中文

A Cellular Automaton Model for Diffusive and Dissipative Systems

凝聚态物理 2009-10-22 v2

摘要

We study a cellular automaton model, which allows diffusion of energy (or equivalently any other physical quantities such as mass of a particular compound) at every lattice site after each timestep. Unit amount of energy is randomly added onto a site. Whenever the local energy content of a site reaches a fixed threshold Ec1E_{c1}, energy will be dissipated. Dissipation of energy propagates to the neighboring sites provided that the energy contents of those sites are greater than or equal to another fixed threshold Ec2(Ec1)E_{c2} (\leq E_{c1}). Under such dynamics, the system evolves into three different types of states depending on the values of Ec1E_{c1} and Ec2E_{c2} as reflected in their dissipation size distributions, namely: localized peaks, power laws, or exponential laws. This model is able to describe the behaviors of various physical systems including the statistics of burst sizes and burst rates in type-I X-ray bursters. Comparisons between our model and the famous forest-fire model (FFM) are made.

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引用

@article{arxiv.cond-mat/9410007,
  title  = {A Cellular Automaton Model for Diffusive and Dissipative Systems},
  author = {T. C. Chan and H. F. Chau and K. S. Cheng},
  journal= {arXiv preprint arXiv:cond-mat/9410007},
  year   = {2009}
}

备注

in REVTEX 3.0. Figures available on request. Extensively revised. Accepted by Phys.Rev.E