| Preface |
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xiii | |
| Acknowledgements |
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xv | |
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List of frequently used symbols |
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xvi | |
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1 | (4) |
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1 | (1) |
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2 | (1) |
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1.3 Symbols and conventions |
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2 | (1) |
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1.4 On the applicability of linear elasticity |
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3 | (2) |
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2 Basic elements of linear elasticity |
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5 | (27) |
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5 | (1) |
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2.2 Elastic displacement and strain |
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5 | (10) |
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2.2.1 Straining versus rigid body rotation |
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5 | (4) |
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2.2.2 Relationships for strain components |
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9 | (6) |
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2.3 Traction vector, stress tensor, and body forces |
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15 | (6) |
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2.3.1 Traction vector and components of stress |
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15 | (3) |
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18 | (1) |
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2.3.3 Relationships for stress components and body forces |
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18 | (3) |
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2.4 Linear coupling of stress and strain |
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21 | (8) |
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2.4.1 Stress as a function of strain |
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21 | (3) |
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2.4.2 Strain as a function of stress |
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24 | (1) |
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2.4.3 "Corresponding" elastic fields |
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25 | (2) |
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2.4.4 Stress-strain relationships and elastic constants for isotropic systems |
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27 | (2) |
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2.5 Elastic strain energy |
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29 | (2) |
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2.5.1 General relationships |
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30 | (1) |
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2.5.2 Strain energy in isotropic systems |
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31 | (1) |
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2.6 St.-Venant's principle |
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31 | (1) |
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32 | (32) |
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32 | (1) |
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3.2 Basic equation for the displacement field |
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32 | (2) |
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3.3 Fourier transform method |
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34 | (1) |
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3.4 Green's function method |
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34 | (4) |
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3.5 Sextic and integral formalisms for two-dimensional problems |
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38 | (17) |
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38 | (14) |
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52 | (3) |
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3.6 Elasticity theory for systems containing transformation strains |
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55 | (5) |
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3.6.1 Transformation strain formalism |
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56 | (3) |
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3.6.2 Fourier transform solutions |
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59 | (1) |
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3.6.3 Green's function solutions |
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59 | (1) |
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3.7 Stress function method for isotropic systems |
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60 | (1) |
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3.8 Defects in regions bounded by interfaces---method of image stresses |
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61 | (3) |
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63 | (1) |
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4 Green's functions for unit point force |
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64 | (52) |
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64 | (1) |
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4.2 Green's functions for unit point force |
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64 | (14) |
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4.2.1 In infinite homogeneous region |
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66 | (6) |
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4.2.2 In half-space with planar free surface |
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72 | (3) |
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4.2.3 In half-space joined to dissimilar half-space along planar interface |
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75 | (3) |
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4.3 Green's functions for unit point force in isotropic systems |
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78 | (15) |
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4.3.1 In half-space joined to dissimilar half-space along planar interface |
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78 | (7) |
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4.3.2 In infinite homogeneous region |
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85 | (1) |
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4.3.3 In half-space with planar free surface |
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86 | (2) |
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88 | (5) |
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5 Interactions between defects and stress |
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93 | (1) |
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93 | (1) |
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5.2 Interaction energies between defect source of stress and various stresses in homogeneous finite body |
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94 | (9) |
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5.2.1 Interaction energy with imposed internal stress |
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95 | (3) |
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5.2.2 Interaction energy with applied stress |
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98 | (2) |
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5.2.3 Interaction energy with defect image stress |
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100 | (3) |
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5.3 Forces on defect source of stress in homogeneous body |
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103 | (10) |
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5.3.1 General formulation |
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103 | (1) |
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5.3.2 Force obtained from change of the total system energy |
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103 | (8) |
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5.3.3 Force obtained from change of the interaction energy |
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111 | (2) |
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5.4 Interaction energy and force between inhomogeneity and imposed stress |
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113 | (3) |
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114 | (2) |
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6 Inclusions in infinite homogeneous regions |
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116 | (43) |
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116 | (1) |
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6.2 Characterization of inclusions |
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116 | (1) |
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117 | (12) |
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6.3.1 Elastic field of homogeneous inclusion by Fourier transform method |
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118 | (8) |
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6.3.2 Elastic field of inhomogeneous inclusion with ellipsoidal shape |
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126 | (2) |
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128 | (1) |
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6.4 Coherent inclusions in isotropic systems |
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129 | (18) |
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6.4.1 Elastic field of homogeneous inclusion by Fourier transform method |
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129 | (1) |
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6.4.2 Elastic field of homogeneous inclusion by Green's function method |
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130 | (10) |
