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Since Lord Rayleigh introduced the idea of viscous damping in his classic work "The Theory of Sound" in 1877, it has become standard practice to use this approach in dynamics, covering a wide range of applications from aerospace to civil engineering. However, in the majority of practical cases this approach is adopted more for mathematical convenience than for modeling the physics of vibration damping.
Over the past decade, extensive research has been undertaken on more general "non-viscous" damping models and vibration of non-viscously damped systems. This book, along with a related book…mehr
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Since Lord Rayleigh introduced the idea of viscous damping in his classic work "The Theory of Sound" in 1877, it has become standard practice to use this approach in dynamics, covering a wide range of applications from aerospace to civil engineering. However, in the majority of practical cases this approach is adopted more for mathematical convenience than for modeling the physics of vibration damping.
Over the past decade, extensive research has been undertaken on more general "non-viscous" damping models and vibration of non-viscously damped systems. This book, along with a related book Structural Dynamic Analysis with Generalized Damping Models: Identification, is the first comprehensive study to cover vibration problems with general non-viscous damping. The author draws on his considerable research experience to produce a text covering: dynamics of viscously damped systems; non-viscously damped single- and multi-degree of freedom systems; linear systems with non-local and non-viscous damping; reduced computational methods for damped systems; and finally a method for dealing with general asymmetric systems. The book is written from a vibration theory standpoint, with numerous worked examples which are relevant across a wide range of mechanical, aerospace and structural engineering applications.
Contents
1. Introduction to Damping Models and Analysis Methods.
2. Dynamics of Undamped and Viscously Damped Systems.
3. Non-Viscously Damped Single-Degree-of-Freedom Systems.
4. Non-viscously Damped Multiple-Degree-of-Freedom Systems.
5. Linear Systems with General Non-Viscous Damping.
6. Reduced Computational Methods for Damped Systems
Hinweis: Dieser Artikel kann nur an eine deutsche Lieferadresse ausgeliefert werden.
Over the past decade, extensive research has been undertaken on more general "non-viscous" damping models and vibration of non-viscously damped systems. This book, along with a related book Structural Dynamic Analysis with Generalized Damping Models: Identification, is the first comprehensive study to cover vibration problems with general non-viscous damping. The author draws on his considerable research experience to produce a text covering: dynamics of viscously damped systems; non-viscously damped single- and multi-degree of freedom systems; linear systems with non-local and non-viscous damping; reduced computational methods for damped systems; and finally a method for dealing with general asymmetric systems. The book is written from a vibration theory standpoint, with numerous worked examples which are relevant across a wide range of mechanical, aerospace and structural engineering applications.
Contents
1. Introduction to Damping Models and Analysis Methods.
2. Dynamics of Undamped and Viscously Damped Systems.
3. Non-Viscously Damped Single-Degree-of-Freedom Systems.
4. Non-viscously Damped Multiple-Degree-of-Freedom Systems.
5. Linear Systems with General Non-Viscous Damping.
6. Reduced Computational Methods for Damped Systems
Hinweis: Dieser Artikel kann nur an eine deutsche Lieferadresse ausgeliefert werden.
Produktdetails
- Produktdetails
- ISTE
- Verlag: Wiley & Sons
- 1. Auflage
- Seitenzahl: 368
- Erscheinungstermin: 25. November 2013
- Englisch
- Abmessung: 234mm x 155mm x 25mm
- Gewicht: 658g
- ISBN-13: 9781848215214
- ISBN-10: 1848215215
- Artikelnr.: 36957356
- ISTE
- Verlag: Wiley & Sons
- 1. Auflage
- Seitenzahl: 368
- Erscheinungstermin: 25. November 2013
- Englisch
- Abmessung: 234mm x 155mm x 25mm
- Gewicht: 658g
- ISBN-13: 9781848215214
- ISBN-10: 1848215215
- Artikelnr.: 36957356
Sondipon Adhikari is Chair Professor of Aerospace Engineering at Swansea University, Wales. His wide-ranging and multi-disciplinary research interests include uncertainty quantification in computational mechanics, bio- and nanomechanics, dynamics of complex systems, inverse problems for linear and nonlinear dynamics, and renewable energy. He is a technical reviewer of 97 international journals, 18 conferences and 13 funding bodies. He has written over 180 refereed journal papers, 120 refereed conference papers and has authored or co-authored 15 book chapters.
