COEFFICIENT BOUND OF A GENERALIZED CLOSE-TO-CONVEX FUNCTION

The paper presents sufficient conditions for certain functions to be convex. Functions of this type often appear in Markov decision processes, where their maximum is the solution of the problem. Since a convex function takes its maximum at an extreme point, the conditions may greatly simplify a problem. In some cases a full solution may be obtained after the reduction is made. Some illustrative examples are discussed.

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On Certain Differential Subordination of Harmonic Mean Related to a Linear Function

Symmetry ◽

10.3390/sym13060966 ◽

2021 ◽

Vol 13 (6) ◽

pp. 966

Author(s):

Anna Dobosz ◽

Piotr Jastrzębski ◽

Adam Lecko

Keyword(s):

Convex Function ◽

Linear Function ◽

Differential Subordination ◽

Harmonic Mean ◽

Best Dominant ◽

Symmetry Properties ◽

Differential Subordinations ◽

Difficult Issue

In this paper we study a certain differential subordination related to the harmonic mean and its symmetry properties, in the case where a dominant is a linear function. In addition to the known general results for the differential subordinations of the harmonic mean in which the dominant was any convex function, one can study such differential subordinations for the selected convex function. In this case, a reasonable and difficult issue is to look for the best dominant or one that is close to it. This paper is devoted to this issue, in which the dominant is a linear function, and the differential subordination of the harmonic mean is a generalization of the Briot–Bouquet differential subordination.

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A note on generalized convex functions

Journal of Inequalities and Applications ◽

10.1186/s13660-019-2242-0 ◽

2019 ◽

Vol 2019 (1) ◽

Cited By ~ 22

Author(s):

Syed Zaheer Ullah ◽

Muhammad Adil Khan ◽

Yu-Ming Chu

Keyword(s):

Convex Function ◽

Convex Functions ◽

Type Inequality ◽

Generalized Convex Functions

Abstract In the article, we provide an example for a η-convex function defined on rectangle is not convex, prove that every η-convex function defined on rectangle is coordinate η-convex and its converse is not true in general, define the coordinate $(\eta _{1}, \eta _{2})$(η1,η2)-convex function and establish its Hermite–Hadamard type inequality.

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Generalized fractional Ostrowski type integral inequalities for logarithmically h-convex function

The Journal of Analysis ◽

10.1007/s41478-021-00310-z ◽

2021 ◽

Author(s):

Sabir Hussain ◽

Faiza Azhar ◽

Muhammad Amer Latif

Keyword(s):

Convex Function ◽

Integral Inequalities ◽

Type Integral

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Estimation of different entropies via Lidstone polynomial using Jensen-type functionals

Arabian Journal of Mathematics ◽

10.1007/s40065-020-00277-y ◽

2020 ◽

Vol 9 (3) ◽

pp. 613-631

Author(s):

Khuram Ali Khan ◽

Tasadduq Niaz ◽

Đilda Pečarić ◽

Josip Pečarić

Keyword(s):

Convex Function ◽

Shannon Entropy ◽

Rényi Divergence ◽

Lidstone Polynomial

Abstract In this work, some new functional of Jensen-type inequalities are constructed using Shannon entropy, f-divergence, and Rényi divergence, and some estimates are obtained for these new functionals. Also using the Zipf–Mandelbrot law and hybrid Zipf–Mandelbrot law, we investigate some bounds for these new functionals. Furthermore, we generalize these new functionals for m-convex function using Lidstone polynomial.

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Continuity of h-convex functions

Asian-European Journal of Mathematics ◽

10.1142/s1793557119500591 ◽

2019 ◽

Vol 12 (04) ◽

pp. 1950059

Author(s):

M. Rostamian Delavar ◽

S. S. Dragomir

Keyword(s):

Convex Function ◽

Convex Functions ◽

Continuity Condition

In this paper, a condition which implies the continuity of an [Formula: see text]-convex function is investigated. In fact, any [Formula: see text]-convex function bounded from above is continuous if the function [Formula: see text] satisfies a certain condition which is called pre-continuity condition.

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Fe-convex Function and Fractional Semi-infinite Programming

2010 International Conference of Information Science and Management Engineering ◽

10.1109/isme.2010.25 ◽

2010 ◽

Cited By ~ 1

Author(s):

Yong Yang

Keyword(s):

Convex Function ◽

Infinite Programming

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Stability of the Graph of a Convex Function

Results in Mathematics ◽

10.1007/bf03322915 ◽

2003 ◽

Vol 44 (1-2) ◽

pp. 86-96 ◽

Cited By ~ 1

Author(s):

Chaobang Gao

Keyword(s):

Convex Function

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Some remarks on probability inequalities for sums of bounded convex random variables

Journal of Applied Probability ◽

10.2307/3212418 ◽

1975 ◽

Vol 12 (1) ◽

pp. 155-158 ◽

Cited By ~ 1

Author(s):

M. Goldstein

Keyword(s):

Convex Function ◽

Exponential Convergence ◽

Random Variables ◽

Upper Bounds ◽

Independent Random Variables ◽

Probability Inequalities ◽

Continuous Convex Function ◽

Bounded Convex

Let X1, X2, · ··, Xn be independent random variables such that ai ≦ Xi ≦ bi, i = 1,2,…n. A class of upper bounds on the probability P(S−ES ≧ nδ) is derived where S = Σf(Xi), δ > 0 and f is a continuous convex function. Conditions for the exponential convergence of the bounds are discussed.

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Errors of gradient extrema of a strictly convex function of discrete argument

Discrete Mathematics and Applications ◽

10.1515/dma.1992.2.2.119 ◽

1992 ◽

Vol 2 (2) ◽

Cited By ~ 2

Author(s):

V. A. EMELICHEV ◽

M. M. KOVALEV ◽

A. B. RAMAZANOV

Keyword(s):

Convex Function ◽

Strictly Convex ◽

Discrete Argument

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