Results in semi-E-convex functions

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Ayache Benhadid

Abstract

The concept of convexity and its various generalizations is important for quantitative and qualitative studies in operations research or applied mathematics. Recently, E-convex sets and functions were introduced with important implications across numerous branches of mathematics. By relaxing the definition of convex sets and functions, a new concept of semi-EE-convex functions was introduced, and its properties are discussed. It has been demonstrated that if a function f:M→Rf:M→R is semi-EE-convex on an EE-convex set M⊂RnM⊂Rn then, f(E(x))≤f(x)f(E(x))≤f(x) for each x∈Mx∈M. This article discusses the inverse of this proposition and presents some results for convex functions.

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How to Cite
[1]
Benhadid, A. 2022. Results in semi-E-convex functions. Journal of Innovative Applied Mathematics and Computational Sciences. 2, 2 (Sep. 2022), 48–52. DOI:https://doi.org/10.58205/jiamcs.v2i2.18.
Section
Conference paper (ICMA'2021)

References

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E. A. Youness, E-convex sets, E-convex functions, and E-convex programming, J. Optim. Theory Appl., 102 (1999), 439–450.

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