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6.4.3 Elastic field of inhomogeneous ellipsoidal inclusion with uniform εTij |
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140 | (2) |
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142 | (3) |
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145 | (2) |
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6.5 Coherent → incoherent transitions in isotropic systems |
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147 | (12) |
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6.5.1 General formulation |
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147 | (2) |
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6.5.2 Inhomogeneous sphere |
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149 | (1) |
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6.5.3 Inhomogeneous thin-disk |
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150 | (1) |
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6.5.4 Inhomogeneous needle |
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150 | (1) |
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151 | (8) |
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7 Interactions between inclusions and imposed stress |
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159 | (12) |
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159 | (1) |
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7.2 Interaction between inclusion and imposed stress |
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159 | (12) |
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7.2.1 Homogeneous inclusion |
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159 | (3) |
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7.2.2 Inhomogeneous ellipsoidal inclusion |
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162 | (5) |
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167 | (4) |
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8 Inclusions in finite regions - image effects |
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171 | (16) |
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171 | (1) |
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8.2 Homogeneous inclusion far from interfaces in large finite body in isotropic system |
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171 | (3) |
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171 | (1) |
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8.2.2 Volume change due to inclusion - effect of image stress |
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172 | (2) |
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8.3 Homogeneous inclusion near interface in large region |
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174 | (3) |
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174 | (1) |
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8.3.2 Force due to image stress |
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175 | (2) |
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8.4 Elastic Field of homogeneous spherical inclusion near surface of hall-space in isotropic system |
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177 | (2) |
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8.5 Strain energy of inclusion in finite region |
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179 | (8) |
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180 | (7) |
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187 | (14) |
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187 | (1) |
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9.2 Interaction between uniform ellipsoidal inhomogeneity and imposed stress |
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187 | (9) |
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9.2.1 Elastic field in body containing inhomogeneity and imposed stress |
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188 | (1) |
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9.2.2 Interaction energy between inhomogeneity and imposed stress |
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189 | (3) |
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9.2.3 Some results for isotropic system |
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192 | (4) |
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9.3 Interaction between non-uniform inhomogeneity and non-uniform imposed stress |
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196 | (5) |
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198 | (3) |
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10 Point defects in infinite homogeneous regions |
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201 | (14) |
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201 | (1) |
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10.2 Symmetry of point defects |
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202 | (1) |
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10.3 Force multipole model |
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203 | (10) |
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203 | (2) |
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205 | (3) |
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10.3.3 Elastic fields of multipoles in isotropic systems |
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208 | (2) |
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10.3.4 Elastic fields of multipoles in general anisotropic systems |
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210 | (1) |
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10.3.5 The force dipole moment approximation |
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210 | (3) |
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10.4 Small inhomogeneous inclusion model for point defect |
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213 | (2) |
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214 | (1) |
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11 Point defects and stress - image effects in finite bodies |
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215 | (14) |
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215 | (1) |
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11.2 Interaction between a point defect (multipole) and stress |
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215 | (2) |
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11.3 Volume change of finite body due to single point defect |
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217 | (1) |
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11.4 Statistically uniform distributions of point defects |
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218 | (11) |
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11.4.1 Defect-induced stress and changes in volume of finite body |
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218 | (3) |
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11.4.2 Defect-induced changes in shape of finite body - the λ(p) tensor |
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221 | (1) |
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11.4.3 Defect-induced changes in X-ray lattice parameter |
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222 | (2) |
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224 | (5) |
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12 Dislocations in infinite homogeneous regions |
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229 | (75) |
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229 | (1) |
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12.2 Geometrical features |
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229 | (4) |
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12.3 Infinitely long straight dislocations and lines of force |
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233 | (7) |
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233 | (5) |
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238 | (2) |
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12.4 Infinitely long straight dislocations in isotropic system |
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240 | (5) |
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240 | (4) |
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244 | (1) |
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12.5 Smoothly curved dislocation loops |
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245 | (19) |
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245 | (18) |
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263 | (1) |
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12.6 Smoothly curved dislocation loops in isotropic system |
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264 | (6) |
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264 | (6) |
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270 | (1) |
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12.7 Segmented dislocation structures |
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270 | (9) |
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271 | (7) |
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278 | (1) |
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12.8 Segmented dislocation structures in isotropic system |
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279 | (25) |
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279 | (8) |
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287 | (5) |
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292 | (12) |
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13 Dislocations and stress - image effects in finite regions |
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304 | (36) |
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304 | (1) |
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13.2 Interaction of dislocation with imposed internal or applied stress: the Peach-Koehler force equation |
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304 | (3) |
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13.3 Interaction of dislocation with its image stress |
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307 | (33) |
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13.3.1 General formulation |
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307 | (2) |
