噪声选民模型的热化和趋于平衡

Enzo Aljovin, Milton Jara, Yangrui Xiang
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引用次数: 0

摘要

我们研究了在有 n 个顶点的完整图中演化的噪声选民模型向均衡收敛的问题。噪声投票者模型是投票者模型的反转,在该模型中,个体会因外部噪声而随机改变自己的观点。具体来说,我们确定了收敛曲线的康托洛维奇距离(也称为 1-Wasserstein 距离),它对应于赖特-费舍扩散的边际与其静态度量之间的康托洛维奇距离。我们特别证明,该模型在自然噪声强度条件下不会出现截断现象。此外,我们还研究了模型遗忘粒子初始位置所需的时间,我们将其解释为粒子处于固定初始位置时模型规律与均匀随机选择位置时模型规律之间的康托洛维奇距离。我们的方法依赖于斯坦因方法和 PDE 理论的分析工具,这些工具对于马尔可夫链观测值的定量研究可能具有独立的意义。
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Thermalization And Convergence To Equilibrium Of The Noisy Voter Model
We investigate the convergence towards equilibrium of the noisy voter model, evolving in the complete graph with n vertices. The noisy voter model is a version of the voter model, on which individuals change their opinions randomly due to external noise. Specifically, we determine the profile of convergence, in Kantorovich distance (also known as 1-Wasserstein distance), which corresponds to the Kantorovich distance between the marginals of a Wright-Fisher diffusion and its stationary measure. In particular, we demonstrate that the model does not exhibit cut-off under natural noise intensity conditions. In addition, we study the time the model needs to forget the initial location of particles, which we interpret as the Kantorovich distance between the laws of the model with particles in fixed initial positions and in positions chosen uniformly at random. We call this process thermalization and we show that thermalization does exhibit a cut-off profile. Our approach relies on Stein's method and analytical tools from PDE theory, which may be of independent interest for the quantitative study of observables of Markov chains.
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