| Description |
1 online resource |
| Series |
Iste |
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Iste
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| Contents |
Introduction xi Chapter 1. Linear Elasticity 1 1.1. Notations 1 1.2. Stress 3 1.3. Linearized strains 6 1.4. Small perturbations 8 1.5. Linear elasticity 8 1.6. Boundary value problem in linear elasticity 10 1.7. Variational formulations. 11 1.7.1. Compatible strains and stresses 11 1.7.2. Principle of minimum of potential energy 13 1.7.3. Principle of minimum of complementary energy 14 1.7.4. Two-energy principle 15 1.8. Anisotropy 15 1.8.1. Voigt notations 15 1.8.2. Material symmetries 17 1.8.3. Orthotropy 20 1.8.4. Transverse isotropy 22 1.8.5. Isotropy 23 Part 1. Thin Laminated Plates 27 Chapter 2. A Static Approach for Deriving the Kirchhoff-Love Model for Thin Homogeneous Plates 29 2.1. The 3D problem 29 2.2. Thin plate subjected to in-plane loading 32 2.2.1 |
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The plane-stress 2D elasticity problem 33 2.2.2. Application of the two-energy principle 34 2.2.3. In-plane surfacic forces on deltaOmega " 336 2.2.4. Dirichlet conditions on the lateral boundary of the plate 38 2.3. Thin plate subjected to out-of-plane loading 40 2.3.1. The Kirchhoff-Love plate model 41 2.3.2. Application of the two-energy principle 47 Chapter 3. The Kirchhoff-Love Model for Thin Laminated Plates 53 3.1. The 3D problem 53 3.2. Deriving the Kirchhoff-Love plate model 55 3.2.1. The generalized plate stresses 55 3.2.2. Static variational formulation of the Kirchhoff-Love plate model 56 3.2.3. Direct formulation of the Kirchhoff-Love plate model 58 3.3. Application of the two-energy principle 59 Part 2. Thick Laminated Plates 65 Chapter 4 |
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Thick Homogeneous Plate Subjected to Out-of-Plane Loading 67 4.1. The 3D problem 67 4.2. The Reissner-Mindlin plate model. 69 4.2.1. The 3D stress distribution in the Kirchhoff-Love plate model 69 4.2.2. Formulation of the Reissner-Mindlin plate model 71 4.2.3. Characterization of the Reissner-Mindlin stress solution 72 4.2.4. The Reissner-Mindlin kinematics 73 4.2.5. Derivation of the direct formulation of the Reissner-Mindlin plate model 74 4.2.6. The relations between generalized plate displacements and 3D displacements 76 Chapter 5. Thick Symmetric Laminated Plate Subjected to Out-of-Plane Loading 81 5.1. Notations 81 5.2. The 3D problem 82 5.3. The generalized Reissner plate model 85 5.3.1. The 3D stress distribution in the Kirchhoff-Love plate model 85 5.3.2 |
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Formulation of the generalized Reissner plate model 90 5.3.3. The subspaces of generalized stresses 91 5.3.4. The generalized Reissner equilibrium equations 95 5.3.5. Characterization of the generalized Reissner stress solution 97 5.3.6. The generalized Reissner kinematics 98 5.3.7. Derivation of the direct formulation of the generalized Reissner plate model 100 5.3.8. The relationships between generalized plate displacements and 3D displacements 102 5.4. Derivation of the Bending-Gradient plate model 106 5.5. The case of isotropic homogeneous plates 109 5.6. Bending-Gradient or Reissner-Mindlin plate model? 111 5.6.1. When does the Bending-Gradient model degenerate into the Reissner-Mindlin's model? 112 5.6.2. The shear compliance projection of the Bending-Gradient model onto the Reissner-Mindlin model 113 5.6.3 |
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The shear stiffness projection of the Bending-Gradient model onto the Reissner-Mindlin model 115 5.6.4. The cylindrical bending projection of the Bending-Gradient model onto the Reissner-Mindlin model 116 Chapter 6. The Bending-Gradient Theory 117 6.1. The 3D problem 117 6.2. The Bending-Gradient problem 119 6.2.1. Generalized stresses 119 6.2.2. Equilibrium equations 121 6.2.3. Generalized displacements 122 6.2.4. Constitutive equations 122 6.2.5. Summary of the Bending-Gradient plate model 123 6.2.6. Field localization 123 6.3. Variational formulations 125 6.3.1. Minimum of the potential energy 126 6.3.2. Minimum of the complementary energy 127 6.4. Boundary conditions 128 6.4.1. Free boundary condition 129 6.4.2. Simple support boundary condition 130 6.4.3. Clamped boundary condition 131 6.5. Voigt notations 131 6.5.1 |
