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Hsien-Chung Wu
Mathematical Foundations of Fuzzy Sets
English · Hardback
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Description
Mathematical Foundations of Fuzzy Sets
Introduce yourself to the foundations of fuzzy logic with this easy-to-use guide
Many fields studied are defined by imprecise information or high degrees of uncertainty. When this uncertainty derives from randomness, traditional probabilistic statistical methods are adequate to address it; more everyday forms of vagueness and imprecision, however, require the toolkit associated with 'fuzzy sets' and 'fuzzy logic'. Engineering and mathematical fields related to artificial intelligence, operations research and decision theory are now strongly driven by fuzzy set theory.
Mathematical Foundations of Fuzzy Sets introduces readers to the theoretical background and practical techniques required to apply fuzzy logic to engineering and mathematical problems. It introduces the mathematical foundations of fuzzy sets as well as the current cutting edge of fuzzy-set operations and arithmetic, offering a rounded introduction to this essential field of applied mathematics. The result can be used either as a textbook or as an invaluable reference for working researchers and professionals.
Mathematical Foundations of Fuzzy Sets offers thereader:
* Detailed coverage of set operations, fuzzification of crisp operations, and more
* Logical structure in which each chapter builds carefully on previous results
* Intuitive structure, divided into 'basic' and 'advanced' sections, to facilitate use in one- or two-semester courses
Mathematical Foundations of Fuzzy Sets is essential for graduate students and academics in engineering and applied mathematics, particularly those doing work in artificial intelligence, decision theory, operations research, and related fields.
List of contents
Preface ix
1 Mathematical Analysis 1
1.1 Infimum and Supremum 1
1.2 Limit Inferior and Limit Superior 3
1.3 Semi-Continuity 11
1.4 Miscellaneous 19
2 Fuzzy Sets 23
2.1 Membership Functions 23
2.2 alpha-level Sets 24
2.3 Types of Fuzzy Sets 34
3 Set Operations of Fuzzy Sets 43
3.1 Complement of Fuzzy Sets 43
3.2 Intersection of Fuzzy Sets 44
3.3 Union of Fuzzy Sets 51
3.4 Inductive and Direct Definitions 56
3.5 alpha-Level Sets of Intersection and Union 61
3.6 Mixed Set Operations 65
4 Generalized Extension Principle 69
4.1 Extension Principle Based on the Euclidean Space 69
4.2 Extension Principle Based on the Product Spaces 75
4.3 Extension Principle Based on the Triangular Norms 84
4.4 Generalized Extension Principle 92
5 Generating Fuzzy Sets 109
5.1 Families of Sets 110
5.2 Nested Families 112
5.3 Generating Fuzzy Sets from Nested Families 119
5.4 Generating Fuzzy Sets Based on the Expression in the Decomposition
Theorem 123
5.4.1 The Ordinary Situation 123
5.4.2 Based on One Function 129
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5.4.3 Based on Two Functions 140
5.5 Generating Fuzzy Intervals 150
5.6 Uniqueness of Construction 160
6 Fuzzification of Crisp Functions 173
6.1 Fuzzification Using the Extension Principle 173
6.2 Fuzzification Using the Expression in the Decomposition Theorem 176
6.2.1 Nested Family Using alpha-Level Sets 177
6.2.2 Nested Family Using Endpoints 181
6.2.3 Non-Nested Family Using Endpoints 184
6.3 The Relationships between EP and DT 187
6.3.1 The Equivalences 187
6.3.2 The Fuzziness 191
6.4 Differentiation of Fuzzy Functions 196
6.4.1 Defined on Open Intervals 196
6.4.2 Fuzzification of Differentiable Functions Using the Extension Principle 197
6.4.3 Fuzzification of Differentiable Functions Using the Expression in the
Decomposition Theorem 198
6.5 Integrals of Fuzzy Functions 201
6.5.1 Lebesgue Integrals on a Measurable Set 201
6.5.2 Fuzzy Riemann Integrals Using the Expression in the Decomposition
Theorem 203
6.5.3 Fuzzy Riemann Integrals Using the Extension Principle 207
7 Arithmetics of Fuzzy Sets 211
7.1 Arithmetics of Fuzzy Sets in R 211
7.1.1 Arithmetics of Fuzzy Intervals 214
7.1.2 Arithmetics Using EP and DT 220
7.1.2.1 Addition of Fuzzy Intervals 220
7.1.2.2 Difference of Fuzzy Intervals 222
7.1.2.3 Multiplication of Fuzzy Intervals 224
7.2 Arithmetics of Fuzzy Vectors 227
7.2.1 Arithmetics Using the Extension Principle 230
7.2.2 Arithmetics Using the Expression in the Decomposition Theorem 230
7.3 Difference of Vectors of Fuzzy Intervals 235
7.3.1 alpha-Level Sets of AOEP
B 235
7.3.2 alpha-Level Sets of A Oo
DT
B 237
7.3.3 alpha-Level Sets of A Oo
DT
B 239
7.3.4 alpha-Level Sets of A Oi
DT
B 241
7.3.5 The Equivalences and Fuzziness 243
7.4 Addition of Vectors of Fuzzy Intervals 244
7.4.1 alpha-Level Sets of A oplus EP
B 244
7.4.2 alpha-Level Sets of
About the author
Hsien-Chung Wu. PhD, is Professor in the Department of Mathematics at National Kaohsiung Normal University, Taiwan. He is an Associate Editor of Fuzzy Optimization and Decision Making, and an Area Editor of International Journal of Uncertainty, Fuzziness and Knowledge-Based Systems. He has published extensively in these areas of research and is the sole author of more than 120 scientific papers published in international journals.
Product details
Authors | Hsien-Chung Wu |
Publisher | Wiley, John and Sons Ltd |
Languages | English |
Product format | Hardback |
Released | 16.02.2023 |
EAN | 9781119981527 |
ISBN | 978-1-119-98152-7 |
No. of pages | 416 |
Subjects |
Natural sciences, medicine, IT, technology
> Mathematics
> Miscellaneous
Mathematik, Logik, Mathematics, Fuzzy-Systeme, Fuzzylogik, Fuzzy-Logik, Electrical & Electronics Engineering, Elektrotechnik u. Elektronik, Fuzzy Systems, Logik u. Grundlagen der Mathematik, Logic & Foundations, Mathematik in den Ingenieurwissenschaften, Applied Mathematics in Engineering |
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