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E-raamat: Nonlinear Vibrations and Stability of Shells and Plates

(Università degli Studi, Parma)
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  • Ilmumisaeg: 14-Jan-2008
  • Kirjastus: Cambridge University Press
  • Keel: eng
  • ISBN-13: 9780511373206
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Nonlinear Vibrations and Stability of Shells and PlatesSuurem pilt
  • Formaat: PDF+DRM
  • Ilmumisaeg: 14-Jan-2008
  • Kirjastus: Cambridge University Press
  • Keel: eng
  • ISBN-13: 9780511373206
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In this impressively thorough work, Amabili (U. of Parma, Italy) utilizes nonlinear shell and plate theory to analyze shell stability in the presence of vibration, beginning the volume with an overview of the nonlinear theory of rectangular and circular plates and circular cylindrical and spherical shells. Nonclassical nonlinear theories are described in the second chapter, with attention to shear deformation and rotary inertia, and an overview of thermal stresses. Building on these foundations, Amabili turns to detailed discussion of nonlinear dynamics, stability, bifurcation analysis, and computational tools, with particular emphasis on the Galerkin method and Lagrange equations of motion and their applications to a variety of applications concerning discretizing plates and shells. Discussion of numerical techniques and various classical nonlinear shell theories follow, as these are applied for large amplitude vibrations of various shells and panels. Other chapters discuss stability under static and periodic loads, the methods for modeling aerodynamic loads, and problems arising from fluid-structure interaction, among other topics. Annotation ©2008 Book News, Inc., Portland, OR (booknews.com)

Covers the theoretical and experimental aspects of nonlinear vibrations and stability of shells and plates.

This unique book explores both theoretical and experimental aspects of nonlinear vibrations and stability of shells and plates. It is ideal for researchers, professionals, students, and instructors. Expert researchers will find the most recent progresses in nonlinear vibrations and stability of shells and plates, including advanced problems of shells with fluid-structure interaction. Professionals will find many practical concepts, diagrams, and numerical results, useful for the design of shells and plates made of traditional and advanced materials. They will be able to understand complex phenomena such as dynamic instability, bifurcations, and chaos, without needing an extensive mathematical background. Graduate students will find (i) a complete text on nonlinear mechanics of shells and plates, collecting almost all the available theories in a simple form, (ii) an introduction to nonlinear dynamics, and (iii) the state of art on the nonlinear vibrations and stability of shells and plates, including fluid-structure interaction problems.

Arvustused

' this monograph by Marco Amabili is not just an up-date; it is much more Throughout, plentiful and clear illustrations help the reader and enliven the text, as do comparisons with experiment. This book is a gem: for theoreticians because it injects interesting applications which have animated recent work in this area; for engineers and designers because it provides a thorough yet accessible treatment of the mathematical/physical aspects; for students because it treats the subject in a manner that can be studied easily, say in a course or be self-taught. For anyone working with plates and shells, perusal of the book for even an hour or so guarantees that he/she will want to have it permanently on his/her bookshelf. This indeed, is an excellent book!' Journal of Fluids and Structures 'This is an excellent and practical book containing current and advanced knowledge on nonlinear vibrations and stability of plates and shells this book is a very valuable contribution to nonlinear mechanics and I warmly recommend it to graduate students and university professors as well as to researchers and industrial engineers interested in nonlinear vibrations and stability problems of shells and plates. I expect that this book will serve as an inspiration for future studies of nonlinear static and dynamic phenomena related to plates and shells.' Mathematical Reviews

