Cover of: Finite Inelastic Deformations - Theory and Applications | D. Besdo Read Online
Share

Finite Inelastic Deformations - Theory and Applications IUTAM Symposium Hannover, Germany 1991 by D. Besdo

  • 803 Want to read
  • ·
  • 25 Currently reading

Published by Springer Berlin Heidelberg in Berlin, Heidelberg .
Written in English

Subjects:

  • Engineering,
  • Surfaces (Physics),
  • Applied Mechanics

Book details:

About the Edition

The book provides a fundamental treatment of new developments in plasticity and visco-plasticity at finite strains. This covers the phenomenological material theory based on continuum mechanics and thermodynamics as well as the treatment of microstructural phenomena detected by precise experimental data, the rigorous and effective numerical methods and finally important applications. The reader will get a fresh insight in current research areas associated with the phenomenological material theory and computational nonlinear mechanics.

Edition Notes

Statementedited by Dieter Besdo, Erwin Stein
SeriesInternational Union of Theoretical and Applied Mechanics, International Union of Theoretical and Applied Mechanics
ContributionsStein, Erwin
Classifications
LC ClassificationsTA349-359
The Physical Object
Format[electronic resource] :
Pagination1 online resource (xvii, 556 pages 237 illustrations).
Number of Pages556
ID Numbers
Open LibraryOL27038858M
ISBN 103642848354, 3642848338
ISBN 109783642848353, 9783642848339
OCLC/WorldCa851367962

Download Finite Inelastic Deformations - Theory and Applications

PDF EPUB FB2 MOBI RTF

IUTAM-Symposium on 'Finite Inelastic Deformations - Theory and Applications' took place from August 19 to 23, , at the University of Hannover, Germany, with 75 participants from 14 countries. Scope of the symposium was a fundamental treatment of new developments in plasticity and. Get this from a library! Finite Inelastic Deformations - Theory and Applications: IUTAM Symposium Hannover, Germany [D Besdo; Erwin Stein] -- The book provides a fundamental treatment of new developments in plasticity and visco-plasticity at finite strains. This covers the phenomenological material theory based on continuum mechanics and. Get this from a library! Finite inelastic deformations: theory and applications: IUTAM Symposium, Hannover, Germany, [D Besdo; Erwin Stein; International Union of . Providing a basic foundation for advanced graduate study and research in the mechanics of solids, this treatise develops systematically the fundamentals of finite inelastic deformations of heterogeneous materials. The book combines the mathematical precision of solid mechanics with the physics-based micro-structural knowledge of materials science, presenting a coherent picture of finite 4/5(1).

A THEOREM IN THE THEORY OF FINITE ELASTIC DEFORMATIONS [R.S. RIVLIN] on *FREE* shipping on qualifying offers. A THEOREM IN THE THEORY OF FINITE ELASTIC Author: R.S. RIVLIN. () Finite Deformation Analysis of Inelastic Materials with Micro-Structure. In: Besdo D., Stein E. (eds) Finite Inelastic Deformations — Theory and Applications. International Union of Cited by: Providing a basic foundation for advanced graduate study and research in the mechanics of solids, this treatise contains a systematic development of the fundamentals of finite inelastic deformations of heterogeneous by: Theory of Finite Deformations of Porous Solids M. A. BIOT Communicated by G. TEMPLE 1. Introduction. The linear mechanics of fluid-saturated porous media as developed by the author was reviewed and discussed in detail in two earlier papers [l], [2]. In its final form it is based on the linear thermodynamics of irreversible processes.

In continuum mechanics, the finite strain theory—also called large strain theory, or large deformation theory—deals with deformations in which strains and/or rotations are large enough to invalidate assumptions inherent in infinitesimal strain this case, the undeformed and deformed configurations of the continuum are significantly different, requiring a clear distinction between.   Providing a basic foundation for advanced graduate study and research in the mechanics of solids, this treatise develops systematically the fundamentals of finite inelastic deformations of heterogeneous materials. The book combines the mathematical precision of solid mechanics with the Price: $ Theory and Applications. Author: Y. B. Fu,R. W. Ogden; Publisher: Cambridge University Press ISBN: Category: Mathematics Page: View: DOWNLOAD NOW» Nonlinear elasticity is concerned with nonlinear effects associated with deformations of elastic bodies subjected to external forces or temperature variations. Deformation in continuum mechanics is the transformation of a body from a reference configuration to a current configuration. A configuration is a set containing the positions of all particles of the body. A deformation may be caused by external loads, body forces (such as gravity or electromagnetic forces), or changes in temperature, moisture content, or chemical reactions, etc.