Phase Field Computations (Caginalp and Socolovsky)

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SIAM Journal on Scientific Computing
Volume 15-1, January 1994, pp.  106-126
(C) 1994 by Society for Industrial and Applied Mathematics
All rights reserved


Title:            Phase Field Computations of Single-Needle Crystals,
                  Crystal Growth, and Motion by Mean Curvature

Author:           G. Caginalp and E. Socolovsky

AMS Subject
Classifications:  65M06, 82B24, 35K57

Key words:        phase field, interface, viscosity methods, 
                  solidification, computation of free boundaries

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ABSTRACT

The phase field model for free boundaries consists of a system
of parabolic differential equations in which the variables represent 
a phase (or "order") parameter and temperature, respectively.  The 
parameters in the equations are related directly to the physical 
observables including the interfacial width $\epsilon$, which we can 
regard as a free parameter in computation.  The phase field equations 
can be used to compute a wide range of sharp interface problems 
including the classical Stefan model, its modification to incorporate 
surface-tension and/or surface kinetic terms, the Cahn--Allen motion 
by mean curvature, the Hele--Shaw model, etc.  Also included is 
anisotropy in the equilibrium and dynamical forms generally considered 
by materials scientists.  By adjusting the parameters, the 
computations can be varied continuously from single-needle dendritic 
to faceted crystals.

The computational method consists of smoothing a sharp interface
problem within the scaling of distinguished limits of the phase field
equations that preserve the physically important parameters.  The
two-dimensional calculations indicate that this efficient method for
treating these stiff problems results in very accurate interface
determination without interface tracking.  These methods
are tested against exact and analytical results available in planar 
waves, faceted growth, and motion by mean curvature up to extinction 
time.

The results obtained for the single-needle crystal show a constant
velocity growth, as expected from laboratory experiments.


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