Lipschitz B-Vex Functions and Nonsmooth Programming |
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| Authors: | X. F. Li J. L. Dong Q. H. Liu |
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| Affiliation: | (1) Department of Mathematics, Jilin University of Technology, Changchun, Jilin, PRC;(2) Department of Mathematics, Jilin University of Technology, Changchun, Jilin, PRC |
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| Abstract: | In this paper, the equivalence between the class of B-vex functions and that of quasiconvex functions is proved. Necessary and sufficient conditions, under which a locally Lipschitz function is B-vex, are established in terms of the Clarke subdifferential. Regularity of locally Lipschitz B-vex functions is discussed. Furthermore, under appropriate conditions, a necessary optimality condition of the Slater type and a sufficient optimality condition are obtained for a nonsmooth programming problem involving B-vex functions. |
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| Keywords: | B-vex functions quasiconvex functions subdifferentials regularity optimality conditions |
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