Preface xi Nomenclature xv Chapter 1. Introduction to Damping Models and
Analysis Methods 1 1.1. Models of damping 3 1.1.1. Single-degree-of-freedom
systems 4 1.1.2. Continuous systems 8 1.1.3. Multiple-degrees-of-freedom
systems 10 1.1.4. Other studies 11 1.2. Modal analysis of viscously damped
systems 13 1.2.1. The state-space method 14 1.2.2. Methods in the
configuration space 15 1.3. Analysis of non-viscously damped systems 21
1.3.1. State-space-based methods 22 1.3.2. Time-domain-based methods 23
1.3.3. Approximate methods in the configuration space 23 1.4.
Identification of viscous damping 24 1.4.1. Single-degree-of-freedom
systems 24 1.4.2. Multiple-degrees-of-freedom systems 25 1.5.
Identification of non-viscous damping 28 1.6. Parametric sensitivity of
eigenvalues and eigenvectors 29 1.6.1. Undamped systems 29 1.6.2. Damped
systems 30 1.7. Motivation behind this book 32 1.8. Scope of the book 33
Chapter 2. Dynamics of Undamped and Viscously Damped Systems 41 2.1.
Single-degree-of-freedom undamped systems 41 2.1.1. Natural frequency 42
2.1.2. Dynamic response 43 2.2. Single-degree-of-freedom viscously damped
systems 45 2.2.1. Natural frequency 46 2.2.2. Dynamic response 47 2.3.
Multiple-degree-of-freedom undamped systems 52 2.3.1. Modal analysis 53
2.3.2. Dynamic response 55 2.4. Proportionally damped systems 58 2.4.1.
Condition for proportional damping 60 2.4.2. Generalized proportional
damping 61 2.4.3. Dynamic response 65 2.5. Non-proportionally damped
systems 80 2.5.1. Free vibration and complex modes 81 2.5.2. Dynamic
response 87 2.6. Rayleigh quotient for damped systems 93 2.6.1. Rayleigh
quotients for discrete systems 94 2.6.2. Proportional damping 96 2.6.3.
Non-proportional damping 97 2.6.4. Application of Rayleigh quotients 100
2.6.5. Synopses 101 2.7. Summary 101 Chapter 3. Non-Viscously Damped
Single-Degree-of-Freedom Systems 103 3.1. The equation of motion 104 3.2.
Conditions for oscillatory motion 108 3.3. Critical damping factors 112
3.4. Characteristics of the eigenvalues 113 3.4.1. Characteristics of the
natural frequency 114 3.4.2. Characteristics of the decay rate
corresponding to the oscillating mode 118 3.4.3. Characteristics of the
decay rate corresponding to the non-oscillating mode 122 3.5. The frequency
response function 123 3.6. Characteristics of the response amplitude 126
3.6.1. The frequency for the maximum response amplitude 128 3.6.2. The
amplitude of the maximum dynamic response 137 3.7. Simplified analysis of
the frequency response function 141 3.8. Summary 144 Chapter 4.
Non-viscously Damped Multiple-Degree-of-Freedom Systems 147 4.1. Choice of
the kernel function 149 4.2. The exponential model for MDOF non-viscously
damped systems 151 4.3. The state-space formulation 153 4.3.1. Case A: all
coefficient matrices are of full rank 153 4.3.2. Case B: coefficient
matrices are rank deficient 158 4.4. The eigenvalue problem 162 4.4.1. Case
A: all coefficient matrices are of full rank 162 4.4.2. Case B: coefficient
matrices are rank deficient 165 4.5. Forced vibration response 166 4.5.1.
Frequency domain analysis 167 4.5.2. Time-domain analysis 168 4.6.
Numerical examples 169 4.6.1. Example 1: SDOF system with non-viscous
damping 169 4.6.2. Example 2: a rank-deficient system 170 4.7. Direct
time-domain approach 174 4.7.1. Integration in the time domain 174 4.7.2.
Numerical realization 175 4.7.3. Summary of the method 179 4.7.4. Numerical
examples 181 4.8. Summary 184 Chapter 5. Linear Systems with General
Non-Viscous Damping 187 5.1. Existence of classical normal modes 188 5.1.1.
