块结构网络上具有跳跃的平均场模型的混沌传播和大偏差

Pub Date : 2020-12-04 DOI:10.1017/apr.2023.7
D. Dawson, Ahmed Sid-Ali, Yiqiang Q. Zhao
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引用次数: 2

摘要

分析了一个相互作用的多类有限状态跳跃过程系统。所考虑的模型由具有动态变化的多色节点的块结构网络组成。相互作用是局部的,并通过局部的经验测量来描述。考虑了两个级别的异构性:在块之间和块内,节点被标记为两种类型。中心节点是仅连接到来自同一块的节点的节点,而外围节点连接到来自相同块的节点和来自其他块的节点。研究了节点数趋于无穷大的系统的极限。特别地,在特定的正则性条件下,在多种群环境中建立了混沌的传播和大数定律。此外,还表明,随着节点数量的无穷大,系统的行为可以用McKean–Vlasov系统的解来表示。然后,我们证明了经验测度向量和经验过程的大偏差原理,这扩展了Dawson和Gärtner(Stochastics201987)以及Léonard(Ann.Inst.H.PincaréProb.Statist.311995)的经典结果。
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Propagation of chaos and large deviations in mean-field models with jumps on block-structured networks
A system of interacting multi-class finite-state jump processes is analyzed. The model under consideration consists of a block-structured network with dynamically changing multi-color nodes. The interactions are local and described through local empirical measures. Two levels of heterogeneity are considered: between and within the blocks where the nodes are labeled into two types. The central nodes are those connected only to nodes from the same block, whereas the peripheral nodes are connected to both nodes from the same block and nodes from other blocks. Limits of such systems as the number of nodes tends to infinity are investigated. In particular, under specific regularity conditions, propagation of chaos and the law of large numbers are established in a multi-population setting. Moreover, it is shown that, as the number of nodes goes to infinity, the behavior of the system can be represented by the solution of a McKean–Vlasov system. Then, we prove large deviations principles for the vectors of empirical measures and the empirical processes, which extends the classical results of Dawson and Gärtner (Stochastics20, 1987) and Léonard (Ann. Inst. H. Poincaré Prob. Statist.31, 1995).
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