Description

Book Synopsis

An original, systematic-solution approach to uncertain nonlinear systems control and modeling using fuzzy equations and fuzzy differential equations

There are various numerical and analytical approaches to the modeling and control of uncertain nonlinear systems. Fuzzy logic theory is an increasingly popular method used to solve inconvenience problems in nonlinear modeling.Modeling and Control of Uncertain Nonlinear Systems with Fuzzy Equations andZ-Numberpresents a structured approach to the control and modeling of uncertain nonlinear systems in industry using fuzzy equations and fuzzy differential equations.

The first major work to explore methods based on neural networks and Bernstein neural networks, this innovative volume provides a framework for control and modeling of uncertain nonlinear systems with applications to industry. Readers learn how to use fuzzy techniques to solve scientific and engineering problems and understand intelligent cont

Table of Contents

List of Figures xi

List of Tables xiii

Preface xv

1 Fuzzy Equations 1

1.1 Introduction 1

1.2 Fuzzy Equations 1

1.3 Algebraic Fuzzy Equations 3

1.4 Numerical Methods for Solving Fuzzy Equations 5

1.4.1 Newton Method 5

1.4.2 Steepest Descent Method 7

1.4.3 Adomian Decomposition Method 8

1.4.4 Ranking Method 9

1.4.5 Intelligent Methods 10

1.4.5.1 Genetic Algorithm Method 10

1.4.5.2 Neural Network Method 11

1.4.5.3 Fuzzy Linear Regression Model 14

1.5 Summary 20

2 Fuzzy Differential Equations 21

2.1 Introduction 21

2.2 Predictor–Corrector Method 21

2.3 Adomian Decomposition Method 23

2.4 Euler Method 23

2.5 Taylor Method 25

2.6 Runge–Kutta Method 25

2.7 Finite Difference Method 26

2.8 Differential Transform Method 28

2.9 Neural Network Method 29

2.10 Summary 36

3 Modeling and Control Using Fuzzy Equations 39

3.1 Fuzzy Modeling with Fuzzy Equations 39

3.1.1 Fuzzy Parameter Estimation with Neural Networks 45

3.1.2 Upper Bounds of the Modeling Errors 48

3.2 Control with Fuzzy Equations 52

3.3 Simulations 59

3.4 Summary 67

4 Modeling and Control Using Fuzzy Differential Equations 69

4.1 Introduction 69

4.2 Fuzzy Modeling with Fuzzy Differential Equations 69

4.3 Existence of a Solution 72

4.4 Solution Approximation using Bernstein Neural Networks 79

4.5 Solutions Approximation using the Fuzzy Sumudu Transform 83

4.6 Simulations 85

4.7 Summary 99

5 System Modeling with Partial Differential Equations 101

5.1 Introduction 101

5.2 Solutions using Burgers–Fisher Equations 101

5.3 Solution using Wave Equations 106

5.4 Simulations 109

5.5 Summary 117

6 System Control using Z-numbers 119

6.1 Introduction 119

6.2 Modeling using Dual Fuzzy Equations and Z-numbers 119

6.3 Controllability using Dual Fuzzy Equations 124

6.4 Fuzzy Controller 128

6.5 Nonlinear System Modeling 131

6.6 Controllability using Fuzzy Differential Equations 131

6.7 Fuzzy Controller Design using Fuzzy Differential Equations and Z-number 135

6.8 Approximation using a Fuzzy Sumudu Transform and Z-numbers 138

6.9 Simulations 139

6.10 Summary 151

References 153

Index 167

Modeling and Control of Uncertain Nonlinear

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A Hardback by Wen Yu, Raheleh Jafari

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    View other formats and editions of Modeling and Control of Uncertain Nonlinear by Wen Yu

    Publisher: John Wiley & Sons Inc
    Publication Date: 03/09/2019
    ISBN13: 9781119491552, 978-1119491552
    ISBN10: 111949155X
    Also in:
    Fuzzy set theory

    Description

    Book Synopsis

    An original, systematic-solution approach to uncertain nonlinear systems control and modeling using fuzzy equations and fuzzy differential equations

    There are various numerical and analytical approaches to the modeling and control of uncertain nonlinear systems. Fuzzy logic theory is an increasingly popular method used to solve inconvenience problems in nonlinear modeling.Modeling and Control of Uncertain Nonlinear Systems with Fuzzy Equations andZ-Numberpresents a structured approach to the control and modeling of uncertain nonlinear systems in industry using fuzzy equations and fuzzy differential equations.

    The first major work to explore methods based on neural networks and Bernstein neural networks, this innovative volume provides a framework for control and modeling of uncertain nonlinear systems with applications to industry. Readers learn how to use fuzzy techniques to solve scientific and engineering problems and understand intelligent cont

    Table of Contents

    List of Figures xi

    List of Tables xiii

    Preface xv

    1 Fuzzy Equations 1

    1.1 Introduction 1

    1.2 Fuzzy Equations 1

    1.3 Algebraic Fuzzy Equations 3

    1.4 Numerical Methods for Solving Fuzzy Equations 5

    1.4.1 Newton Method 5

    1.4.2 Steepest Descent Method 7

    1.4.3 Adomian Decomposition Method 8

    1.4.4 Ranking Method 9

    1.4.5 Intelligent Methods 10

    1.4.5.1 Genetic Algorithm Method 10

    1.4.5.2 Neural Network Method 11

    1.4.5.3 Fuzzy Linear Regression Model 14

    1.5 Summary 20

    2 Fuzzy Differential Equations 21

    2.1 Introduction 21

    2.2 Predictor–Corrector Method 21

    2.3 Adomian Decomposition Method 23

    2.4 Euler Method 23

    2.5 Taylor Method 25

    2.6 Runge–Kutta Method 25

    2.7 Finite Difference Method 26

    2.8 Differential Transform Method 28

    2.9 Neural Network Method 29

    2.10 Summary 36

    3 Modeling and Control Using Fuzzy Equations 39

    3.1 Fuzzy Modeling with Fuzzy Equations 39

    3.1.1 Fuzzy Parameter Estimation with Neural Networks 45

    3.1.2 Upper Bounds of the Modeling Errors 48

    3.2 Control with Fuzzy Equations 52

    3.3 Simulations 59

    3.4 Summary 67

    4 Modeling and Control Using Fuzzy Differential Equations 69

    4.1 Introduction 69

    4.2 Fuzzy Modeling with Fuzzy Differential Equations 69

    4.3 Existence of a Solution 72

    4.4 Solution Approximation using Bernstein Neural Networks 79

    4.5 Solutions Approximation using the Fuzzy Sumudu Transform 83

    4.6 Simulations 85

    4.7 Summary 99

    5 System Modeling with Partial Differential Equations 101

    5.1 Introduction 101

    5.2 Solutions using Burgers–Fisher Equations 101

    5.3 Solution using Wave Equations 106

    5.4 Simulations 109

    5.5 Summary 117

    6 System Control using Z-numbers 119

    6.1 Introduction 119

    6.2 Modeling using Dual Fuzzy Equations and Z-numbers 119

    6.3 Controllability using Dual Fuzzy Equations 124

    6.4 Fuzzy Controller 128

    6.5 Nonlinear System Modeling 131

    6.6 Controllability using Fuzzy Differential Equations 131

    6.7 Fuzzy Controller Design using Fuzzy Differential Equations and Z-number 135

    6.8 Approximation using a Fuzzy Sumudu Transform and Z-numbers 138

    6.9 Simulations 139

    6.10 Summary 151

    References 153

    Index 167

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