Jensen's inequalities for set-valued and fuzzy set-valued functions

被引：0

作者：

Zhang, Deli ^{[1
]}

Guo, Caimei ^{[2
]}

Chen, Degang ^{[3
]}

Wang, Guijun ^{[4
]}

机构：

[1] Changchun Normal Univ, Coll Math, Changchun 130032, Peoples R China

[2] Changchun Univ, Coll Sci, Changchun 130022, Peoples R China

[3] North China Elect Power Univ, Dept Math & Phys, Beijing 100080, Peoples R China

[4] Tianjin Normal Univ, Coll Math, Tianjin 300387, Peoples R China

来源：

FUZZY SETS AND SYSTEMS | 2021年 / 404卷

关键词：

Jensen's inequality; Aumann integral; Set-valued; Set-valued function; Fuzzy set-valued function; Fuzzy-interval-valued function; CHOQUET INTEGRALS;

D O I：

10.1016/j.fss.2020.06.003

中图分类号：

TP301 [理论、方法];

学科分类号：

081202 ;

摘要：

Being an important part of classical analysis, Jensen's inequality has drawn much attention recently. Due to its generality, the inequality based on non-additive integrals appears in many forms, such as Sugeno integrals, Choquet integrals and pseudo-integrals. As a well-known generalization of classical one, the set-valued analysis is frequently applied to the research of mathematical economy, control theory and so on. Thus, it is of great necessity to generalize the set-valued case. Motivated by the pioneering work of Costa's Jensen's fuzzy-interval-valued inequality and Strboja et al.'s Jensen's set-valued inequality based on Aumann integrals and pseudo-integrals respectively, this paper focuses particularly on proving certain kinds of Jensen's set-valued inequalities and fuzzy set-valued inequalities. These inequalities consist of two families: the related convex (or concave) function is a set-valued or fuzzy set-valued function and the integrand is a real-valued function; the related convex (or concave) function is a real-valued function and the integrand is a set-valued or fuzzy set-valued function. Particularly, Jensen's interval-valued and fuzzy-intervalvalued inequalities, including Costa's, are obtained as corollaries. (C) 2020 Elsevier B.V. All rights reserved.

引用

页码：178 / 204

页数：27

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