种植平分模型的一致性阈值

Elchanan Mossel, Joe Neeman, A. Sly
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引用次数: 188

摘要

种植对分模型是一种随机图模型,该模型将节点划分为两个大小相等的社区,然后根据社区的隶属度随机添加边。在该模型中,我们建立了种植切分的渐近可恢复性的充分必要条件。当等分线是渐近可恢复时,给出了一种有效的算法。我们还证明了当且仅当每个节点与它的大多数邻居高概率地属于同一个群落时,种植平分是渐近可恢复的。我们的算法寻找种植平分在时间上几乎是线性运行的边的数量。它有三个阶段:光谱聚类计算初始猜测,“复制”阶段使几乎每个顶点都正确,然后进行一些简单的局部移动来完成工作。Abbe, Bandeira和Hall的一项独立研究建立了类似的(稍弱的)结果,但仅在pn, qn = Θ(log n /n)的稀疏情况下。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Consistency Thresholds for the Planted Bisection Model
The planted bisection model is a random graph model in which the nodes are divided into two equal-sized communities and then edges are added randomly in a way that depends on the community membership. We establish necessary and sufficient conditions for the asymptotic recoverability of the planted bisection in this model. When the bisection is asymptotically recoverable, we give an efficient algorithm that successfully recovers it. We also show that the planted bisection is recoverable asymptotically if and only if with high probability every node belongs to the same community as the majority of its neighbors. Our algorithm for finding the planted bisection runs in time almost linear in the number of edges. It has three stages: spectral clustering to compute an initial guess, a "replica" stage to get almost every vertex correct, and then some simple local moves to finish the job. An independent work by Abbe, Bandeira, and Hall establishes similar (slightly weaker) results but only in the sparse case where pn, qn = Θ(log n /n).
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