弱多重渗流

G. Baxter, R. da Costa, S. N. Dorogovtsev, J. Mendes
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引用次数: 3

摘要

在许多由相互作用的子系统组成的系统中,元素之间复杂的相互作用可以用多层网络来表示。然而,渗透是理解连通性和鲁棒性的关键,它不能简单地推广到多个层。这个元素描述了渗透到多层网络的概括:弱多重渗透。如果节点在每层中至少有一个邻居在该组件中,则该节点属于该连接组件。作者对这一过程的关键现象进行了全面的描述。在二阶矩有限的两层度分布中,我们观察到一个不寻常的连续过渡,并在阈值以上出现二次增长。当二阶矩发散时,奇点由度分布的渐近性决定,从而产生一组丰富的临界行为。在三层或多层中,作者发现了一个不连续的混合跃迁,即使在高度不均匀的度分布中也持续存在,只有当幂律指数达到$1+1/(M-1)$时才成为连续的。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Weak Multiplex Percolation
In many systems consisting of interacting subsystems, the complex interactions between elements can be represented using multilayer networks. However percolation, key to understanding connectivity and robustness, is not trivially generalised to multiple layers. This Element describes a generalisation of percolation to multilayer networks: weak multiplex percolation. A node belongs to a connected component if at least one of its neighbours in each layer is in this component. The authors fully describe the critical phenomena of this process. In two layers with finite second moments of the degree distributions the authors observe an unusual continuous transition with quadratic growth above the threshold. When the second moments diverge, the singularity is determined by the asymptotics of the degree distributions, creating a rich set of critical behaviours. In three or more layers the authors find a discontinuous hybrid transition which persists even in highly heterogeneous degree distributions, becoming continuous only when the powerlaw exponent reaches $1+1/(M-1)$ for $M$ layers.
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