Muu info

Covers the theoretical and experimental aspects of nonlinear vibrations and stability of shells and plates.
Preface xv
Introduction 1(5)
Nonlinear Theories of Elasticity of Plates and Shells
6(46)
Introduction
6(2)
Literature Review
6(2)
Large Deflection of Rectangular Plates
8(16)
Green's and Almansi Strain Tensors for Finite Deformation
8(3)
Strains for Finite Deflection of Rectangular Plates: Von Karman Theory
11(3)
Geometric Imperfections
14(1)
Eulerian, Lagrangian and Kirchhoff Stress Tensors
14(4)
Equations of Motion in Lagrangian Description
18(1)
Elastic Strain Energy
18(1)
Von Karman Equation of Motion
19(4)
Von Karman Equation of Motion Including Geometric Imperfections
23(1)
Large Deflection of Circular Cylindrical Shells
24(19)
Euclidean Metric Tensor
24(1)
Example: Cylindrical Coordinates
25(1)
Example: Spherical Coordinates
25(1)
Green's Strain Tensor in a Generic Coordinate System
26(1)
Green's Strain Tensor in Cylindrical Coordinates
27(2)
Strains for Finite Deflection of Circular Cylindrical Shells: Donnell's Nonlinear Theory
29(3)
Geometric Imperfections in Donnell's Nonlinear Shell Theory
32(1)
The Flugge-Lur'e-Byrne Nonlinear Shell Theory
32(2)
The Novozhilov Nonlinear Shell Theory
34(2)
The Sanders-Koiter Nonlinear Shell Theory
36(1)
Elastic Strain Energy
36(1)
Donnell's Nonlinear Shallow-Shell Theory
37(6)
Donnell's Nonlinear Shallow-Shell Theory Including Geometric Imperfections
43(1)
Large Deflection of Circular Plates
43(3)
Green's Strain Tensor for Circular Plates
43(1)
Strains for Finite Deflection of Circular Plates: Von Karman Theory
44(1)
Von Karman Equation of Motion for Circular Plates
45(1)
Large Deflection of Spherical Caps
46(6)
Green's Strain Tensor in Spherical Coordinates
47(1)
Strains for Finite Deflection of Spherical Caps: Donnell's Nonlinear Theory
47(1)
Donnell's Equation of Motion for Shallow Spherical Caps
48(1)
The Flugge-Lur'e-Byrne Nonlinear Shell Theory
49(1)
References
50(2)
Nonlinear Theories of Doubly Curved Shells for Conventional and Advanced Materials
52(38)
Introduction
52(1)
Doubly Curved Shells of Constant Curvature
52(4)
Elastic Strain Energy
55(1)
General Theory of Doubly Curved Shells
56(14)
Theory of Surfaces
56(6)
Green's Strain Tensor for a Shell in Curvilinear Coordinates
62(3)
Strain-Displacement Relationships for Novozhilov's Nonlinear Shell Theory
65(2)
Strain-Displacement Relationships for an Improved Version of the Novozhilov Shell Theory
67(1)
Simplified Strain-Displacement Relationships
68(1)
Elastic Strain Energy
69(1)
Kinetic Energy
69(1)
Composite and Functionally Graded Materials
70(8)
Stress-Strain Relations for a Thin Lamina
71(2)
Stress-Strain Relations for a Layer within a Laminate
73(1)
Elastic Strain Energy for Laminated Shells
73(1)
Elastic Strain Energy for Orthotropic and Cross-Ply Shells
74(1)
Sandwich Plates and Shells
75(1)
Functionally Graded Materials and Thermal Effects
76(2)
Nonlinear Shear Deformation Theories for Moderately Thick, Laminated and Functionally Graded, Doubly Curved Shells
78(10)
Nonlinear First-Order Shear Deformation Theory for Doubly Curved Shells of Constant Curvature
78(2)
Elastic Strain Energy for Laminated Shells
80(1)
Kinetic Energy with Rotary Inertia for Laminated Shells
81(1)
Nonlinear Higher-Order Shear Deformation Theory for Laminated, Doubly Curved Shells
81(4)
Elastic Strain and Kinetic Energies, Including Rotary Inertia, for Laminated Shells According with Higher-Order Shear Deformation Theory
85(1)
Elastic Strain Energy for Heated, Functionally Graded Shells
86(1)
Kinetic Energy with Rotary Inertia for Functionally Graded Shells
87(1)
Thermal Effects on Plates and Shells
88(2)
References
89(1)
Introduction to Nonlinear Dynamics
90(30)
Introduction
90(1)
Periodic Nonlinear Vibrations: Softening and Hardening Systems
90(3)
Numerical Integration of the Equations of Motion
93(1)
Local Geometric Theory
94(2)
Bifurcations of Equilibrium
96(5)
Saddle-Node Bifurcation
97(1)
Pitchfork Bifurcation
97(2)
Transcritical Bifurcation
99(1)
Hopf Bifurcation
99(2)
Poincare Maps
101(2)
Bifurcations of Periodic Solutions
103(4)
Floquet Theory
