Asymptotic form factor for spinodal decomposition in three-space
- 14 January 1991
- journal article
- Published by American Physical Society (APS) in Physical Review Letters
- Vol. 66 (2), 173-176
- https://doi.org/10.1103/physrevlett.66.173
Abstract
Exploiting the computational efficiency of the cell-dynamical-system modeling of spinodal decomposition, a large three-dimensional, critically quenched binary-alloy system was studied. The primary result is the conclusive determination of the time-asymptotic scaled form factor, which satisfies Porod’s law, Tomita’s sum rule, and the exponent inequality for the small-wave-number limit by Yeung.Keywords
This publication has 22 references indexed in Scilit:
- Multi-Time Scaling for Phase SeparationJournal of the Physics Society Japan, 1989
- Numerical simulation of models of ordering: scaling and growth lawsJournal of Applied Crystallography, 1988
- Scaling and the Small-Wave-Vector Limit of the Form Factor in Phase-Ordering DynamicsPhysical Review Letters, 1988
- Study of phase-separation dynamics by use of cell dynamical systems. II. Two-dimensional demonstrationsPhysical Review A, 1988
- Study of phase-separation dynamics by use of cell dynamical systems. I. ModelingPhysical Review A, 1988
- Computationally efficient modeling of ordering of quenched phasesPhysical Review Letters, 1987
- Statistical Properties of Random Interface SystemProgress of Theoretical Physics, 1986
- Sum Rules for Small Angle Scattering by Random InterfaceProgress of Theoretical Physics, 1984
- Statistical theory of nucleation, condensation and coagulationAdvances in Physics, 1976
- Theory for the Slowing Down of the Relaxation and Spinodal Decomposition of Binary MixturesPhysical Review Letters, 1974