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Advanced Concepts in Fuzzy Logic and Systems with Membership Uncertainty 2013 ed. [Kietas viršelis]

  • Formatas: Hardback, 308 pages, aukštis x plotis: 235x155 mm, weight: 647 g, XII, 308 p., 1 Hardback
  • Serija: Studies in Fuzziness and Soft Computing 284
  • Išleidimo metai: 27-Aug-2012
  • Leidėjas: Springer-Verlag Berlin and Heidelberg GmbH & Co. K
  • ISBN-10: 3642295193
  • ISBN-13: 9783642295195
Kitos knygos pagal šią temą:
Advanced Concepts in Fuzzy Logic and Systems with Membership Uncertainty 2013 ed.Didesnis paveikslėlis
  • Formatas: Hardback, 308 pages, aukštis x plotis: 235x155 mm, weight: 647 g, XII, 308 p., 1 Hardback
  • Serija: Studies in Fuzziness and Soft Computing 284
  • Išleidimo metai: 27-Aug-2012
  • Leidėjas: Springer-Verlag Berlin and Heidelberg GmbH & Co. K
  • ISBN-10: 3642295193
  • ISBN-13: 9783642295195
Kitos knygos pagal šią temą:
Pastovi nuoroda: https://www.kriso.lt/db/9783642295195.html
Raktažodžiai:
This book generalizes fuzzy logic systems for different types of uncertainty, including- semantic ambiguity resulting from limited perception or lack of knowledge about exact membership functions- lack of attributes or granularity arising from discretization of real data- imprecise description of membership functions- vagueness perceived as fuzzification of conditional attributes.Consequently, the membership uncertainty can be modeled by combining methods of conventional and type-2 fuzzy logic, rough set theory and possibility theory. In particular, this book provides a number of formulae for implementing the operation extended on fuzzy-valued fuzzy sets and presents some basic structures of generalized uncertain fuzzy logic systems, as well as introduces several of methods to generate fuzzy membership uncertainty. It is desirable as a reference book for under-graduates in higher education, master and doctor graduates in the courses of computer science, computational intelligence, or fuzzy control and classification, and is especially dedicated to researchers and practitioners in industry.

This book provides a number of formulae for implementing the operation extended on fuzzy-valued fuzzy sets, presents basic structures of generalized uncertain fuzzy logic systems, and introduces several of methods to generate fuzzy membership uncertainty.

Recenzijos

From the reviews:

This monograph brings an overview of the theory of type-2 fuzzy set theory, reasoning using rough approximations of fuzzy sets and constructions of fuzzy logic systems . The book brings a sound mathematical background to treat a serious processing of uncertainty, respecting the properties of fuzzy sets important for engineering applications and for their sound uncertain extensions. can be recommended for any reader interested in fuzzy set theory but especially for researchers working with uncertain information, including PhD students. (Radko Mesiar, Zentralblatt MATH, Vol. 1254, 2013)

