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Growth and Scaling in Anisotropic Spinodal Decomposition

arXiv:cond-mat/0209314 · doi:10.1209/epl/i2002-00153-2

Abstract

We studied phase separation in a particle interacting system under a large drive along x. We here identify the basic growth mechanisms, and demonstrate time self-similarity, finite-size scaling, as well as other interesting features of both the structure factor and the scaling function. We also show that, at late t in two dimensions, there is a unique t-dependent length increasing l_y(t) \sim t^{1/3} for macroscopic systems. Our results, which follow as a direct consequence of the underlying anisotropy, may characterize a class of nonequilibrium situations.

7 pages, 3 figures