Description |
1 online resource (xl, 931 pages) : illustrations, portrait |
Series |
Solid mechanics and its applications ; v. 133 |
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Solid mechanics and its applications ; v. 133.
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Contents |
Dislocations as a cause of mechanical damping in metals -- Uniformly Moving Dislocations -- Edge Dislocations in Anisotropic Materials -- The Fundamental Physics of Heat Conduction -- The Equilibrium of Linear Arrays of Dislocations -- The Force on an Elastic Singularity -- Dislocations in Thin Plates -- Anisotropic Elasticity with Applications to Dislocation Theory -- Screw Dislocations in Thin Rods -- The Equation of Motion of a Dislocation -- A Tentative Theory of Metallic Whisker Growth -- Geometrical and Apparent X-Ray Expansions of a Crystal Containing Lattice Defects -- Distortion of a Crystal by Point Imperfections -- The Elastic Interaction of Point Defects -- Note on the Heating Effect of Moving Dislocations -- Supersonic Dislocations and Dislocations in Dispersive Media -- The Continuum Theory of Lattice Defects -- The determination of the elastic field of an ellipsoidal inclusion, and related problems -- Discussion -- Charged Dislocations and the Strength of Ionic Crystals -- The Twist in a Crystal Whisker Containing a Dislocation -- The Elastic Model of Lattice Defects -- Stress Induced Ordering and Strain-Ageing in Low Carbon Steels -- Scope and Limitations of the Continuum Approach -- The elastic field outside an ellipsoidal inclusion -- Elastic Inclusions and Inhomogeneities -- Dislocations in Visco-elastic Materials -- The Interaction of Kinks and Elastic Waves -- The Energy and Line Tension of a Dislocation in a Hexagonal Crystal -- The Distortion and Electrification of Plates and Rods by Dislocations -- The Distribution of Dislocations in an Elliptical Glide Zone -- On the Elastic Interactions between Inclusions -- A simple derivation of the elastic field of an edge dislocation -- The Velocity of a Wave along a Dislocation -- The Interpretation of Terminating Dislocations -- Stress analysis: theory of elasticity -- Stress analysis: fracture mechanics -- The Flow of Energy into the Tip of a Moving Crack -- Dislocations and the Theory of Fracture -- The Elastic Field of a Crack Extending Non-Uniformly under General Anti-Plane Loading -- Axisymmetric Stress Field Around Spheroidal Inclusions and Cavities in a Transversely Isotropic Material -- The Starting of a Crack -- Energy Relations and the Energy-Momentum Tensor in Continuum Mechanics -- The Fracture Mechanics of Flint-Knapping and Allied Processes -- Fracture mechanics -- Dislocation theory for geophysical applications -- The Calculation of Energy Release Rates -- Point Defects -- The Change of Shape of a Viscous Ellipsoidal Region Embedded in a Slowly Deforming Matrix Having a Different Viscosity -- The elastic energy-momentum tensor -- The Change of Shape of a Viscous Ellipsoidal Region Embedded in a Slowly Deforming Matrix Having a Different Viscosity Some Comments on a Discussion by N. C. Gay -- Interaction and diffusion of point defects -- Boundary Problems -- The force on a disclination in a liquid crystal -- The Energy-Momentum Tensor of Complex Continua -- Aspects of the Theory of Dislocations -- The Stresses on and in a Thin Inextensible Fibre in a Stretched Elastic Medium -- Lectures on the Elastic Energy-Momentum Tensor (Brown University, 1977) |
Summary |
J.D. Eshelby's work has shaped the fields of defect mechanics and micromechanics of inhomogeneous solids in the last fifty years and provides the basis for the quantitative analysis of the controlling mechanisms of plastic deformation and fracture. Bringing fundamental concepts from physics into the analysis of the micromechanisms of deformation in solids, including the interaction of lattice defects and cracks, microcracks, with other defects, inhomogeneities etc., Eshelby provided the conceptual framework for the fundamental physical understanding and the corresponding analytical treatment of the complex interactions at the micro-level responsible for the mechanical properties at the continuum scale. Eshelby's work cut across disciplines and unified fields previously disjoint, such as materials science, fracture mechanics, plasticity, and composite materials. His paper on the ellipsoidal inclusion is the most cited in solid mechanics, and many of his papers are highly cited. In this volume we present the Collected Works of Eshelby unabridged as well as forewords by D.M. Barnett (Stanford Unviversity), B. Bilby (Sheffield), A. Seeger (Stuttgart), and J.R. Willis (Cambridge University) as to the impact of Eshelby's work on their own and the field |
Notes |
A collection of 58 articles previously published elsewhere |
Bibliography |
Includes bibliographical references |
Notes |
Master and use copy. Digital master created according to Benchmark for Faithful Digital Reproductions of Monographs and Serials, Version 1. Digital Library Federation, December 2002. http://purl.oclc.org/DLF/benchrepro0212 MiAaHDL |
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Print version record |
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digitized 2017 HathiTrust Digital Library committed to preserve pda MiAaHDL |
Subject |
Eshelby, John Douglas.
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Eshelby, John Douglas. |
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Deformations (Mechanics)
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Inhomogeneous materials.
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Fracture mechanics.
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deformation.
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Deformations (Mechanics)
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Fracture mechanics.
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Inhomogeneous materials.
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Form |
Electronic book
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Author |
Markenscoff, X. (Xanthippi)
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Gupta, Anurag
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ISBN |
9781402044991 |
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1402044992 |
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