Longest Path Problems on Ptolemaic Graphs
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概要
- 論文の詳細を見る
Longest path problem is a problem for finding a longest path in a given graph. While the graph classes in which the Hamiltonian path problem can be solved efficiently are widely investigated, there are few known graph classes such that the longest path problem can be solved efficiently. Polynomial time algorithms for finding a longest cycle and a longest path in a Ptolemaic graph are proposed. Ptolemaic graphs are the graphs that satisfy the Ptolemy inequality, and they are the intersection of chordal graphs and distance-hereditary graphs. The algorithms use the dynamic programming technique on a laminar structure of cliques, which is a recent characterization of Ptolemaic graphs.
- 電子情報通信学会の論文
- 2008-02-01
著者
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Uehara Ryuhei
Japan Advanced Inst. Sci. And Technol. Nomi‐shi Jpn
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Uehara Ryuhei
School Of Information Science Jaist
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TERAMOTO Sachio
School of Information Science, JAIST
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TAKAHARA Yoshihiro
School of Information Science, JAIST
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Takahara Yoshihiro
School Of Information Science Jaist
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Teramoto Sachio
School Of Information Science Jaist
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UEHARA Ryuhei
School of Information Science
関連論文
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- Longest Path Problems on Ptolemaic Graphs
- FOREWORD
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- Voronoi Game on a Path
- Hardness results and an exact exponential algorithm for the spanning tree congestion problem (コンピュテーション)
- NP-completeness of generalized Kaboozle
- Reconstruction Algorithms for Permutation Graphs and Distance-Hereditary Graphs
- Computational Complexity of Piano-Hinged Dissections
- Reconstruction Algorithms for Permutation Graphs and Distance-Hereditary Graphs