Unified Constitutive Laws of Plastic Deformation
Editat de A. S. Krausz, K. Krauszen Limba Engleză Hardback – 30 mai 1996
- Describes the theory and applications of the constitutive law of plastic deformation for materials testing
- Examines the constitutive law of plastic deformation as it applies to process and product design
- Includes a program on disk for the determination and development of the constitutive law of plastic deformation
- Considers economical design and testing methods
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Specificații
ISBN-13: 9780124259706
ISBN-10: 0124259707
Pagini: 463
Dimensiuni: 152 x 229 x 28 mm
Greutate: 0.78 kg
Editura: ELSEVIER SCIENCE
ISBN-10: 0124259707
Pagini: 463
Dimensiuni: 152 x 229 x 28 mm
Greutate: 0.78 kg
Editura: ELSEVIER SCIENCE
Public țintă
The audience for this book includes materials researchers involved in processing, manufacturing, and design studies; test engineers; university, institutional, and industrial libraries; and graduate students in materials science, mechanical, and industrial engineering, especially in materials, manufacturing, and design courses.Cuprins
J.L. Chaboche, Unified Cyclic Viscoplastic Constitutive Equations: Development, Capabilities, and Thermodynamic Framework. Y. Estrin, Dislocation-DensityRelated Constitutive Modeling. R.W. Evans and B. Wilshire, Constitutive Laws for High-Temperature Creep and Creep Fracture. G.A. Henshall, D.E. Helling, and A.K. Miller, Improvements in the MATMOD Equations for Modeling Solute Effects and Yield-Surface Distortions. A.S. Krausz and K. Krausz,The Constitutive Law of Deformation Kinetics. E. Krempl, A Small-Strain Viscoplasticity Theory Based on Overstress. J. Ning and E.C. Aifantis, Anisotropic and Inhomogenous Plastic Deformation of Polycrystalline Solids. S.V. Raj, I.S. Iskowitz, and A.D. Freed, Modeling the Role of Dislocation Substructure During Class M and Exponential Creep. K. Krausz and A.S. Krausz, Comments and Summary. Subject Index.