說明 
1 online resource (xv, 242 pages) : digital, PDF file(s) 

text txt rdacontent 

computer c rdamedia 

online resource cr rdacarrier 
附註 
Title from publisher's bibliographic system (viewed on 05 Oct 2015) 

1. Introduction  2. Twowell potentials, governing equations and energetics  3. Equilibrium phase mixtures and quasistatic processes  4. Impactinduced transitions in twophase elastic materials  5. Multiplewell free energy potentials  6. The continuum theory of driving force  7. Thermoelastic materials  8. Kinetics and nucleation  9. Models for twophase thermoelastic materials in one dimension  10. Quasistatic hysteresis in twophase thermoelastic tensile bars  11. Dynamics of phase transitions in uniaxially strained thermoelastic solids  12. Statics : geometric compatibility  13. Dynamics : impactinduced transition in a CuAINi single crystal  14. Quasistatics : kinetics of martensitic twinning 

This 2006 work began with the author's exploration of the applicability of the finite deformation theory of elasticity when various standard assumptions such as convexity of various energies or ellipticity of the field equations of equilibrium are relinquished. The finite deformation theory of elasticity turns out to be a natural vehicle for the study of phase transitions in solids where thermal effects can be neglected. This text will be of interest to those interested in the development and application of continuummechanical models that describe the macroscopic response of materials capable of undergoing stress or temperatureinduced transitions between two solid phases. The focus is on the evolution of phase transitions which may be either dynamic or quasistatic, controlled by a kinetic relation which in the framework of classical thermomechanics represents information that is supplementary to the usual balance principles and constitutive laws of conventional theory 

TAEBDC; 2009 
鏈接 
Print version: 9780521661478

主題 
Phase transformations (Statistical physics)


Continuum mechanics


Kinetic theory of matter

Alt Author 
Knowles, James K. (James Kenyon), 1931 author

