## Fuzzy Set Theory—and Its ApplicationsSince its inception, the theory of fuzzy sets has advanced in a variety of ways and in many disciplines. Applications of fuzzy technology can be found in artificial intelligence, computer science, control engineering, decision theory, expert systems, logic, management science, operations research, robotics, and others. Theoretical advances have been made in many directions. The primary goal of Fuzzy Set Theory - and its Applications, Fourth Edition is to provide a textbook for courses in fuzzy set theory, and a book that can be used as an introduction. To balance the character of a textbook with the dynamic nature of this research, many useful references have been added to develop a deeper understanding for the interested reader. Fuzzy Set Theory - and its Applications, Fourth Edition updates the research agenda with chapters on possibility theory, fuzzy logic and approximate reasoning, expert systems, fuzzy control, fuzzy data analysis, decision making and fuzzy set models in operations research. Chapters have been updated and extended exercises are included. |

### From inside the book

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Page 24

**mathematical**models can be conceived. These concepts will be discussed in section 3.2. So far we have considered fuzzy sets with crisply defined membership functions or degrees of membership. It is doubtful whether, for instance, ... Page 25

Of course, the

Of course, the

**mathematical**properties of probabilistic sets differ from those of fuzzy sets, and so do the**mathematical**models for intersection, union, and so on. A more general definition of a fuzzy set than is given in definition 2–1 ... Page 30

The

The

**mathematical**aspects of t-norms are excellently presented in the book by Klement, Mesiar and Pap [Klement et al. 2000]. The use of t-norms and t-conorms for modeling the intersection and union of fuzzy sets goes back to the 70s, ... Page 33

Definition 3–14 [Hamacher 1978] The intersection of two fuzzy sets A and B is defined as Ash B={(x, Hang(x)|xe X} where pla(x)|180) Y+(1-Y)(1a(x)+|15(x)-pla(x)\ln(x))” Hamacher wants to derive a

Definition 3–14 [Hamacher 1978] The intersection of two fuzzy sets A and B is defined as Ash B={(x, Hang(x)|xe X} where pla(x)|180) Y+(1-Y)(1a(x)+|15(x)-pla(x)\ln(x))” Hamacher wants to derive a

**mathematical**model for the “and” operator ...Page 43

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### Contents

9 | |

11 | |

16 | |

22 | |

29 | |

Criteria for Selecting Appropriate Aggregation Operators | 43 |

The Extension Principle and Applications | 54 |

Special Extended Operations | 61 |

Applicationoriented Modeling of Uncertainty | 111 |

Linguistic Variables | 140 |

Fuzzy Data Bases and Queries | 265 |

Decision Making in Fuzzy Environments | 329 |

Applications of Fuzzy Sets in Engineering and Management | 371 |

Empirical Research in Fuzzy Set Theory | 443 |

Future Perspectives | 477 |

181 | 485 |

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### Common terms and phrases

aggregation algorithm analysis applications approach appropriate approximately areas assignment assume base called chapter classical clustering compute concepts considered constraints contains corresponding crisp criteria customers decision defined definition degree of membership depends described determine discussed distribution domain elements engineering example exist expert systems expressed extension Figure fuzzy control fuzzy numbers fuzzy set theory given goal human important indicate inference input instance integral interpreted intersection interval knowledge linguistic variable logic mathematical mean measure membership function methods normally objective objective function observed obtain operators optimal positive possible probability problem programming properties provides reasoning relation representing require respect rules scale shown shows similarity situation solution space specific statement structure suggested t-norms Table tion true truth uncertainty values Zadeh