R. Ghez, G.S. Oehrlein, et al.
Applied Physics Letters
We show that concentration-dependent diffusivities that enter Fick's laws can be derived from random-walk models of diffusion. In particular, Darken's phenomenological expression for that dependence results if the transition frequencies depend on the occupation of final states. We develop the one-dimensional discrete-to-continuum passage with some care, and, in particular, we show that fluxes must be defined at the midpoint between lattice sites, even for nonlinear problems.© 1986, American Association of Physics Teachers. All rights reserved.
R. Ghez, G.S. Oehrlein, et al.
Applied Physics Letters
W.E. Langlois, K.M. Kim
AJTEC 1986
Hyung Mann Lee, Ki-Jun Lee, et al.
Journal of Crystal Growth
W.E. Langlois
Comput. Methods Appl. Mech. Eng.