, and permits an application to vector optimization in connection with the notion of super efficiency.
How to Cite this Article:
Stefan Hamann, Minimality conditions for convex composite functions and an application in vector optimization, Appl. Set-Valued Anal. Optim. 3 (2021), 309-316.