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E-raamat: Handbook On Timoshenko-ehrenfest Beam And Uflyand- Mindlin Plate Theories

(Florida Atlantic Univ, Usa)
  • Formaat: 800 pages
  • Ilmumisaeg: 29-Oct-2019
  • Kirjastus: World Scientific Publishing Co Pte Ltd
  • Keel: eng
  • ISBN-13: 9789813236530
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Handbook On Timoshenko-ehrenfest Beam And Uflyand- Mindlin Plate TheoriesSuurem pilt
  • Formaat: 800 pages
  • Ilmumisaeg: 29-Oct-2019
  • Kirjastus: World Scientific Publishing Co Pte Ltd
  • Keel: eng
  • ISBN-13: 9789813236530
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The refined theory of beams, which takes into account both rotary inertia and shear deformation, was developed jointly by Timoshenko and Ehrenfest in the years 1911-1912. In over a century since the theory was first articulated, tens of thousands of studies have been performed utilizing this theory in various contexts. Likewise, the generalization of the Timoshenko-Ehrenfest beam theory to plates was given by Uflyand and Mindlin in the years 1948-1951.The importance of these theories stems from the fact that beams and plates are indispensable, and are often occurring elements of every civil, mechanical, ocean, and aerospace structure.Despite a long history and many papers, there is not a single book that summarizes these two celebrated theories. This book is dedicated to closing the existing gap within the literature. It also deals extensively with several controversial topics, namely those of priority, the so-called 'second spectrum' shear coefficient, and other issues, and shows vividly that the above beam and plate theories are unnecessarily overcomplicated.In the spirit of Einstein's dictum, 'Everything should be made as simple as possible but not simpler,' this book works to clarify both the Timoshenko-Ehrenfest beam and Uflyand-Mindlin plate theories, and seeks to articulate everything in the simplest possible language, including their numerous applications.This book is addressed to graduate students, practicing engineers, researchers in their early career, and active scientists who may want to have a different look at the above theories, as well as readers at all levels of their academic or scientific career who want to know the history of the subject. The Timoshenko-Ehrenfest Beam and Uflyand-Mindlin Plate Theories are the key reference works in the study of stocky beams and thick plates that should be given their due and remain important for generations to come, since classical Bernoulli-Euler beam and Kirchhoff-Love theories are applicable for slender beams and thin plates, respectively.Related Link(s)
Preface v
About Professor Isaac Elishakoff xv
Acknowledgments xvii
Chapter 1 Introduction
1(106)
1.1 Comments on the Bernoulli-Euler Beam Theory
1(4)
1.2 Derivation of the Beam Theory Including Rotary Inertia Effect
5(13)
1.3 Incorporation of the Effect of Shear Deformation in Addition to That of Rotary Inertia
18(4)
1.4 Topic of Priority: The So-Called Timoshenko Beam Theory Developed by S.P. Timoshenko and P. Ehrenfest
22(33)
1.5 Alternative Accounting of the Rotary Inertia and Shear Effects
55(6)
1.6 Controversy Associated with Two Frequency Branches
61(6)
1.7 Review of Some Recent Definitive Works
67(8)
1.8 Controversy about Shear Coefficient
75(32)
Chapter 2 Exact Solution of Timoshenko--Ehrenfest Equations
107(32)
2.1 Exact Solution for Vibration of a Shear-Deformable Beam Without Transverse Vibration
107(4)
2.2 Free Vibration Analysis for Arbitrary Set of BCs
111(3)
2.3 Determination of the Whole Spectrum of the Timoshenko--Ehrenfest Beam
114(25)
Chapter 3 Intermediate Theory Between the Bernoulli-Euler and the Timoshenko--Ehrenfest Beam Theories: Truncated Timoshenko--Ehrenfest Equations
139(46)
3.1 Contributions of Various Terms in Timoshenko--Ehrenfest Equation for Simply Supported Beam
139(3)
3.2 Physical Reasoning for Truncating Timoshenko--Ehrenfest Equations
142(2)
3.3 More Consistent Derivation of Refining Terms
144(2)
3.4 Physical Significance of Truncation
146(1)
3.5 Differential Equations and Boundary Conditions
147(7)
3.6 Simmonds' Comments
154(2)
3.7 Asymptotic Approach in Case of Plane Stress
156(4)
3.8 Boundary and Initial Conditions
160(5)
3.9 Conclusion
165(1)
3.10 Application of the Krein's Method for Determination of Natural Frequencies of Periodically Supported Beam Based on Truncated Timoshenko--Ehrenfest Equations
166(5)
