具有局部过渡矩阵的概率蜂窝自动机:同步、遍历性和推理

Erhan Bayrakta, Fei Lu, Mauro Maggioni, Ruoyu Wu, Sichen Yang
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引用次数: 0

摘要

我们介绍了一类新的概率蜂窝自动机,它能够展示丰富的动力学特性,如同步性和遍历性,并且可以很容易地从数据中推断出来。该系统是环形图上的有限状态局部交互马尔可夫链。每个站点的后续状态都是随机的,其分布由其邻域的经验分布乘以局部转换矩阵决定。我们还引入了新的最小二乘估计器,用于从各种类型的数据中推断局部过渡矩阵,这些数据可能由多个轨迹、长轨迹或无轨迹信息的集合序列组成。在合适的可识别性条件下,我们证明了这些估计器的渐近正态性,并为其精度提供了非渐近边界。
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Probabilistic cellular automata with local transition matrices: synchronization, ergodicity, and inference
We introduce a new class of probabilistic cellular automata that are capable of exhibiting rich dynamics such as synchronization and ergodicity and can be easily inferred from data. The system is a finite-state locally interacting Markov chain on a circular graph. Each site's subsequent state is random, with a distribution determined by its neighborhood's empirical distribution multiplied by a local transition matrix. We establish sufficient and necessary conditions on the local transition matrix for synchronization and ergodicity. Also, we introduce novel least squares estimators for inferring the local transition matrix from various types of data, which may consist of either multiple trajectories, a long trajectory, or ensemble sequences without trajectory information. Under suitable identifiability conditions, we show the asymptotic normality of these estimators and provide non-asymptotic bounds for their accuracy.
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