Sparse graphs with local covering conditions on edges

Debsoumya Chakraborti, Amirali Madani, Anil Maheshwari, Babak Miraftab
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Abstract

In 1988, Erd\H{o}s suggested the question of minimizing the number of edges in a connected $n$-vertex graph where every edge is contained in a triangle. Shortly after, Catlin, Grossman, Hobbs, and Lai resolved this in a stronger form. In this paper, we study a natural generalization of the question of Erd\H{o}s in which we replace `triangle' with `clique of order $k$' for ${k\ge 3}$. We completely resolve this generalized question with the characterization of all extremal graphs. Motivated by applications in data science, we also study another generalization of the question of Erd\H{o}s where every edge is required to be in at least $\ell$ triangles for $\ell\ge 2$ instead of only one triangle. We completely resolve this problem for $\ell = 2$.
具有边局部覆盖条件的稀疏图
1988 年,埃尔德{H{o}斯提出了这样一个问题:在一个连通的 $n$ 顶点图中,每条边都包含在一个三角形中,如何最小化图中的边数?在本文中,我们研究了埃尔德{H{o}s}问题的自然广义化,其中我们将 "三角形 "替换为${k\ge3}$的 "阶$k$的clique"。我们用所有极值图的特征描述彻底解决了这个广义问题。受数据科学应用的启发,我们还研究了 Erd\H{o}s 问题的另一个广义问题,即对于 $\ell\ge 2$,要求每条边至少在 $\ell$ 三角形中,而不是只有一个三角形。我们完全解决了 $\ell = 2$ 的这个问题。
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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