Generalization of proportional damping 189 5.2. Eigenvalues and
eigenvectors 191 5.2.1. Elastic modes 193 5.2.2. Non-viscous modes 197
5.2.3. Approximations for lightly damped systems 198 5.3. Transfer function
199 5.3.1. Eigenvectors of the dynamic stiffness matrix 201 5.3.2.
Calculation of the residues 202 5.3.3. Special cases 204 5.4. Dynamic
response 205 5.4.1. Summary of the method 207 5.5. Numerical examples 208
5.5.1. The system 208 5.5.2. Example 1: exponential damping 210 5.5.3.
Example 2: GHM damping 213 5.6. Eigenrelations of non-viscously damped
systems 215 5.6.1. Nature of the eigensolutions 216 5.6.2. Normalization of
the eigenvectors 217 5.6.3. Orthogonality of the eigenvectors 219 5.6.4.
Relationships between the eigensolutions and damping 223 5.6.5. System
matrices in terms of the eigensolutions 225 5.6.6. Eigenrelations for
viscously damped systems 226 5.6.7. Numerical examples 227 5.7. Rayleigh
quotient for non-viscously damped systems 230 5.8. Summary 234 Chapter 6.
Reduced Computational Methods for Damped Systems 237 6.1. General
non-proportionally damped systems with viscous damping 238 6.1.1. Iterative
approach for the eigensolutions 239 6.1.2. Summary of the algorithm 244
6.1.3. Numerical example 246 6.2. Single-degree-of-freedom non-viscously
damped systems 247 6.2.1. Nonlinear eigenvalue problem for non-viscously
damped systems 250 6.2.2. Complex conjugate eigenvalues 251 6.2.3. Real
eigenvalues 253 6.2.4. Numerical examples 257 6.3.
Multiple-degrees-of-freedom non-viscously damped systems 259 6.3.1. Complex
conjugate eigenvalues 260 6.3.2. Real eigenvalues 262 6.3.3. Numerical
example 263 6.4. Reduced second-order approach for non-viscously damped
systems 264 6.4.1. Proportionally damped systems 266 6.4.2. The general
case 271 6.4.3. Numerical examples 274 6.5. Summary 277 Appendix 281
Bibliography 299 Author index 329 Index 335
Analysis Methods 1 1.1. Models of damping 3 1.1.1. Single-degree-of-freedom
systems 4 1.1.2. Continuous systems 8 1.1.3. Multiple-degrees-of-freedom
systems 10 1.1.4. Other studies 11 1.2. Modal analysis of viscously damped
systems 13 1.2.1. The state-space method 14 1.2.2. Methods in the
configuration space 15 1.3. Analysis of non-viscously damped systems 21
1.3.1. State-space-based methods 22 1.3.2. Time-domain-based methods 23
1.3.3. Approximate methods in the configuration space 23 1.4.
Identification of viscous damping 24 1.4.1. Single-degree-of-freedom
systems 24 1.4.2. Multiple-degrees-of-freedom systems 25 1.5.
Identification of non-viscous damping 28 1.6. Parametric sensitivity of
eigenvalues and eigenvectors 29 1.6.1. Undamped systems 29 1.6.2. Damped
systems 30 1.7. Motivation behind this book 32 1.8. Scope of the book 33
Chapter 2. Dynamics of Undamped and Viscously Damped Systems 41 2.1.
Single-degree-of-freedom undamped systems 41 2.1.1. Natural frequency 42
2.1.2. Dynamic response 43 2.2. Single-degree-of-freedom viscously damped
systems 45 2.2.1. Natural frequency 46 2.2.2. Dynamic response 47 2.3.
Multiple-degree-of-freedom undamped systems 52 2.3.1. Modal analysis 53
2.3.2. Dynamic response 55 2.4. Proportionally damped systems 58 2.4.1.
Condition for proportional damping 60 2.4.2. Generalized proportional
damping 61 2.4.3. Dynamic response 65 2.5. Non-proportionally damped
systems 80 2.5.1. Free vibration and complex modes 81 2.5.2. Dynamic
response 87 2.6. Rayleigh quotient for damped systems 93 2.6.1. Rayleigh
quotients for discrete systems 94 2.6.2. Proportional damping 96 2.6.3.
