Crossing Number is NP-hard for Constant Path-width (and Tree-width)

arXiv - CS - Discrete Mathematics Pub Date : 2024-06-27 DOI:arxiv-2406.18933
Petr Hliněný, Liana Khazaliya
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Abstract

Crossing Number is a celebrated problem in graph drawing. It is known to be NP-complete since 1980s, and fairly involved techniques were already required to show its fixed-parameter tractability when parameterized by the vertex cover number. In this paper we prove that computing exactly the crossing number is NP-hard even for graphs of path-width 12 (and as a result, even of tree-width 9). Thus, while tree-width and path-width have been very successful tools in many graph algorithm scenarios, our result shows that general crossing number computations unlikely (under P!=NP) could be successfully tackled using bounded width of graph decompositions, which has been a 'tantalizing open problem' [S. Cabello, Hardness of Approximation for Crossing Number, 2013] till now.
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对于恒定路径宽度(和树宽),交叉数是 NP 难题
交叉数是图形绘制中的一个著名问题。早在 20 世纪 80 年代,人们就知道它是 NP-完全的,并且已经需要相当复杂的技术来证明它在以顶点盖数为参数时的固定参数可操作性。在本文中,我们证明了即使对于路径宽度为 12 的图(因此,即使是树宽为 9 的图),精确计算交叉数也是 NP 难的。因此,虽然树宽和路径宽在许多图算法场景中都是非常成功的工具,但我们的结果表明,一般的交叉数计算(在 P!=NP 条件下)不可能使用图分解的有界宽度来成功解决,而这一直是一个 "诱人的开放问题"[S.Cabello, Hardness of Approximation for Crossing Number, 2013]。
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arXiv - CS - Discrete Mathematics
arXiv - CS - Discrete Mathematics
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