Glauber dynamics for the mean-field Ising model: cut-off, critical power law, and metastability

Levin DA; Luczak MJ; Peres Y

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Glauber dynamics for the mean-field Ising model: cut-off, critical power law, and metastability

机译：平均场Ising模型的Glauber动力学：截止，临界功率定律和亚稳

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We study the Glauber dynamics for the Ising model on the complete graph, also known as the Curie-Weiss Model. For beta < 1, we prove that the dynamics exhibits a cut-off: the distance to stationarity drops from near 1 to near 0 in a window of order n centered at [2(1 - beta)](-1)n log n. For beta = 1, we prove that the mixing time is of order n(3/2). For beta > 1, we study metastability. In particular, we show that the Glauber dynamics restricted to states of non-negative magnetization has mixing time O(n log n).

机译：我们在完整图（也称为居里-魏斯模型）上研究Ising模型的Glauber动力学。对于beta <1，我们证明了动力学表现出一个截止值：平稳性的距离在以[2（1-beta）]（-1）n log n为中心的n阶窗口中从接近1降低到接近0。。对于beta = 1，我们证明了混合时间约为n（3/2）。对于beta> 1，我们研究亚稳态。特别是，我们证明了限于非负磁化状态的Glauber动力学具有混合时间O（n log n）。

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《Probability Theory and Related Fields》 |2010年第2期|共43页
作者
Levin DA; Luczak MJ; Peres Y;
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正文语种 eng
中图分类概率论与数理统计;
关键词
Markov chains; Ising model; Curie-Weiss model; Mixing time; Cut-off; Coupling; Glauber dynamics; Metastability; Heat-bath dynamics; Mean-field model;

机译：马尔可夫链;伊辛模型;居里-魏斯模型;混合时间;切断;耦合;Glauber动力学;熔体性;热浴动力学;平均场模型;

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机译：平均场Ising模型的Glauber动力学：截止，临界幂律和亚稳态

Glauber dynamics for the mean-field Ising model: cut-off, critical power law, and metastability

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