Non-proportional damping 97 2.6.4. Application of Rayleigh quotients 100
2.6.5. Synopses 101 2.7. Summary 101 Chapter 3. Non-Viscously Damped
Single-Degree-of-Freedom Systems 103 3.1. The equation of motion 104 3.2.
Conditions for oscillatory motion 108 3.3. Critical damping factors 112
3.4. Characteristics of the eigenvalues 113 3.4.1. Characteristics of the
natural frequency 114 3.4.2. Characteristics of the decay rate
corresponding to the oscillating mode 118 3.4.3. Characteristics of the
decay rate corresponding to the non-oscillating mode 122 3.5. The frequency
response function 123 3.6. Characteristics of the response amplitude 126
3.6.1. The frequency for the maximum response amplitude 128 3.6.2. The
amplitude of the maximum dynamic response 137 3.7. Simplified analysis of
the frequency response function 141 3.8. Summary 144 Chapter 4.
Non-viscously Damped Multiple-Degree-of-Freedom Systems 147 4.1. Choice of
the kernel function 149 4.2. The exponential model for MDOF non-viscously
damped systems 151 4.3. The state-space formulation 153 4.3.1. Case A: all
coefficient matrices are of full rank 153 4.3.2. Case B: coefficient
matrices are rank deficient 158 4.4. The eigenvalue problem 162 4.4.1. Case
A: all coefficient matrices are of full rank 162 4.4.2. Case B: coefficient
matrices are rank deficient 165 4.5. Forced vibration response 166 4.5.1.
Frequency domain analysis 167 4.5.2. Time-domain analysis 168 4.6.
Numerical examples 169 4.6.1. Example 1: SDOF system with non-viscous
damping 169 4.6.2. Example 2: a rank-deficient system 170 4.7. Direct
time-domain approach 174 4.7.1. Integration in the time domain 174 4.7.2.
Numerical realization 175 4.7.3. Summary of the method 179 4.7.4. Numerical
examples 181 4.8. Summary 184 Chapter 5. Linear Systems with General
Non-Viscous Damping 187 5.1. Existence of classical normal modes 188 5.1.1.
Generalization of proportional damping 189 5.2. Eigenvalues and
eigenvectors 191 5.2.1. Elastic modes 193 5.2.2. Non-viscous modes 197
5.2.3. Approximations for lightly damped systems 198 5.3. Transfer function
199 5.3.1. Eigenvectors of the dynamic stiffness matrix 201 5.3.2.
Calculation of the residues 202 5.3.3. Special cases 204 5.4. Dynamic
response 205 5.4.1. Summary of the method 207 5.5. Numerical examples 208
5.5.1. The system 208 5.5.2. Example 1: exponential damping 210 5.5.3.
Example 2: GHM damping 213 5.6. Eigenrelations of non-viscously damped
systems 215 5.6.1. Nature of the eigensolutions 216 5.6.2. Normalization of
the eigenvectors 217 5.6.3. Orthogonality of the eigenvectors 219 5.6.4.
Relationships between the eigensolutions and damping 223 5.6.5. System
matrices in terms of the eigensolutions 225 5.6.6. Eigenrelations for
viscously damped systems 226 5.6.7. Numerical examples 227 5.7. Rayleigh
quotient for non-viscously damped systems 230 5.8. Summary 234 Chapter 6.
Reduced Computational Methods for Damped Systems 237 6.1. General
non-proportionally damped systems with viscous damping 238 6.1.1. Iterative
approach for the eigensolutions 239 6.1.2. Summary of the algorithm 244
6.1.3. Numerical example 246 6.2. Single-degree-of-freedom non-viscously
damped systems 247 6.2.1. Nonlinear eigenvalue problem for non-viscously
damped systems 250 6.2.2. Complex conjugate eigenvalues 251 6.2.3. Real
eigenvalues 253 6.2.4. Numerical examples 257 6.3.
