Δ-wavy probability distributions and Potts model

IF 0.5 Q3 MATHEMATICS
Udrea Păun
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引用次数: 2

Abstract

We define the wavy probability distributions on a subset and Δ-wavy probability distributions - two generalizations of the wavy probability distributions. A classification on the Δ-waviness is given. For the Δ-wavy probability distributions having normalization constant, we give a formula for this constant, to compute this constant. We show that the Potts model is a Δ-wavy probability distribution, where Δ is a partition which will be specified. For the normalization constant of Potts model, we give formulas and bounds. As to the formulas for this constant, we give two general formulas, one of them is simple while the other is more complicated, and based on independent sets, a formula for the Potts model on connected separable graphs - closed-form expressions are then obtained in several cases -, and a formula for the Potts model on graphs with a vertex of degree 2 - a recurrence relation is then obtained for the normalization constant of Potts model on Cn; the cycle graph with n vertices; the normalization constant of Ising model on Cn is computed using this relation. As to the bounds for the normalization constant, we present two ways to obtain such bounds; we illustrate these ways giving a general lower bound, and a lower bound and an upper one when the model is the Potts model on Gn,n, the square grid graph, n = 6k, k ≥ 1 - two upper bounds for the free energy per site of this model are then obtained, one of them being in the limit. A sampling method for the Δ-wavy probability distributions is given and, as a result, a sampling method for the Potts is given. This method - that for the Potts model too - has two steps, Step 1 and Step 2, when |Δ| > 1 and one step, Step 2 only, when |Δ| = 1. For the Potts model, Step 1 is, in general, difficult. As to Step 2, for the Potts model too, using the Gibbs sampler in a generalized sense, we obtain an exact (not approximate) sampling method having p + 1 steps (p + 1 substeps of Step 2), where p = |I|; I is an independent set, best, a maximum independent set, best, a maximum independent set - for the Potts model on Gn1,n2,…,nd , the d-dimensional grid graph, d ≥ 1, n1, n2,…, nd ≥ 1, n1n2·…·nd ≥ 2; we obtain an exact sampling method for half or half+1 vertices.
Δ-wavy概率分布和波茨模型
我们定义了一个子集上的波状概率分布和Δ-wavy概率分布-波状概率分布的两种推广。在Δ-waviness上给出了分类。对于具有归一化常数的Δ-wavy概率分布,我们给出这个常数的公式,来计算这个常数。我们证明Potts模型是一个Δ-wavy概率分布,其中Δ是一个将被指定的分区。对于Potts模型的归一化常数,给出了公式和界。对于这个常数的表达式,我们给出了两个简单而复杂的一般公式,并在独立集的基础上,得到了连通可分离图上的Potts模型的一个公式——在几种情况下得到了封闭形式的表达式——和顶点为2次的图上的Potts模型的一个公式——在Cn上的Potts模型的归一化常数的递推关系;n个顶点的循环图;利用此关系式计算了Cn上Ising模型的归一化常数。对于归一化常数的边界,我们给出了两种方法来求得这样的边界;我们给出了这些方法的一般下界,以及当模型是Gn,n,方形网格图,n = 6k, k≥1的Potts模型时的下界和上界,然后得到了该模型的每个位置的自由能的两个上界,其中一个是极限。给出了Δ-wavy概率分布的抽样方法,从而给出了波茨的抽样方法。当|Δ| > 1时,这个方法也适用于Potts模型,它有两个步骤,即步骤1和步骤2;当|Δ| = 1时,只有一个步骤,即步骤2。对于Potts模型,步骤1通常是困难的。对于步骤2,对于Potts模型,使用广义的Gibbs采样器,我们得到了具有p + 1个步骤(步骤2的p + 1个子步骤)的精确(而不是近似)采样方法,其中p = |I|;I是独立集,best,最大独立集,best,最大独立集-对于Potts模型在Gn1,n2,…,nd上的d维网格图,d≥1,n1,n2,…,nd≥1,n1n2·…·nd≥2;我们得到了半顶点或半+1顶点的精确采样方法。
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来源期刊
CiteScore
1.10
自引率
10.00%
发文量
18
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