$(s,m_{1}，m_{2})$-凸函数的新hadamard型不等式

Pub Date : 2021-12-01 DOI:10.35634//vm210405

B. Bayraktar, S. Butt, Sh. Shaokat, J.E. Napoles Valdes

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引用次数: 2

摘要

本文引入了函数凸性的一个新概念:$(s,m_{1}，m_{2})$-凸函数。这类函数结合了文献中发现的许多凸型。建立了$(s,m_{1}，m_{2})$-凸性的一些性质，并给出了该类函数的简单例子。在证明恒等式的基础上，得到了关于分数阶积分算子的新的Hadamard型积分不等式。这表明，这些结果给我们，特别是，在文献中可用的一些结果的概括。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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New Hadamard-type inequalities via $(s,m_{1},m_{2})$-convex functions

The article introduces a new concept of convexity of a function: $(s,m_{1},m_{2})$-convex functions. This class of functions combines a number of convexity types found in the literature. Some properties of $(s,m_{1},m_{2})$-convexities are established and simple examples of functions belonging to this class are given. On the basis of the proved identity, new integral inequalities of the Hadamard type are obtained in terms of the fractional integral operator. It is shown that these results give us, in particular, generalizations of a number of results available in the literature.

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