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Absolute Continuity of Fuzzy Measures and Convergence of Sequence of Measurable Functions

Author

Listed:
  • Jun Li

    (School of Sciences, Communication University of China, Beijing 100024, China
    School of Data Science and Media Intelligence, Communication University of China, Beijing 100024, China)

Abstract

In this note, the convergence of the sum of two convergent sequences of measurable functions is studied by means of two types of absolute continuity of fuzzy measures, i.e., strong absolute continuity of Type I, and Type VI. The discussions of convergence a.e. and convergence in measure are done in the general framework relating to a pair of monotone measures, and general results are shown. The previous related results are generalized.

Suggested Citation

  • Jun Li, 2020. "Absolute Continuity of Fuzzy Measures and Convergence of Sequence of Measurable Functions," Mathematics, MDPI, vol. 8(5), pages 1-7, May.
    • Handle: RePEc:gam:jmathe:v:8:y:2020:i:5:p:726-:d:354030
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