The Distribution of Second Degrees in the Buckley–Osthus Random Graph Model

Q3 Mathematics
A. Kupavskii, L. Ostroumova, D. Shabanov, P. Tetali
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引用次数: 4

Abstract

In this article we consider a well-known generalization of the Barabási and Albert preferential attachment model—the Buckley–Osthus model. Buckley and Osthus proved that in this model, the degree sequence has a power law distribution. As a natural (and arguably more interesting) next step, we study the second degrees of vertices. Roughly speaking, the second degree of a vertex is the number of vertices at distance two from the given vertex. The distribution of second degrees is of interest because it is a good approximation of PageRank, where the importance of a vertex is measured by taking into account the popularity of its neighbors. We prove that the second degrees also obey a power law. More precisely, we estimate the expectation of the number of vertices with the second degree greater than or equal to k and prove the concentration of this random variable around its expectation using the now-famous Talagrand's concentration inequality over product spaces. As far as we know, this is the only application of Talagrand's inequality to random web graphs where the (preferential attachment) edges are not defined over a product distribution, making the application nontrivial and requiring a certain degree of novelty.
Buckley-Osthus随机图模型的二次分布
在本文中,我们考虑了Barabási和Albert优先依恋模型的一个众所周知的推广- Buckley-Osthus模型。Buckley和Osthus证明了在该模型中,度序列呈幂律分布。作为一个自然的(也可以说是更有趣的)下一步,我们研究顶点的二次度。粗略地说,顶点的二次度是距离给定顶点2的顶点数。第二度的分布很有趣,因为它很好地近似于PageRank,在PageRank中,顶点的重要性是通过考虑其邻居的受欢迎程度来衡量的。我们证明了二阶也服从幂律。更准确地说,我们估计了二阶大于或等于k的顶点数的期望,并使用现在著名的塔拉格兰集中不等式在乘积空间上证明了这个随机变量在其期望周围的集中。据我们所知,这是Talagrand不等式在随机网络图上的唯一应用,其中(优先附加)边在乘积分布上没有定义,使得应用不平凡并且需要一定程度的新颖性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
Internet Mathematics
Internet Mathematics Mathematics-Applied Mathematics
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