Free standard shipping on all orders
  • Visa
  • Master Card
  • American Express
  • Apple Pay
  • Google Pay
  • JCB

A First Course in Fuzzy Logic book cover

4th Edition

A First Course in Fuzzy Logic

By Hung T. Nguyen, Carol Walker, Elbert A. Walker Copyright 2018
458 Pages 36 B/W Illustrations
by Chapman & Hall

458 Pages 36 B/W Illustrations
by Chapman & Hall

458 Pages 36 B/W Illustrations
by Chapman & Hall
Also available as eBook on:
A First Course in Fuzzy Logic, Fourth Edition is an expanded version of the successful third edition. It provides a comprehensive introduction to the theory and applications of fuzzy logic. This popular text offers a firm mathematical basis for the calculus of fuzzy concepts necessary for designing intelligent systems and a solid background for readers to pursue further studies and... Read more

The Concept of Fuzziness



Examples. Mathematical modeling. Some operations on fuzzy sets. Fuzziness as uncertainty.





Some Algebra of Fuzzy Sets



Boolean algebras and lattices. Equivalence relations and partitions. Composing mappings. Isomorphisms and homomorphisms. Alpha-cuts. Images of alpha-level sets.





Fuzzy Quantities



Fuzzy quantities. Fuzzy numbers. Fuzzy intervals.





Logical Aspects of Fuzzy Sets



Classical two-valued logic. A three-valued logic. Fuzzy logic. Fuzzy and Lukasiewicz logics. Interval-valued fuzzy logic.





Basic Connectives



t-norms. Generators of t-norms. Isomorphisms of t-norms. Negations. Nilpotent t-norms and negations. T-conforms. De Morgan systems. Groups and t-norms. Interval-valued fuzzy sets. Type-2 fuzzy sets.





Additional Topics on Connectives



Fuzzy implications. Averaging operators. Powers of t-norms. Sensitivity of connectives. Copulas and t-norms.





Fuzzy Relations



Definitions and examples. Binary fuzzy relations. Operations on fuzzy relations. Fuzzy partitions. Fuzzy relations as Chu spaces. Approximate reasoning. Approximate reasoning in expert systems. A simple form of generalized modus ponens. The compositional rule of inference.





Universal Approximation



Fuzzy rule bases. Design methodologies. Some mathematical background. Approximation capability.



Possibility Theory



Probability and uncertainty. Random sets. Possibility measures.





Partial Knowledge



Motivations. Belief functions and incidence algebras. Monotonicity. Beliefs, densities, and allocations. Belief functions on infinite sets. Mobius transforms of set-functions. Reasoning with belief functions. Decision making using belief functions. Rough sets. Conditional events.





Fuzzy Measures



Motivation and definitions. Fuzzy measures and lower probabilities. Fuzzy measures in other areas. Conditional fuzzy measures.





The Choquet Integral



The Lebesgue integral. The Sugeno integral. The Choquet integral.





Fuzzy Modeling and Control



Motivation for fuzzy control. The methodology of fuzzy control. Optimal fuzzy control. An analysis of fuzzy control techniques.

Biography

Hung T. Nguyen is a Professor Emeritus at the Department of Mathematical Sciences, New Mexico State University. He is also an Adjunct Professor of Economics at Chiang Mai University, Thailand.





Carol L. Walker is also a Professor Emeritus at the Department of Mathematical Sciences, New Mexico State University.





Elbert A. Walker is a Professor Emeritus, Department of Mathematical Sciences, New Mexico State University.

Add to Cart