Monotone set functions defined by Choquet integral

被引:51
作者
Wang, ZY
Klir, GJ
Wang, W
机构
[1] Department of Systems Science and Industrial Engineering, Thomas J. Watson School of Engineering and Applied Science, Binghamton University-SUNY, Binghamton
来源
FUZZY SETS AND SYSTEMS | 1996年 / 81卷 / 02期
关键词
monotone set functions; fuzzy measures; Choquet integral; absolute continuity; structural characteristics of set functions;
D O I
10.1016/0165-0114(95)00181-6
中图分类号
TP301 [理论、方法];
学科分类号
081202 ;
摘要
Given a nonnegative monotone set function and a nonnegative measurable function on a measurable space, the Choquet integral determines a new nonnegative monotone set function that is absolutely continuous with respect to the original one (in a generalized sense for monotone set functions). This new set function preserves almost all desirable structural characteristics of the original monotone set function, such as continuity, subadditivity, superadditivity, null-additivity, converse-null-additivity, autocontinuity, converse-autocontinuity, uniform autocontinuity, uniform converse-autocontinuity, and fuzzy multiplicativity. Such a construction is a useful method to define sound fuzzy measures in various applications.
引用
收藏
页码:241 / 250
页数:10
相关论文
共 50 条
  • [11] Upper Derivatives of Set Functions Represented as the Choquet Indefinite Integral
    Nakamura, Shinsuke
    Takasawa, Toshiyuki
    Murofushi, Toshiaki
    NONLINEAR MATHEMATICS FOR UNCERTAINTY AND ITS APPLICATIONS, 2011, 100 : 61 - +
  • [12] Set defuzzification and Choquet integral
    Ogura, Y
    Li, SM
    Ralescu, DA
    INTERNATIONAL JOURNAL OF UNCERTAINTY FUZZINESS AND KNOWLEDGE-BASED SYSTEMS, 2001, 9 (01) : 1 - 12
  • [13] Sugeno integral based on absolutely monotone real set functions
    Mihailovic, Biljana
    Pap, Endre
    FUZZY SETS AND SYSTEMS, 2010, 161 (22) : 2857 - 2869
  • [14] On the space of measurable functions and its topology determined by the Choquet integral
    Ouyang, Yao
    Zhang, Hua-peng
    INTERNATIONAL JOURNAL OF APPROXIMATE REASONING, 2011, 52 (09) : 1355 - 1362
  • [15] Double set-function Choquet integral with applications
    Zhang, Deli
    Mesiar, Radko
    Pap, Endre
    INFORMATION SCIENCES, 2024, 677
  • [16] Learning monotone nonlinear models using the Choquet integral
    Ali Fallah Tehrani
    Weiwei Cheng
    Krzysztof Dembczyński
    Eyke Hüllermeier
    Machine Learning, 2012, 89 : 183 - 211
  • [17] The state-of-art of the generalizations of the Choquet integral: From aggregation and pre-aggregation to ordered directionally monotone functions
    Dimuro, Gracaliz Pereira
    Fernandez, Javier
    Bedregal, Benjamin
    Mesiar, Radko
    Antonio Sanz, Jose
    Lucca, Giancarlo
    Bustince, Humberto
    INFORMATION FUSION, 2020, 57 (57) : 27 - 43
  • [18] Choquet integral Jensen's inequalities for set-valued and fuzzy set-valued functions
    Zhang, Deli
    Guo, Caimei
    Chen, Degang
    Wang, Guijun
    SOFT COMPUTING, 2021, 25 (02) : 903 - 918
  • [19] Choquet integral Jensen’s inequalities for set-valued and fuzzy set-valued functions
    Deli Zhang
    Caimei Guo
    Degang Chen
    Guijun Wang
    Soft Computing, 2021, 25 : 903 - 918
  • [20] Integrals based on monotone set functions
    Klement, Erich Peter
    Li, Jun
    Mesiar, Radko
    Pap, Endre
    FUZZY SETS AND SYSTEMS, 2015, 281 : 88 - 102
12345