3.11 Vibration Analysis of Multi-Span Beam Simply Supported of Both Ends
171(14)
Chapter 4 Refined Theories May Be Needed for Buckling or Vibration Analyses of Structures with Overhang
185(54)
4.1 Introduction
185(1)
4.2 Analysis
186(2)
4.3 Boundary Conditions
188(1)
4.4 Solution
188(1)
4.5 Results and Discussion
189(4)
4.6 Conclusion
193(1)
4.7 Effect of Shear Deformation on Buckling of Columns with Overhang
194(5)
4.8 Effect of End Shortening in Columns with Overhang
199(7)
4.9 A Controversy Between Two Buckling Formulas
206(7)
4.10 Stability of an Overhanging Pipe Conveying Fluid
213(26)
Chapter 5 Intermediate Theory Between Kirchhoff--Love and Uflyand--Mindlin Plate Theories: Truncated Uflyand--Mindlin Equations
239(84)
5.1 Introduction
239(1)
5.2 Effect of Rotary Inertia on Vibrations of Uniform and Homogeneous Plates
240(4)
5.3 Uflyand's Plate Theory
244(3)
5.4 Mindlin's Plate Theory
247(3)
5.5 Derivation of Exact Vibration Formula for the Simply Supported Uflyand--Mindlin Plates
250(5)
5.6 Vibrations of the Rectangular Uflyand--Mindlin Plates Simply Supported at Two Opposite Edges
255(49)
5.7 Extended Bolotin's Dynamic Edge Effect Method for General Boundary Conditions
304(4)
5.8 Some Misconceptions on the Timoshenko-Ehrenfest Beams and the Uflyand--Mindlin Plates
308(15)
Chapter 6 Non-local Theory of Nanobeams with Surface Effects Based on Truncated Timoshenko--Ehrenfest Equations
323(32)
6.1 Introduction
323(2)
6.2 Analysis without Surface Effects
325(3)
6.3 Analysis with Surface Effects
328(3)
6.4 Free Vibrations of Non-local Bernoulli--Euler Beams
331(1)
6.5 Free Vibration Analysis of the Timoshenko--Ehrenfest Beams without Surface Effects
332(3)
6.6 Free Vibrations Analysis of the Timoshenko--Ehrenfest Beams with Surface Effects
335(2)
6.7 Virus Sensor Based on Single-Walled Carbon Nanotube with Surface Effects Taken into Account
337(18)
Chapter 7 Finite Element Method for the Timoshenko--Ehrenfest Beams and the Uflyand-Mindlin Plates
355(34)
7.1 Introduction
355(1)
7.2 Preliminary Concepts
356(2)
7.3 Solution of the Timoshenko--Ehrenfest Dynamic Problem by a Single Variable Approach
358(2)
7.4 Interdependent Shape Polynomials
360(1)
7.5 Element Stiffness and Mass Matrices
361(2)
7.6 Numerical Example
363(2)
7.7 Solution of the Uflyand--Mindlin Plate Problem by a Single Variable Approach
365(6)
7.8 The Fictitious Deflection in the Uflyand--Mindlin Plate Dynamic Problem
371(5)
7.9 The Interdependent Shape Polynomials for the UMPM
376(2)
7.10 The Element Stiffness and Mass Matrices
378(2)
7.11 Numerical Examples for FEM Analysis of the Uflyand--Mindlin Plates
380(9)
Chapter 8 Random Vibration of Space Shuttle Weather Protection Systems and Related Problems
389(46)
8.1 Introduction
389(2)
8.2 The Equivalent Timoshenko--Ehrenfest Beam
391(2)
8.3 Random Vibration of a Weather-Protection System Modeled as a Timoshenko-Ehrenfest Beam
393(8)
8.4 Random Vibration of a Structure Subjected to a Non-White Excitation
401(10)
8.5 Some Closed-Form Solutions in Random Vibration of the Timoshenko-Ehrenfest Beams Subjected to Space-Time White Noise
411(4)
8.6 Transverse-Viscous Damping
415(3)
8.7 The Timoshenko--Ehrenfest Beam with Structural Damping
418(2)
8.8 The Timoshenko--Ehrenfest Beam with Voigt Damping
420(1)
8.9 The Timoshenko--Ehrenfest Beam with Rotary and Transverse Damping
421(1)
8.10 Elucidation of Random Vibration Results on a Simple Model
422(13)
Chapter 9 Conclusion and Directions for Further Research
435(8)
Appendices
443(94)
Appendix A Biographical Notes
445(44)
Appendix B Multi-Span Beam Clamped at Both Ends (Chapter 3)
489(4)
Appendix C Multi-Span Beam Simply Supported at One End and Clamped at the Other (Chapter 3)
493(2)
Appendix D Different Possible Solutions for Eqs. (5.63a)--(5.63c) (Chapter 5)
495(4)
Appendix E On the Existence of Eigenvalues with α1<mπ (Chapter 5)
499(6)
Appendix F Application of Hamilton's Principle to the Non-local Timoshenko--Ehrenfest Beams (Chapter 6)
505(4)
Appendix G Expression of Element of Matrix C (Chapter 7)
509(2)
Appendix H The Expression of the Element Stiffness and Mass Matrices (Chapter 7)
511(2)
Appendix I Some Closed-Form Solutions in Random Vibration of Bernoulli-Euler Beams (Chapter 7)
513(16)
Appendix J A Tribute Written by Prof. Chia-Shun Yih (Stephen P. Timoshenko Distinguished University Professor, University of Michigan) in October 1972, the Year of Prof. Timoshenko's Death
529(8)
Bibliography 537(182)
Author Index 719(38)
Subject Index 757
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