Characterization and stability of two-phase piecewise-homogeneous deformations. / Fu, Y. B.; Freidin, A. B.
In: Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences, Vol. 460, No. 2051, 08.11.2004, p. 3065-3094.Research output: Contribution to journal › Review article › peer-review
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TY - JOUR
T1 - Characterization and stability of two-phase piecewise-homogeneous deformations
AU - Fu, Y. B.
AU - Freidin, A. B.
PY - 2004/11/8
Y1 - 2004/11/8
N2 - Many solid materials exhibit stress-induced phase transformations. Such phenomena can be modelled with the aid of the nonlinear elasticity theory with appropriate choices of the strain-energy function. It is known that if a two-phase deformation (with gradient F) in a finite elastic body is a local energy minimizer, then given any point p of the surface of discontinuity, the piecewise-homogeneous deformation corresponding to the two values F ±(p) of F(p) is a global energy minimizer. Thus, instability of the latter state would imply instability of the former state. In this paper we investigate the stability properties of such piecewise-homogeneous deformations. More precisely, we are concerned with two joined half-spaces that correspond to two different phases of the same material. We first show how such a two-phase deformation can be constructed. Then the stability of the piecewise-homogeneous deformation is investigated with the aid of two test criteria. One is a kinetic stability criterion based on a quasi-static approach and on the growth/decay behaviour of the interface in the undeformed configuration when it is perturbed; the other, referred to as the energy criterion, is used to determine whether the deformation is a minimizer of the total energy with respect to perturbations of the interface in both the current and undeformed configurations. We clarify the differences between the two criteria, and provide a compact formula which can be used to establish the stability/instability of any two-phase piecewise-homogeneous deformations.
AB - Many solid materials exhibit stress-induced phase transformations. Such phenomena can be modelled with the aid of the nonlinear elasticity theory with appropriate choices of the strain-energy function. It is known that if a two-phase deformation (with gradient F) in a finite elastic body is a local energy minimizer, then given any point p of the surface of discontinuity, the piecewise-homogeneous deformation corresponding to the two values F ±(p) of F(p) is a global energy minimizer. Thus, instability of the latter state would imply instability of the former state. In this paper we investigate the stability properties of such piecewise-homogeneous deformations. More precisely, we are concerned with two joined half-spaces that correspond to two different phases of the same material. We first show how such a two-phase deformation can be constructed. Then the stability of the piecewise-homogeneous deformation is investigated with the aid of two test criteria. One is a kinetic stability criterion based on a quasi-static approach and on the growth/decay behaviour of the interface in the undeformed configuration when it is perturbed; the other, referred to as the energy criterion, is used to determine whether the deformation is a minimizer of the total energy with respect to perturbations of the interface in both the current and undeformed configurations. We clarify the differences between the two criteria, and provide a compact formula which can be used to establish the stability/instability of any two-phase piecewise-homogeneous deformations.
KW - Interfacial instability
KW - Phase transformation
KW - Stability
UR - http://www.scopus.com/inward/record.url?scp=17144371835&partnerID=8YFLogxK
U2 - 10.1098/rspa.2004.1361
DO - 10.1098/rspa.2004.1361
M3 - Review article
AN - SCOPUS:17144371835
VL - 460
SP - 3065
EP - 3094
JO - PROC. R. SOC. - A.
JF - PROC. R. SOC. - A.
SN - 0950-1207
IS - 2051
ER -
ID: 89705893