| Summary |
This book gives new insight on plate models in the linear elasticity framework tacking into account heterogeneities and thickness effects. It is targeted to graduate students how want to discover plate models but deals also with latest developments on higher order models. Plates models are both an ancient matter and a still active field of research. First attempts date back to the beginning of the 19th century with Sophie Germain. Very efficient models have been suggested for homogeneous and isotropic plates by Love (1888) for thin plates and Reissner (1945) for thick plates. However, the extension of such models to more general situations --such as laminated plates with highly anisotropic layers-- and periodic plates --such as honeycomb sandwich panels-- raised a number of difficulties. An extremely wide literature is accessible on these questions, from very simplistic approaches, which are very limited, to extremely elaborated mathematical theories, which might refrain the beginner. Starting from continuum mechanics concepts, this book introduces plate models of progressive complexity and tackles rigorously the influence of the thickness of the plate and of the heterogeneity. It provides also latest research results. The major part of the book deals with a new theory which is the extension to general situations of the well established Reissner-Mindlin theory. These results are completely new and give a new insight to some aspects of plate theories which were controversial till recently |
| Notes |
Empirical error estimates and convergence rate 160 7.4.4. Influence of the bending direction 161 7.5. Conclusion 163 Part 3 Periodic Plates 167 Chapter 8. Thin Periodic Plates 169 8.1. The 3D problem 169 8.2. The homogenized plate problem 173 8.3. Determination of the homogenized plate elastic stiffness tensors 174 8.4. A first justification: the asymptotic effective elastic properties of periodic plates 181 8.5. Effect of symmetries 184 8.5.1. Symmetric periodic plate 185 8.5.2. Material symmetry of the homogenized plate 186 8.5.3. Important special cases 187 8.5.4. Rectangular parallelepipedic unit cell 189 8.6. Second justification: the asymptotic expansion method 194 Chapter 9. Thick Periodic Plates 205 9.1. The 3D problem 206 9.2. The asymptotic solution 208 9.3. The Bending-Gradient homogenization scheme 209 9.3.1 |
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Motivation and description of the approach 210 9.3.2. Introduction of corrective terms to the asymptotic solution 210 9.3.3. Identification of the localization tensors 212 9.3.4. Identification of the Bending-Gradient compliance tensor 214 Chapter 10. Application to Cellular Sandwich Panels 219 10.1. Introduction 219 10.2. Questions raised by sandwich panel shear force stiffness 220 10.2.1. The case of homogeneous cores 221 10.2.2. The case of cellular cores 223 10.3. The membrane and bending behavior of sandwich panels 225 10.3.1. The case of homogeneous cores 225 10.3.2. The case of cellular cores 226 10.4. The transverse shear behavior of sandwich panels 229 10.4.1. The case of homogeneous cores 229 10.4.2. A direct homogenization scheme for cellular sandwich panel shear force stiffness 230 10.4.3. Discussion 232 10.5 |
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Application to a sandwich panel including Miura-ori 235 10.5.1. Folded cores 236 10.5.2. Description of the sandwich panel including the folded core 237 10.5.3. Symmetries of Miura-ori 238 10.5.4. Implementation 239 10 |
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CIP data; resource not viewed |
| Subject |
Plates (Engineering)
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TECHNOLOGY & ENGINEERING -- Drafting & Mechanical Drawing.
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Plates (Engineering)
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| Form |
Electronic book
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| Author |
Lebée, Arthur, author
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| ISBN |
9781119008163 |
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1119008166 |
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9781119008156 |
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1119008158 |
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