Cell Dynamical Approach to the Ordering Process of the Three-Dimensional Heisenberg System
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概要
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The ordering process of the quenched time-dependent Ginzburg-Landau model forthe three-component nonconserved order-parameter in the three-dimensional systemis numerically investigated. The form factor is found to obey a dynamical scaling lawwith a characteristic length growing as t"'. The density of topological defects and theenergy density exhibit a power decay that is consistent with the scaling of the form fac-for. The interaction of the defects is briefly discussed.[ordering process, quenched system, dynamical scaling, topological defect, pair lj annihilation, computer simulationl
- 社団法人日本物理学会の論文
- 1991-04-15
著者
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TOYOKI Hiroyasu
Department of Applied Physics,Faculty of Engineering,Nagoya University
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Toyoki Hiroyasu
Department Of Physics Faculty Of Education And Liberal Arts Yamanashi University
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- Vortex Dynamics in the Ordering Process of the Three-Dimensional Planar System
- FORMATION AND DYNAMICS OF BOOJUMS IN THE THIN LAYERS OF NEMATICS WITH HYBRID BOUNDARY CONDITIONS(Session IV : Structures & Patterns, The 1st Tohwa University International Meeting on Statistical Physics Theories, Experiments and Computer Simulations)
- Cell Dynamical Approach to the Ordering Process of the Three-Dimensional Heisenberg System
- A Theory of Fractal Dimensionality for Generalized Diffusion-Limited Aggregation