M. Bekos, G. D. Lozzo, Fabrizio Frati, Martin Gronemann, T. Mchedlidze, Chrysanthi N. Raftopoulou
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引用次数: 4
摘要
有向无环图(简称DAG)的页码是最小值$k$,对于该DAG具有拓扑顺序和其边的$k$ -着色,使得没有相同颜色的两条边交叉,即沿拓扑顺序有交替的端点。1999年,Heath和Pemmaraju推测对页码为$2$的dag的识别是np完全的,并证明对页码为$6$的dag的识别是np完全的[SIAM J. Computing, 1999]。Binucci等人最近通过证明对于每个$k\geq 3$,识别页码为$k$的DAGs是np完全的,从而加强了这一结果[SoCG 2019]。本文最终肯定地解决了Heath和Pemmaraju的猜想。特别地,我们的np完备性结果甚至适用于$st$ -平面图和面序集。
Recognizing DAGs with Page-Number 2 is NP-complete
The page-number of a directed acyclic graph (a DAG, for short) is the minimum $k$ for which the DAG has a topological order and a $k$-coloring of its edges such that no two edges of the same color cross, i.e., have alternating endpoints along the topological order. In 1999, Heath and Pemmaraju conjectured that the recognition of DAGs with page-number $2$ is NP-complete and proved that recognizing DAGs with page-number $6$ is NP-complete [SIAM J. Computing, 1999]. Binucci et al. recently strengthened this result by proving that recognizing DAGs with page-number $k$ is NP-complete, for every $k\geq 3$ [SoCG 2019]. In this paper, we finally resolve Heath and Pemmaraju's conjecture in the affirmative. In particular, our NP-completeness result holds even for $st$-planar graphs and planar posets.
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