103(3)
Period-Doubling Bifurcation
106(1)
Neimark-Sacker Bifurcation
107(1)
Numerical Continuation Methods
107(5)
Arclength Continuation of Fixed Points
107(2)
Pseudo-Arclength Continuation of Fixed Points
109(1)
Pseudo-Arclength Continuation of Periodic Solutions
110(2)
Nonlinear and Internal Resonances
112(1)
Chaotic Vibrations
113(1)
Lyapunov Exponents
114(3)
Maximum Lyapunov Exponent
114(1)
Lyapunov Spectrum
115(2)
Lyapunov Dimension
117(1)
Discretization of the System: Galerkin Method and Lagrange Equations
118(2)
References
119(1)
Vibrations of Rectangular Plates
120(21)
Introduction
120(1)
Literature Review
120(1)
Linear Vibrations with Classical Plate Theory
121(2)
Theoretical and Experimental Results
122(1)
Nonlinear Vibrations with Von Karman Plate Theory
123(8)
Boundary Conditions, Kinetic Energy, External Loads and Mode Expansion
124(3)
Satisfaction of Boundary Conditions
127(1)
Case (a)
127(1)
Case (b)
128(1)
Case (c)
128(1)
Case (d)
129(1)
Lagrange Equations of Motion
130(1)
Numerical Results for Nonlinear Vibrations
131(1)
Comparison of Numerical and Experimental Results
132(5)
Inertial Coupling in the Equations of Motion
137(2)
Effect of Added Masses
139(2)
References
139(2)
Vibrations of Empty and Fluid-Filled Circular Cylindrical Shells
141(52)
Introduction
141(4)
Literature Review
142(3)
Linear Vibrations of Simply Supported, Circular Cylindrical Shells
145(5)
Donnell's Theory of Shells
145(3)
Flugge-Lur'e-Byrne Theory of Shells
148(2)
Circular Cylindrical Shells Containing or Immersed in Still Fluid
150(4)
Rayleigh-Ritz Method for Linear Vibrations
154(2)
Nonlinear Vibrations of Empty and Fluid-Filled, Simply Supported, Circular Cylindrical Shells with Donnell's Nonlinear Shallow-Shell Theory
156(9)
Fluid-Structure Interaction
159(1)
Stress Function and Galerkin Method
160(4)
Traveling-Wave Response
164(1)
Proof of the Continuity of the Circumferential Displacement
164(1)
Numerical Results for Nonlinear Vibrations of Simply Supported Shells
165(6)
Empty Shell
165(6)
Water-Filled Shell
171(1)
Effect of Geometric Imperfections
171(5)
Empty Shell
172(2)
Water-Filled Shell
174(2)
Comparison of Numerical and Experimental Results
176(11)
Empty Shell
180(2)
Water-Filled Shell
182(5)
Chaotic Vibrations of a Water-Filled Shell
187(6)
References
191(2)
Reduced-Order Models: Proper Orthogonal Decomposition and Nonlinear Normal Modes
193(19)
Introduction
193(1)
Reference Solution
194(1)
Proper Orthogonal Decomposition (POD) Method
194(3)
Asymptotic Nonlinear Normal Modes (NNMs) Method
197(2)
Discussion on POD and NNMs
199(2)
Numerical Results
201(11)
Results for POD and NNMs Methods
202(5)
Geometrical Interpretation
207(2)
References
209(3)
Comparison of Different Shell Theories for Nonlinear Vibrations and Stability of Circular Cylindrical Shells
212(22)
Introduction
212(1)
Energy Approach
212(7)
Additional Terms to Satisfy the Boundary Conditions
215(1)
Fluid-Structure Interaction
216(1)
Lagrange Equations of Motion
217(2)
Numerical Results for Nonlinear Vibrations
219(11)
Empty Shell
219(4)
Comparison with Results Available in the Literature
223(1)
Water-Filled Shell
224(4)
Water-Filled Shell with Imperfections
228(2)
Discussion
230(1)
Effect of Axial Load and Pressure on the Nonlinear Stability and Response of the Empty Shell
230(4)
References
233(1)
Effect of Boundary Conditions on Large-Amplitude Vibrations of Circular Cylindrical Shells
234(8)
Introduction
234(1)
Literature Review
234(1)
Theory
235(2)
Numerical Results
237(5)
Comparison with Numerical and Experimental Results Available for Empty Shells
239(1)
References
240(2)
Vibrations of Circular Cylindrical Panels with Different Boundary Conditions
242(30)
Introduction
242(2)
Literature Review
242(2)
Linear Vibrations
244(1)
Nonlinear Vibrations
245(7)
Mode Expansion
247(1)
Satisfaction of Boundary Conditions
248(1)
Model A
248(2)
Model B
250(1)
Model C
251(1)
Solution
251(1)
Numerical Results
252(10)
Nonperiodic Response
256(6)
Comparison of Experimental and Numerical Results
262(10)
Experimental Results
262(3)
Comparison of Numerical and Experimental Results
265(5)
References