Multiple-degrees-of-freedom non-viscously damped systems 259 6.3.1. Complex
conjugate eigenvalues 260 6.3.2. Real eigenvalues 262 6.3.3. Numerical
example 263 6.4. Reduced second-order approach for non-viscously damped
systems 264 6.4.1. Proportionally damped systems 266 6.4.2. The general
case 271 6.4.3. Numerical examples 274 6.5. Summary 277 Appendix 281
Bibliography 299 Author index 329 Index 335
Preface xi Nomenclature xv Chapter 1. Introduction to Damping Models and
Analysis Methods 1 1.1. Models of damping 3 1.1.1. Single-degree-of-freedom
systems 4 1.1.2. Continuous systems 8 1.1.3. Multiple-degrees-of-freedom
systems 10 1.1.4. Other studies 11 1.2. Modal analysis of viscously damped
systems 13 1.2.1. The state-space method 14 1.2.2. Methods in the
configuration space 15 1.3. Analysis of non-viscously damped systems 21
1.3.1. State-space-based methods 22 1.3.2. Time-domain-based methods 23
1.3.3. Approximate methods in the configuration space 23 1.4.
Identification of viscous damping 24 1.4.1. Single-degree-of-freedom
systems 24 1.4.2. Multiple-degrees-of-freedom systems 25 1.5.
Identification of non-viscous damping 28 1.6. Parametric sensitivity of
eigenvalues and eigenvectors 29 1.6.1. Undamped systems 29 1.6.2. Damped
systems 30 1.7. Motivation behind this book 32 1.8. Scope of the book 33
Chapter 2. Dynamics of Undamped and Viscously Damped Systems 41 2.1.
Single-degree-of-freedom undamped systems 41 2.1.1. Natural frequency 42
2.1.2. Dynamic response 43 2.2. Single-degree-of-freedom viscously damped
systems 45 2.2.1. Natural frequency 46 2.2.2. Dynamic response 47 2.3.
Multiple-degree-of-freedom undamped systems 52 2.3.1. Modal analysis 53
2.3.2. Dynamic response 55 2.4. Proportionally damped systems 58 2.4.1.
Condition for proportional damping 60 2.4.2. Generalized proportional
damping 61 2.4.3. Dynamic response 65 2.5. Non-proportionally damped
systems 80 2.5.1. Free vibration and complex modes 81 2.5.2. Dynamic
response 87 2.6. Rayleigh quotient for damped systems 93 2.6.1. Rayleigh
quotients for discrete systems 94 2.6.2. Proportional damping 96 2.6.3.
Non-proportional damping 97 2.6.4. Application of Rayleigh quotients 100
2.6.5. Synopses 101 2.7. Summary 101 Chapter 3. Non-Viscously Damped
Single-Degree-of-Freedom Systems 103 3.1. The equation of motion 104 3.2.
Conditions for oscillatory motion 108 3.3. Critical damping factors 112
3.4. Characteristics of the eigenvalues 113 3.4.1. Characteristics of the
natural frequency 114 3.4.2. Characteristics of the decay rate
corresponding to the oscillating mode 118 3.4.3. Characteristics of the
decay rate corresponding to the non-oscillating mode 122 3.5. The frequency
response function 123 3.6. Characteristics of the response amplitude 126
3.6.1. The frequency for the maximum response amplitude 128 3.6.2. The
amplitude of the maximum dynamic response 137 3.7. Simplified analysis of
the frequency response function 141 3.8. Summary 144 Chapter 4.
Non-viscously Damped Multiple-Degree-of-Freedom Systems 147 4.1. Choice of
the kernel function 149 4.2. The exponential model for MDOF non-viscously
damped systems 151 4.3. The state-space formulation 153 4.3.1. Case A: all
coefficient matrices are of full rank 153 4.3.2. Case B: coefficient
matrices are rank deficient 158 4.4. The eigenvalue problem 162 4.4.1. Case
A: all coefficient matrices are of full rank 162 4.4.2. Case B: coefficient
matrices are rank deficient 165 4.5. Forced vibration response 166 4.5.1.
Frequency domain analysis 167 4.5.2. Time-domain analysis 168 4.6.
Numerical examples 169 4.6.1. Example 1: SDOF system with non-viscous
damping 169 4.6.2. Example 2: a rank-deficient system 170 4.7. Direct
time-domain approach 174 4.7.1. Integration in the time domain 174 4.7.2.
Numerical realization 175 4.7.3. Summary of the method 179 4.7.4. Numerical
examples 181 4.8. Summary 184 Chapter 5. Linear Systems with General
Non-Viscous Damping 187 5.1. Existence of classical normal modes 188 5.1.1.
