异构随机图的树深和树宽

Pub Date : 2022-11-11 DOI:10.3792/pjaa.98.015

Y. Shang

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引用次数: 2

摘要

在这篇文章中，我们研究了一个异构随机图的树深度和树宽度，该图是通过以概率p n ð e ij Þ独立包含K n / n个顶点的完全图的每个边e ij ð i 6¼j Þ获得的。当边缘概率序列满足一定的密度假设时，我们证明了树深和树宽都具有高概率的线性大小。此外，我们将该方法推广到具有不同边权的随机加权图中，并捕获了加权树深度有一个常数有界的高概率条件。

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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On the tree-depth and tree-width in heterogeneous random graphs

: In this note, we investigate the tree-depth and tree-width in a heterogeneous random graph obtained by including each edge e ij ð i 6¼ j Þ of a complete graph K n over n vertices independently with probability p n ð e ij Þ . When the sequence of edge probabilities satisﬁes some density assumptions, we show both tree-depth and tree-width are of linear size with high probability. Moreover, we extend the method to random weighted graphs with non-identical edge weights and capture the conditions under which with high probability the weighted tree-depth is bounded by a constant.

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