| Item type |
SIG Technical Reports(1) |
| 公開日 |
2024-01-13 |
| タイトル |
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タイトル |
Shortest Path Reconfiguration with Relaxed Constraints |
| タイトル |
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言語 |
en |
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タイトル |
Shortest Path Reconfiguration with Relaxed Constraints |
| 言語 |
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言語 |
eng |
| 資源タイプ |
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資源タイプ識別子 |
http://purl.org/coar/resource_type/c_18gh |
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資源タイプ |
technical report |
| 著者所属 |
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Graduate School of Information Sciences, Tohoku University |
| 著者所属 |
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Graduate School of Information Sciences, Tohoku University |
| 著者所属 |
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Graduate School of Information Sciences, Tohoku University |
| 著者所属 |
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Graduate School of Information Sciences, Tohoku University |
| 著者所属(英) |
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en |
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Graduate School of Information Sciences, Tohoku University |
| 著者所属(英) |
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en |
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Graduate School of Information Sciences, Tohoku University |
| 著者所属(英) |
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en |
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Graduate School of Information Sciences, Tohoku University |
| 著者所属(英) |
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en |
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Graduate School of Information Sciences, Tohoku University |
| 著者名 |
Naoki, Domon
Akira, Suzuki
Yuma, Tamura
Xiao, Zhou
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| 著者名(英) |
Naoki, Domon
Akira, Suzuki
Yuma, Tamura
Xiao, Zhou
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| 論文抄録 |
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内容記述タイプ |
Other |
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内容記述 |
The shortest path problem is the most classical and fundamental problem in the field of graph algorithm. Recently, its reconfiguration variant, namely the Shortest Path Reconfiguration problem, has received a lot of attention. In this paper, we study the complexity of k-SPR, which generalizes the Shortest Path Reconfiguration problem, with respect to k. In k-SPR, we are allowed to replace at most k consecutive vertices of the current shortest path at a time. We first show that, for any fixed rational numbers c and ε such that c > 0 and 0 < ε ≦ 1, k-SPR with k = cn1-ε is polynomially solvable if ε = 1 and c < 1; otherwise, PSPACE-complete. This intractability holds even when given graphs are restricted to bipartite graphs and r-th power graphs, where r is any positive integer. Furthermore, when we restrict 0 < ε < 1, the PSPACE-completeness holds for graphs with maximum degree 3. Then, we design an FPT algorithm parameterized by μ = n/2 - k ≧ 0 that runs in O(m + 6.730μμ4n) time. Finally, we show that, for any k, k-SPR can be solved in linear time for K2,3-minor-free graphs. |
| 論文抄録(英) |
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内容記述タイプ |
Other |
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内容記述 |
The shortest path problem is the most classical and fundamental problem in the field of graph algorithm. Recently, its reconfiguration variant, namely the Shortest Path Reconfiguration problem, has received a lot of attention. In this paper, we study the complexity of k-SPR, which generalizes the Shortest Path Reconfiguration problem, with respect to k. In k-SPR, we are allowed to replace at most k consecutive vertices of the current shortest path at a time. We first show that, for any fixed rational numbers c and ε such that c > 0 and 0 < ε ≦ 1, k-SPR with k = cn1-ε is polynomially solvable if ε = 1 and c < 1; otherwise, PSPACE-complete. This intractability holds even when given graphs are restricted to bipartite graphs and r-th power graphs, where r is any positive integer. Furthermore, when we restrict 0 < ε < 1, the PSPACE-completeness holds for graphs with maximum degree 3. Then, we design an FPT algorithm parameterized by μ = n/2 - k ≧ 0 that runs in O(m + 6.730μμ4n) time. Finally, we show that, for any k, k-SPR can be solved in linear time for K2,3-minor-free graphs. |
| 書誌レコードID |
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収録物識別子タイプ |
NCID |
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収録物識別子 |
AN1009593X |
| 書誌情報 |
研究報告アルゴリズム(AL)
巻 2024-AL-196,
号 6,
p. 1-7,
発行日 2024-01-13
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| ISSN |
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収録物識別子タイプ |
ISSN |
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収録物識別子 |
2188-8566 |
| Notice |
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SIG Technical Reports are nonrefereed and hence may later appear in any journals, conferences, symposia, etc. |
| 出版者 |
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言語 |
ja |
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出版者 |
情報処理学会 |
IPSJ-AL24196006.pdf (939.1 kB)
