Continuum Theory of Plasticity

In contrast to older texts, this book provides a continuum mechanics approach to understanding and predicting the behavior of solids undergoing plastic deformation.

Continuum Theory of Plasticity

The only modern, up-to-date introduction to plasticity Despite phenomenal progress in plasticity research over the past fifty years, introductory books on plasticity have changed very little. To meet the need for an up-to-date introduction to the field, Akhtar S. Khan and Sujian Huang have written Continuum Theory of Plasticity--a truly modern text which offers a continuum mechanics approach as well as a lucid presentation of the essential classical contributions. The early chapters give the reader a review of elementary concepts of plasticity, the necessary background material on continuum mechanics, and a discussion of the classical theory of plasticity. Recent developments in the field are then explored in sections on the Mroz Multisurface model, the Dafalias and Popov Two Surface model, the non-linear kinematic hardening model, the endochronic theory of plasticity, and numerous topics in finite deformation plasticity theory and strain space formulation for plastic deformation. Final chapters introduce the fundamentals of the micromechanics of plastic deformation and the analytical coupling between deformation of individual crystals and macroscopic material response of the polycrystal aggregate. For graduate students and researchers in engineering mechanics, mechanical, civil, and aerospace engineering, Continuum Theory of Plasticity offers a modern, comprehensive introduction to the entire subject of plasticity.

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Continuum Theory
Language: en
Pages: 360
Authors: Alejandro Illanes, Sergio Macias, Ira Lewis
Categories: Mathematics
Type: BOOK - Published: 2002-07-25 - Publisher: CRC Press

Celebrating the work of world-renowned mathematician Sam B. Nadler, Jr., this reference examines the most recent advances in the analysis of continua. The book offers articles on the contributions of Professor Nadler, theorems on the structure and uniqueness of hyperspaces, results on the dynamics of solenoids, examples involving inverse limits
Continuum Theory
Language: en
Pages: 348
Authors: Sam Nadler
Categories: Mathematics
Type: BOOK - Published: 2017-07-12 - Publisher: CRC Press

A textbook for either a semester or year course for graduate students of mathematics who have had at least one course in topology. Introduces continuum theory through a combination of classical and modern techniques. Annotation copyright Book News, Inc. Portland, Or.
Continuum Theory of Inhomogeneities in Simple Bodies
Language: en
Pages: 180
Authors: W. Noll, R. A. Toupin, C. C. Wang
Categories: Science
Type: BOOK - Published: 2012-12-06 - Publisher: Springer Science & Business Media

The term "dislocation" is used in several different senses in the literature of mechanics. In the elassic work of VOLTERRA, WEINGARTEN, and SOMIGLIANA, it refers to particular solutions of the equations of linear elasticity, in which a con tinuous field of strain does not correspond, globally, to a continuous field
Continuum Theory of Plasticity
Language: en
Pages: 440
Authors: Akhtar S. Khan, Sujian Huang
Categories: Science
Type: BOOK - Published: 1995-02-28 - Publisher: John Wiley & Sons

The only modern, up-to-date introduction to plasticity Despite phenomenal progress in plasticity research over the past fifty years, introductory books on plasticity have changed very little. To meet the need for an up-to-date introduction to the field, Akhtar S. Khan and Sujian Huang have written Continuum Theory of Plasticity--a truly
Continuum Theory & Dynamical Systems
Language: en
Pages: 312
Authors: Thelma West
Categories: Mathematics
Type: BOOK - Published: 1993-08-05 - Publisher: CRC Press

Based on the conference/workshop on Continuum Theory and Dynamical Systems held in Lafayette, Louisiana, this reference illustrates the current expansion of knowledge on the relationship between these subjects. It presents new problems in hyperspaces, induced maps, universal maps, fixed-point sets, disconnected numbers and quotient maps.;Explaining the definitions and techniques used