Index:Love, A.E.H. - A treatise on the mathematical theory of elasticity (1920).djvu
CONTENTS
Chapter I. Analysis of strain
Appendix to Chapter I. The general theory of strain
Chapter II. Analysis of stress
Chapter III. The elasticity of solid bodies
Chapter V. The equilibrium of isotropic elastic solids
Chapter VI. Equilibrium of æolotropic elastic solid bodies
Chapter VII. General theorems
Chapter VIII. The transmission of force
144. 145. 146. 147. 148. 149. 150. 151. . 153. 154. 155. . PAGE
Chapter IX. Two-dimensional elastic systemsIntroductory . ... ..... 202 Displacement corresponding with plane strain 202 Displacement corresponding with plane stress ... . 204 Generalized plane stress 206 Introduction of nuclei of strain 206 Force operative at a point 207 Force operative at a point of a boundary 208 Case of a straight boundary 209 Additional results : (i) the stress function, (ii) normal tension on a segment of a straight edge, (iii) force at an angle, (iv) pressure on faces of wedge 209 Typical nuclei of strain in two dimensions 211 Transformation of plane strain 213 Inversion 213 Equilibrium of a circular disk under forces in its plane, (i) Two opposed forces at points on the rim. (ii) Any forces applied to the rim. (iii) Heavy disk resting on horizontal plane . . 215 Examples of transformation 217
Appendix to Chapters VIII and IX. Volterra's Theory of DislocationsAppendix to Chapters VIII and IX. Volterea's Theory of Dislocations a. Introductory, (a) Displacement answering to given strain. (6) Discon- tinuity at a barrier, (c) Hollow cylinder deformed by removal of a slice of uniform thickness, {d) Hollow cylinder with radial fissure
Chapter X. Theory of the integration op the equations of equilibrium of an isotropic elastic solid bodyChapter X. Theory of the integration op the equations of equilibrium of an isotropic elastic solid body . Nature of the problem . R&ume of the theory of Potential . . Description of Betti's method of integration . . Formula for the dilatation .... . Calculation of the dilatation from surface data . Formulse for the components of rotation . . Calculation of the rotation from surface data . . Body bounded by plane — Formulae for the dilatation . Body bounded by plane — Given surface displacements . Body bounded by plane — Given surface tractions . Historical Note . Body bounded by plane — Additional results . . Formulse for the displacement and strain . Outlines of various methods of integration 228 230 231 233 234 235 235 237 239 241 242 243 245 Page:Love, A.E.H. - A treatise on the mathematical theory of elasticity (1920).djvu/18 Page:Love, A.E.H. - A treatise on the mathematical theory of elasticity (1920).djvu/19 Page:Love, A.E.H. - A treatise on the mathematical theory of elasticity (1920).djvu/20 Page:Love, A.E.H. - A treatise on the mathematical theory of elasticity (1920).djvu/21 Page:Love, A.E.H. - A treatise on the mathematical theory of elasticity (1920).djvu/22 Page:Love, A.E.H. - A treatise on the mathematical theory of elasticity (1920).djvu/23 Page:Love, A.E.H. - A treatise on the mathematical theory of elasticity (1920).djvu/24 |