Generalization of proportional damping 189 5.2. Eigenvalues and
eigenvectors 191 5.2.1. Elastic modes 193 5.2.2. Non-viscous modes 197
5.2.3. Approximations for lightly damped systems 198 5.3. Transfer function
199 5.3.1. Eigenvectors of the dynamic stiffness matrix 201 5.3.2.
Calculation of the residues 202 5.3.3. Special cases 204 5.4. Dynamic
response 205 5.4.1. Summary of the method 207 5.5. Numerical examples 208
5.5.1. The system 208 5.5.2. Example 1: exponential damping 210 5.5.3.
Example 2: GHM damping 213 5.6. Eigenrelations of non-viscously damped
systems 215 5.6.1. Nature of the eigensolutions 216 5.6.2. Normalization of
the eigenvectors 217 5.6.3. Orthogonality of the eigenvectors 219 5.6.4.
Relationships between the eigensolutions and damping 223 5.6.5. System
matrices in terms of the eigensolutions 225 5.6.6. Eigenrelations for
viscously damped systems 226 5.6.7. Numerical examples 227 5.7. Rayleigh
quotient for non-viscously damped systems 230 5.8. Summary 234 Chapter 6.
Reduced Computational Methods for Damped Systems 237 6.1. General
non-proportionally damped systems with viscous damping 238 6.1.1. Iterative
approach for the eigensolutions 239 6.1.2. Summary of the algorithm 244
6.1.3. Numerical example 246 6.2. Single-degree-of-freedom non-viscously
damped systems 247 6.2.1. Nonlinear eigenvalue problem for non-viscously
damped systems 250 6.2.2. Complex conjugate eigenvalues 251 6.2.3. Real
eigenvalues 253 6.2.4. Numerical examples 257 6.3.
Multiple-degrees-of-freedom non-viscously damped systems 259 6.3.1. Complex
conjugate eigenvalues 260 6.3.2. Real eigenvalues 262 6.3.3. Numerical
example 263 6.4. Reduced second-order approach for non-viscously damped
systems 264 6.4.1. Proportionally damped systems 266 6.4.2. The general
case 271 6.4.3. Numerical examples 274 6.5. Summary 277 Appendix 281
Bibliography 299 Author index 329 Index 335
Analysis Methods 1 1.1. Models of damping 3 1.1.1. Single-degree-of-freedom
systems 4 1.1.2. Continuous systems 8 1.1.3. Multiple-degrees-of-freedom
systems 10 1.1.4. Other studies 11 1.2. Modal analysis of viscously damped
systems 13 1.2.1. The state-space method 14 1.2.2. Methods in the
configuration space 15 1.3. Analysis of non-viscously damped systems 21
1.3.1. State-space-based methods 22 1.3.2. Time-domain-based methods 23
1.3.3. Approximate methods in the configuration space 23 1.4.
Identification of viscous damping 24 1.4.1. Single-degree-of-freedom
systems 24 1.4.2. Multiple-degrees-of-freedom systems 25 1.5.
Identification of non-viscous damping 28 1.6. Parametric sensitivity of
eigenvalues and eigenvectors 29 1.6.1. Undamped systems 29 1.6.2. Damped
systems 30 1.7. Motivation behind this book 32 1.8. Scope of the book 33
Chapter 2. Dynamics of Undamped and Viscously Damped Systems 41 2.1.
Single-degree-of-freedom undamped systems 41 2.1.1. Natural frequency 42
2.1.2. Dynamic response 43 2.2. Single-degree-of-freedom viscously damped
systems 45 2.2.1. Natural frequency 46 2.2.2. Dynamic response 47 2.3.
Multiple-degree-of-freedom undamped systems 52 2.3.1. Modal analysis 53
2.3.2. Dynamic response 55 2.4. Proportionally damped systems 58 2.4.1.
Condition for proportional damping 60 2.4.2. Generalized proportional
damping 61 2.4.3. Dynamic response 65 2.5. Non-proportionally damped
systems 80 2.5.1. Free vibration and complex modes 81 2.5.2. Dynamic
response 87 2.6. Rayleigh quotient for damped systems 93 2.6.1. Rayleigh
quotients for discrete systems 94 2.6.2. Proportional damping 96 2.6.3.
