Allen–Cahn equation

The Allen–Cahn equation (after John W. Cahn and Sam Allen) is a reaction-diffusion equation of mathematical physics which describes the process of phase separation in iron alloys, including order-disorder transitions.

The equation is given by:^[1]^[2]

${{\partial \eta}\over{\partial t}}=M_{\eta}[\epsilon^{2}_{\eta}\nabla^{2}\eta-f'(\eta)]$

where $M_{\eta}$ is the mobility, $f$ is the free energy density, and $\eta$ is the nonconserved order parameter.

It is the L2 gradient flow of the Ginzburg–Landau–Wilson Free Energy Functional. It is closely related to the Cahn–Hilliard equation. In one space-dimension, a very detailed account is given by a paper by Xinfu Chen.^[3]

References

↑ S. M. Allen and J. W. Cahn, "Ground State Structures in Ordered Binary Alloys with Second Neighbor Interactions," Acta Met. 20, 423 (1972).
↑ S. M. Allen and J. W. Cahn, "A Correction to the Ground State of FCC Binary Ordered Alloys with First and Second Neighbor Pairwise Interactions," Scripta Met. 7, 1261 (1973).
↑ X. Chen, "Generation, propagation, and annihilation of metastable patterns", J. Differential Equations 206, 399–437 (2004).

http://www.ctcms.nist.gov/~wcraig/variational/node10.html

S. M. Allen and J. W. Cahn, "Coherent and Incoherent Equilibria in Iron-Rich Iron-Aluminum Alloys," Acta Met. 23, 1017 (1975).

S. M. Allen and J. W. Cahn, "On Tricritical Points Resulting from the Intersection of Lines of Higher-Order Transitions with Spinodals," Scripta Met. 10, 451–454 (1976).

S. M. Allen and J. W. Cahn, "Mechanisms of Phase Transformation Within the Miscibility Gap of Fe-Rich Fe-Al Alloys," Acta Met. 24, 425–437 (1976).

J. W. Cahn and S. M. Allen, "A Microscopic Theory of Domain Wall Motion and Its Experimental Verification in Fe-Al Alloy Domain Growth Kinetics," J. de Physique 38, C7-51 (1977).

S. M. Allen and J. W. Cahn, "A Microscopic Theory for Antiphase Boundary Motion and Its Application to Antiphase Domain Coarsening," Acta Met.27, 1085–1095 (1979).

L. Bronsard & F. Reitich, On three-phase boundary motion and the singular limit of a vector valued Ginzburg–Landau equation, Arch. Rat. Mech. Anal. 124, 355–379 (1993).