270(2)
Nonlinear Vibrations and Stability of Doubly Curved Shallow-Shells: Isotropic and Laminated Materials
272(26)
Introduction
272(2)
Literature Review
272(2)
Theoretical Approach for Simply Supported, Isotropic Shells
274(5)
Boundary Conditions
275(2)
Lagrange Equations of Motion
277(2)
Numerical Results for Simply Supported, Isotropic Shells
279(7)
Case with Rx/Ry = 1, Spherical Shell
279(4)
Case with Rx/Ry = -1, Hyperbolic Paraboloidal Shell
283(2)
Effect of Different Curvature
285(1)
Buckling of Simply Supported Shells under Static Load
286(1)
Theoretical Approach for Clamped Laminated Shells
286(3)
Numerical Results for Vibrations of Clamped Laminated Shells
289(2)
Buckling of the Space Shuttle Liquid-Oxygen Tank
291(7)
References
296(2)
Meshless Discretizatization of Plates and Shells of Complex Shape by Using the R-Functions
298(13)
Introduction
298(1)
Literature Review
298(1)
The R-Functions Method
299(7)
Boundary Value Problems with Homogeneous Dirichlet Boundary Conditions
299(2)
Example: Shell with Complex Shape
301(2)
Boundary Value Problems with Inhomogeneous Dirichlet Boundary Conditions
303(1)
Boundary Value Problems with Neumann and Mixed Boundary Conditions
303(1)
Admissible Functions for Shells and Plates with Different Boundary Conditions
304(2)
Numerical Results for a Shallow-Shell with Complex Shape
306(2)
Experimental Results and Comparison
308(3)
References
309(2)
Vibrations of Circular Plates and Rotating Disks
311(14)
Introduction
311(2)
Literature Review
311(2)
Linear Vibrations of Circular and Annular Plates
313(1)
Nonlinear Vibrations of Circular Plates
314(3)
Numerical Results
317(1)
Nonlinear Vibrations of Disks Spinning Near a Critical Speed
317(8)
Numerical Results
320(3)
References
323(2)
Nonlinear Stability of Circular Cylindrical Shells under Static and Dynamic Axial Loads
325(13)
Introduction
325(3)
Literature Review
325(3)
Theoretical Approach
328(1)
Numerical Results
329(9)
Static Bifurcations
329(3)
Dynamic Loads
332(4)
References
336(2)
Nonlinear Stability and Vibration of Circular Shells Conveying Fluid
338(17)
Introduction
338(1)
Literature Review
338(1)
Fluid-Structure Interaction for Flowing Fluid
339(7)
Fluid Model
339(1)
Shell Expansion
340(1)
Fluid-Structure Interaction
341(1)
Nonlinear Equations of Motion with Galerkin Method
342(1)
Energy Associated with Flow and Lagrange Equations
342(3)
Solution of the Associated Eigenvalue Problem
345(1)
Numerical Results for Stability
346(2)
Comparison of Numerical and Experimental Stability Results
348(2)
Numerical Results for Nonlinear Forced Vibrations
350(5)
Periodic Response
350(1)
Unsteady and Chaotic Motion
351(2)
References
353(2)
Nonlinear Supersonic Flutter of Circular Cylindrical Shells with Imperfections
355(18)
Introduction
355(3)
Literature Review
356(2)
Theoretical Approach
358(3)
Linear and Third-Order Piston Theory
358(1)
Structural Model
359(2)
Numerical Results
361(12)
Linear Results
361(2)
Nonlinear Results without Geometric Imperfections
363(4)
Nonlinear Results with Geometric Imperfections
367(4)
References
371(2)
Index 373


Marco Amabili is a professor and Director of the Laboratories in the Department of Industrial Engineering at the University of Parma. His main research is in vibrations of thin-walled structures and fluid-structure interaction. Professor Amabili is the winner of numerous awards in Italy and around the world including the 'Bourse québécoise d'excellence' from the Ministry of Education of Québec in 1999. He is Associate Editor of the Journal of Fluids and Structures, a member of the editorial board of Journal of Sound and Vibration, and editor of a special issue of the Journal of Computers and Structures. He is a co-organizer of 14 conferences or symposia, the Secretary of the ASME Technical Committee on Dynamics and Control of Structures and Systems (AMD Division), and a member of the ASME Technical Committees Vibration and Sound (DE Division) and Fluid-Structure Interaction (PVP Division). Professor Amabili is the author of more than 180 papers on vibrations and dynamics.
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