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Presents new developments on machine tool vibration control
based on discontinuous dynamical systems
Machining instability is a topical area, and there are a wide
range of publications that cover the topic. However, many of these
previous studies have started by assuming that the behavior of the
system can be linearised. Meanwhile, there are many recent advances
in the fields of signal processing, nonlinear dynamics, and
nonlinear control, all of which are relevant to the machining
stability problem. This book establishes the fundamentals of
cutting mechanics and machine tool dynamics in the simultaneous
time-frequency domain. The new nonlinear control theory
developed by the authors that facilitates simultaneous control of
vibration amplitude in the time-domain and spectral response in the
frequency-domain provides the foundation for the development of a
controller architecture universally viable for the control of
dynamic instability including bifurcation and chaos. Once
parameters underlying the coupling, interaction, and evolution of
different cutting states and between the tool and workpiece are
established, they can then be incorporated into the architecture to
create a control methodology that mitigate machining instability
and enable robust, chatter-free machine tool design applicable in
particular to high speed micro- and nano-machining.
Presents new developments on machine tool vibration control
based on discontinuous dynamical systems
Provides a clear and concise approach to the understanding and
control of machine tool and workpiece vibrations from an
alternative view, contributing to an in-depth understanding of
cutting dynamics and robust control of machining instability
Equips the reader with the knowledge to understand the dynamics
of cutting and operation of machine-tool systems in different
conditions as well as the concept of cutting instability
control
Includes data examples in MATLAB coding
Auteur
Dr C. Steve Suh, Director, Institute for Innovation and
Design in Engineering, Department of Mechanical Engineering, Texas
A&M University, USA. Dr Suh obtained his PhD in
Mechanical Engineering from Texas A&M University in
Dr Meng-Kun Liu, Lecturer, Department of Mechanical
Engineering, Texas A&M University, USA. Dr.Liu
obtained his PhD in Mechanical Engineering from Texas A&M
University in 2012. He has two-years senior
design instructor experience in system engineering, project
management and design optimization, and four years hands-on
experience in industrial projects with focuses on design
innovation. He was the recipient of the 2012 Departmental Graduate
Student Teaching Award, and has co-authored numerous journal
articles and conference proceedings. This is his first
book.
Résumé
Presents new developments on machine tool vibration control based on discontinuous dynamical systems
Machining instability is a topical area, and there are a wide range of publications that cover the topic. However, many of these previous studies have started by assuming that the behavior of the system can be linearised. Meanwhile, there are many recent advances in the fields of signal processing, nonlinear dynamics, and nonlinear control, all of which are relevant to the machining stability problem. This book establishes the fundamentals of cutting mechanics and machine tool dynamics in the simultaneous time-frequency domain. The new nonlinear control theory developed by the authors that facilitates simultaneous control of vibration amplitude in the time-domain and spectral response in the frequency-domain provides the foundation for the development of a controller architecture universally viable for the control of dynamic instability including bifurcation and chaos. Once parameters underlying the coupling, interaction, and evolution of different cutting states and between the tool and workpiece are established, they can then be incorporated into the architecture to create a control methodology that mitigate machining instability and enable robust, chatter-free machine tool design applicable in particular to high speed micro- and nano-machining.
Contenu
Preface ix
1 Cutting Dynamics and Machining Instability 1
1.1 Instability in Turning Operation 2
1.1.1 Impact of Coupled Whirling and Tool Geometry on Machining 3
1.2 Cutting Stability 10
1.3 Margin of Stability and Instability 12
1.4 Stability in Fine Cuts 23
1.5 Concluding Remarks 31
References 32
2 Basic Physical Principles 33
2.1 Euclidean Vectors 33
2.2 Linear Spaces 34
2.3 Matrices 36
2.3.1 Eigenvalue and Linear Transformation 37
2.4 Discrete Functions 38
2.4.1 Convolution and Filter Operation 39
2.4.2 Sampling Theorem 40
2.4.3 z-Transform 41
2.5 Tools for Characterizing Dynamic Response 42
2.5.1 Fourier Analysis 49
2.5.2 Wavelet Analysis 51
References 54
3 Adaptive Filters and Filtered-x LMS Algorithm 55
3.1 Discrete-Time FIR Wiener Filter 55
3.1.1 Performance Measure 56
3.1.2 Optimization of Performance Function 58
3.2 Gradient Descent Optimization 60
3.3 Least-Mean-Square Algorithm 62
3.4 Filtered-x LMS Algorithm 64
References 68
4 Time-Frequency Analysis 71
4.1 Time and Frequency Correspondence 72
4.2 Time and Frequency Resolution 75
4.3 Uncertainty Principle 76
4.4 Short-Time Fourier Transform 77
4.5 Continuous-Time Wavelet Transform 79
4.6 Instantaneous Frequency 81
4.6.1 Fundamental Notions 82
4.6.2 Misinterpretation of Instantaneous Frequency 85
4.6.3 Decomposition of Multi-Mode Structure 90
4.6.4 Example of Instantaneous Frequency 94
4.6.5 Characteristics of Nonlinear Response 97
References 100
5 Wavelet Filter Banks 101
5.1 A Wavelet Example 101
5.2 Multiresolution Analysis 104
5.3 Discrete Wavelet Transform and Filter Banks 112
References 116
6 Temporal and Spectral Characteristics of Dynamic Instability 117
6.1 Implication of Linearization in Time-Frequency Domains 118
6.2 Route-to-Chaos in Time-Frequency Domain 125
6.3 Summary 134
References 134
7 Simultaneous Time-Frequency Control of Dynamic Instability 137
7.1 Property of Route-to-Chaos 137
7.1.1 OGY Control of Stationary and Nonstationary H´enon Map 139
7.1.2 Lyapunov-based Control of Stationary and Nonstationary Duffing Oscillator 140
7.2 Property of Chaos Control 144
7.2.1 Simultaneous Time-Frequency Control 145
7.3 Validation of Chaos Control 155
References 162
8 Time-Frequency Control ofMilling Instability and Chatter at High Speed 165
8.1 Milling Control Issues 165
8.2 High-Speed Low Immersion Milling Mod…