On semi-E-convex and quasi-semi-E-convex functions
On semi-E-convex and quasi-semi-E-convex functions
In this paper we give some necessary and suffcient conditions under which a lower semi-continuous function de ned on a real normed space is a semi-E-convex or quasi-semi-E-convex function.
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- [1] Chen, X. Some Properties of semi-E-convex Functions J. Math. Anal. Appi. 275. 251-262, 2002.
- [2] Syau, Y. Ft. and Lee, E. S. Some properties of E-convex functions, Elsevier Applied Mathematics Letters 18, 1074-1080, 2005.
- [3] Syau, Y. R. A Note On Convex Functions. Internal. J. Math. Scl. 22(3), 525 534, 1999.
- [4] Yang, X. M. Technical Note On E-convex Sets, E^-convex Functionit, and E-convex Program-ing, Journal of Optimization Theory and Applications 109(3), 099-704, 2001.
- [5] Youness, E. A. E-convex sets, E-convex Functions, and E-convex. Programming, Journal of Optimization Theory and Applications 102 (2), 439 -450, 1999.
- Yayın Aralığı: Yılda 6 Sayı
- Başlangıç: 2002
- Yayıncı: Hacettepe Üniversitesi Fen Fakultesi
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