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13.3.2 Straight dislocations parallel to free surfaces |
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309 | (8) |
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13.3.3 Straight dislocation parallel to planar interface between dissimilar half-spaces |
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317 | (8) |
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13.3.4 Straight dislocation impinging on planar free surface of half-space |
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325 | (8) |
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13.3.5 Dislocation loop near planar free surface of half-space |
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333 | (2) |
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13.3.6 Dislocation loop near planar interface between dissimilar half-spaces |
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335 | (1) |
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335 | (5) |
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340 | (37) |
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340 | (1) |
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14.2 Geometrical features of interfaces - degrees of freedom |
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341 | (1) |
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14.3 Iso-elastic interfaces |
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341 | (18) |
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14.3.1 Geometrical features |
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342 | (3) |
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14.3.2 The Frank-Bilby equation |
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345 | (8) |
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14.3.3 Elastic fields of arrays of parallel dislocations |
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353 | (2) |
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14.3.4 Elastic fields of arrays of parallel dislocations in isotropic systems |
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355 | (2) |
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14.3.5 Interfacial strain energies in isotropic systems |
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357 | (2) |
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14.4 Hetero-elastic interfaces |
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359 | (18) |
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14.4.1 Geometrical features |
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359 | (1) |
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360 | (13) |
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373 | (4) |
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15 Interactions between interfaces and stress |
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377 | (9) |
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377 | (1) |
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15.2 The energy-momentum tensor force |
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378 | (2) |
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15.3 The interfacial dislocation force |
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380 | (6) |
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15.3.1 Small-angle symmetric tilt interfaces |
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380 | (1) |
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15.3.2 Small-angle asymmetric tilt interfaces |
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381 | (2) |
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15.3.3 Large-angle homophase interfaces |
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383 | (1) |
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15.3.4 Heterophase interfaces |
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384 | (1) |
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385 | (1) |
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16 Interactions between defects |
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386 | (25) |
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386 | (1) |
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16.2 Point defect point defect interactions |
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386 | (2) |
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16.2.1 General formulation |
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386 | (1) |
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16.2.2 Between two point defects in isotropic system |
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387 | (1) |
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16.3 Dislocation-dislocation interactions |
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388 | (11) |
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16.3.1 Interaction energies |
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388 | (5) |
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16.3.2 Interaction energies in isotropic systems |
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393 | (3) |
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16.3.3 Interaction forces |
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396 | (2) |
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16.3.4 Interaction forces in isotropic systems |
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398 | (1) |
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16.4 Inclusion-inclusion interactions |
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399 | (2) |
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16.4.1 Between two homogeneous inclusions |
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399 | (2) |
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16.4.2 Between two inhomogeneous inclusions |
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401 | (1) |
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16.5 Point defect-dislocation interactions |
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401 | (3) |
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16.5.1 General Formulation |
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401 | (1) |
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16.5.2 Between point defect and screw dislocation in isotropic system |
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402 | (2) |
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16.6 Point defect-inclusion interactions |
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404 | (1) |
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16.6.1 General formulation |
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404 | (1) |
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16.6.2 Between point defect and spherical inhomogeneous inclusion with εTij = εTδij in isotropic system |
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405 | (1) |
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16.7 Dislocation-inclusion interactions |
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405 | (6) |
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16.7.1 General formulation |
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405 | (1) |
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16.7.2 Between dislocation and spherical inhomogeneous inclusion with εTij = εTδij in isotropic system |
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406 | (1) |
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406 | (5) |
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Appendix A Relationships involving the Δ operator |
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411 | (2) |
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A.1 Cylindrical orthogonal curvilinear coordinates |
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411 | (1) |
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A.2 Spherical orthogonal curvilinear coordinates |
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411 | (2) |
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Appendix B Integral relationships |
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413 | (3) |
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B.1 Divergence (Gauss') theorem |
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413 | (1) |
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413 | (1) |
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B.3 Another form of Stokes' theorem |
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414 | (2) |
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Appendix C The tensor product of two vectors |
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416 | (1) |
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Appendix D Properties of the delta function |
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417 | (2) |
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Appendix E The alternator operator |
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419 | (1) |
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Appendix F Fourier transforms |
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420 | (1) |
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Appendix G Equations from the theory of isotropic elasticity |
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421 | (3) |
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G.1 Cylindrical orthogonal curvilinear coordinates |
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421 | (2) |
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G.2 Spherical orthogonal curvilinear coordinates |
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423 | (1) |
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Appendix H Components of the Eshelby tensor in isotropic system |
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424 | (2) |
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Appendix I Airy stress functions for plane strain |
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426 | (1) |
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Appendix J Deviatoric stress and strain in isotropic system |
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427 | (1) |
| References |
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428 | (6) |
| Index |
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434 | |