1 Uncertainty in Fuzzy Sets
1(32)
1.1 Fuzzy Sets
1(8)
1.1.1 Operations on Fuzzy Sets
4(5)
1.2 Fuzzy Sets of Type-2
9(4)
1.2.1 Interval-Valued Fuzzy Sets
11(1)
1.2.2 Fuzzy-Valued Fuzzy Sets
12(1)
1.3 Possibility and Necessity Measures
13(5)
1.3.1 Possibility and Necessity Measures of a Fuzzy Event
17(1)
1.4 Rough Sets and Their Extensions
18(9)
1.4.1 Rough-Fuzzy Sets
21(1)
1.4.2 Fuzzy-Rough Sets as α-Compositions of Rough-Fuzzy Sets
22(3)
1.4.3 Fuzzy-Rough Sets as Possibility and Necessity of Fuzzy Sets
25(2)
1.5 Sources of Uncertainty
27(6)
References
29(4)
2 Algebraic Operations on Fuzzy Valued Fuzzy Sets
33(44)
2.1 Set Theoretic Operations with the Extension Principle: State of the Art
33(5)
2.1.1 Operations on Interval-Valued Fuzzy Sets
35(1)
2.1.2 Operations on Fuzzy-Valued Fuzzy Sets
36(2)
2.2 Analytical Formulae for Extended T-Norms
38(20)
2.2.1 Basic Remark for Fuzzy Truth Intervals
40(1)
2.2.2 Extended Minimum T-Norms Based on Arbitrary T-Norms
41(3)
2.2.3 Extended Continuous Triangular Norms Based on the Minimum
44(5)
2.2.4 Extended Continuous T-Norms Based on the Drastic Product
49(2)
2.2.5 Extended Algebraic Product T-Norm Based on the Product for Trapezoidal Fuzzy Truth Intervals
51(2)
2.2.6 Extended Lukasiewicz T-Norm Based on a Continuous Archimedean T-Norm
53(5)
2.3 Analytical Formulae for Extended T-Conorms
58(3)
2.4 Approximate Extended Triangular Norms
61(5)
2.4.1 Gaussian Approximation to the Minimum-Based Extended Product T-Norm
62(1)
2.4.2 Asymmetric-Gaussian Approximations to the Extended Product Based on the Minimum
63(3)
2.5 Triangular Norms and Complementary Norms on Fuzzy Truth Values
66(4)
2.6 Implications with Fuzzy Valued Fuzzy Sets
70(7)
References
75(2)
3 Defuzzification of Uncertain Fuzzy Sets
77(60)
3.1 State of the Art of Defuzzification Methods
77(8)
3.1.1 KM Iterative Procedure for Interval Extended Defuzzification
79(1)
3.1.2 Defuzzification in Classification
80(2)
3.1.3 Approximate Extended Centroid of Interval-Valued Fuzzy Sets
82(3)
3.2 State of the Art of Defuzzification Methods for General Fuzzy-Valued Fuzzy Sets
85(5)
3.2.1 Exhaustive Extended Centroid Based on the Extension Principle
86(1)
3.2.2 Efficient Strategy of Type-Reduction Based on α-Planes
87(2)
3.2.3 Approximate Extended Centroid
89(1)
3.2.4 Final Defuzzification
90(1)
3.3 Centroid for Convex Fuzzy-Valued Fuzzy Sets
90(27)
3.3.1 Trapezoidal Fuzzy-Valued Fuzzy Sets
92(7)
3.3.2 Triangular Fuzzy-Valued Fuzzy Sets
99(4)
3.3.3 Asymmetric-Gaussian Fuzzy-Valued Fuzzy Sets
103(10)
3.3.4 Gaussian Fuzzy-Valued Fuzzy Sets
113(3)
3.3.5 Symmetric Fuzzy-Valued Fuzzy Sets
116(1)
3.4 Approximate Centroids for Convex Fuzzy-Valued Fuzzy Sets
117(11)
3.4.1 Triangular and Trapezoidal Fuzzy-Valued Fuzzy Sets
118(7)
3.4.2 Gaussian Fuzzy-Valued Fuzzy Sets
125(3)
3.5 Comparative Analysis
128(5)
3.6 Summary
133(4)
References
134(3)
4 Generalized Uncertain Fuzzy Logic Systems
137(44)
4.1 State of the Art
137(9)
4.1.1 Interval-Valued Approximate Reasoning
140(3)
4.1.2 Fuzzy Logic Systems of Type-2
143(3)
4.2 Novel Formulations of Uncertain Fuzzy Logic Systems
146(22)
4.2.1 Interval Fuzzy Logic Systems Employing Fuzzification
146(14)
4.2.2 General Systems Based on Fuzzy-Rough Sets in the Sense of Nakamura
160(8)
4.3 Particular Realizations of Convex Uncertain Fuzzy Logic Systems
168(13)
4.3.1 A Triangular Uncertain Fuzzy Logic System
169(2)
4.3.2 A Trapezoidal Uncertain Fuzzy Logic System
171(2)
4.3.3 Gaussian Uncertain Fuzzy Logic Systems
173(4)
References
177(4)
5 Uncertainty Generation in Uncertain Fuzzy Logic Systems
181(98)
5.1 State of the Art on Uncertainty Generation
181(3)
5.1.1 Conjunctive and Disjunctive Normal Forms
181(1)
5.1.2 Interval Fuzzy C-Means
182(2)
5.2 Multiperson Decision Making
184(17)
5.2.1 Perceptual Computing
186(1)
5.2.2 Coding and Computing with Words
186(1)
5.2.3 Encoding Rules
187(2)
5.2.4 Triangular Type-2 Aggregation
189(3)
5.2.5 Decoding
192(1)
5.2.6 Simulation Examples
193(8)
5.3 Membership Uncertainty Fitting
201(9)
5.3.1 Interval Membership Uncertainty
202(4)
5.3.2 General Membership Uncertainty of Type-2 Fuzzy Sets
206(1)
5.3.3 Simulation Examples
206(4)
5.4 Rough-Fuzzy Systems for Discretization of Inputs and Missing Attributes
210(7)
5.4.1 Simulation Examples
210(7)
5.5 Generalized Fuzzification
217(62)
5.5.1 Non-singleton Fuzzification in Possibilistic-Fuzzy Systems
219(7)
5.5.2 Non-singleton Fuzzification by the Fuzzy-Rough Approximation
226(6)
5.5.3 Simulation Examples
232(39)
5.5.4 Summary
271(3)
References
274(5)
6 Designing Uncertain Fuzzy Logic Systems
279(26)
6.1 Complete Methodology of Designing Uncertain Fuzzy Logic Systems
279(3)
6.1.1 Uncertainty in Fuzzy Logic Systems
280(2)
6.1.2 Fusion of Multiple System Designs
282(1)
6.2 Reduxtion of Computational Complexity
282(20)
6.2.1 Approximations of Interval-Valued Fuzzy Logic Systems
283(16)
6.2.2 Specificity of the Interval-Valued Approach
299(3)
6.3 Summary
302(3)
References
304(1)
Index 305