In this paper, we consider the problem of designing cut sparsifiers and sketches for directed graphs. To bypass known lower bounds, we allow the sparsifier/sketch to depend on the balance of the input graph, which smoothly interpolates between undirected and directed graphs. We give nearly matching upper and lower bounds for both for-all (cf. Bencz\'ur and Karger, STOC 1996) and for-each (Andoni et al., ITCS 2016) cut sparsifiers/sketches as a function of cut balance, defined the maximum ratio of the cut value in the two directions of a directed graph (Ene et al., STOC 2016). We also show an interesting application of digraph sparsification via cut balance by using it to give a very short proof of a celebrated maximum flow result of Karger and Levine (STOC 2002).
翻译:在本文中,我们考虑设计定向图案的剪切封闭器和草图的问题。为了绕过已知的下限,我们允许封闭器/伸缩器依赖输入图的平衡,该图在未定向图和定向图之间顺利地相互交错。我们给所有(参见Bencz\'ur和Karger,STOC,1996年)和每个(Antoni等人,ITS,2016年)和剪切口器/刀片几乎匹配的上下限界限,作为削减平衡的函数,确定了定向图(Ene等人,STOC,2016年)两个方向的削减值的最大比率。我们还展示了通过截断平衡进行分解的令人感兴趣的应用,即用它来为Karger和Levine(STOC,2002年)的已知最大流动结果提供非常简短的证据。
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