Non-proportional damping 97 2.6.4. Application of Rayleigh quotients 100
2.6.5. Synopses 101 2.7. Summary 101 Chapter 3. Non-Viscously Damped
Single-Degree-of-Freedom Systems 103 3.1. The equation of motion 104 3.2.
Conditions for oscillatory motion 108 3.3. Critical damping factors 112
3.4. Characteristics of the eigenvalues 113 3.4.1. Characteristics of the
natural frequency 114 3.4.2. Characteristics of the decay rate
corresponding to the oscillating mode 118 3.4.3. Characteristics of the
decay rate corresponding to the non-oscillating mode 122 3.5. The frequency
response function 123 3.6. Characteristics of the response amplitude 126
3.6.1. The frequency for the maximum response amplitude 128 3.6.2. The
amplitude of the maximum dynamic response 137 3.7. Simplified analysis of
the frequency response function 141 3.8. Summary 144 Chapter 4.
Non-viscously Damped Multiple-Degree-of-Freedom Systems 147 4.1. Choice of
the kernel function 149 4.2. The exponential model for MDOF non-viscously
damped systems 151 4.3. The state-space formulation 153 4.3.1. Case A: all
coefficient matrices are of full rank 153 4.3.2. Case B: coefficient
matrices are rank deficient 158 4.4. The eigenvalue problem 162 4.4.1. Case
A: all coefficient matrices are of full rank 162 4.4.2. Case B: coefficient
matrices are rank deficient 165 4.5. Forced vibration response 166 4.5.1.
Frequency domain analysis 167 4.5.2. Time-domain analysis 168 4.6.
Numerical examples 169 4.6.1. Example 1: SDOF system with non-viscous
damping 169 4.6.2. Example 2: a rank-deficient system 170 4.7. Direct
time-domain approach 174 4.7.1. Integration in the time domain 174 4.7.2.
Numerical realization 175 4.7.3. Summary of the method 179 4.7.4. Numerical
examples 181 4.8. Summary 184 Chapter 5. Linear Systems with General
Non-Viscous Damping 187 5.1. Existence of classical normal modes 188 5.1.1.
Generalization of proportional damping 189 5.2. Eigenvalues and
eigenvectors 191 5.2.1. Elastic modes 193 5.2.2. Non-viscous modes 197
5.2.3. Approximations for lightly damped systems 198 5.3. Transfer function
199 5.3.1. Eigenvectors of the dynamic stiffness matrix 201 5.3.2.
Calculation of the residues 202 5.3.3. Special cases 204 5.4. Dynamic
response 205 5.4.1. Summary of the method 207 5.5. Numerical examples 208
5.5.1. The system 208 5.5.2. Example 1: exponential damping 210 5.5.3.
Example 2: GHM damping 213 5.6. Eigenrelations of non-viscously damped
systems 215 5.6.1. Nature of the eigensolutions 216 5.6.2. Normalization of
the eigenvectors 217 5.6.3. Orthogonality of the eigenvectors 219 5.6.4.
Relationships between the eigensolutions and damping 223 5.6.5. System
matrices in terms of the eigensolutions 225 5.6.6. Eigenrelations for
viscously damped systems 226 5.6.7. Numerical examples 227 5.7. Rayleigh
quotient for non-viscously damped systems 230 5.8. Summary 234 Chapter 6.
Reduced Computational Methods for Damped Systems 237 6.1. General
non-proportionally damped systems with viscous damping 238 6.1.1. Iterative
approach for the eigensolutions 239 6.1.2. Summary of the algorithm 244
6.1.3. Numerical example 246 6.2. Single-degree-of-freedom non-viscously
damped systems 247 6.2.1. Nonlinear eigenvalue problem for non-viscously
damped systems 250 6.2.2. Complex conjugate eigenvalues 251 6.2.3. Real
eigenvalues 253 6.2.4. Numerical examples 257 6.3.
Multiple-degrees-of-freedom non-viscously damped systems 259 6.3.1. Complex
conjugate eigenvalues 260 6.3.2. Real eigenvalues 262 6.3.3. Numerical
example 263 6.4. Reduced second-order approach for non-viscously damped
systems 264 6.4.1. Proportionally damped systems 266 6.4.2. The general
case 271 6.4.3. Numerical examples 274 6.5. Summary 277 Appendix 281
Bibliography 299 Author index 329 Index 335