| Item type |
Trans(1) |
| 公開日 |
2014-12-05 |
| タイトル |
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タイトル |
Parallel Tree Contraction with Fewer Types of Primitive Contraction Operations and Its Application to Trees of Unbounded Degree |
| タイトル |
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言語 |
en |
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タイトル |
Parallel Tree Contraction with Fewer Types of Primitive Contraction Operations and Its Application to Trees of Unbounded Degree |
| 言語 |
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言語 |
eng |
| キーワード |
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主題Scheme |
Other |
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主題 |
[通常論文] parallel tree contraction, rose tree, m-bridge decomposition |
| 資源タイプ |
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資源タイプ識別子 |
http://purl.org/coar/resource_type/c_6501 |
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資源タイプ |
journal article |
| 著者所属 |
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The University of Tokyo |
| 著者所属 |
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Kochi University of Technology |
| 著者所属(英) |
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en |
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The University of Tokyo |
| 著者所属(英) |
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en |
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Kochi University of Technology |
| 著者名 |
Akimasa, Morihata
Kiminori, Matsuzaki
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| 著者名(英) |
Akimasa, Morihata
Kiminori, Matsuzaki
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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 |
Parallel tree contraction is a well established method of parallel tree processing. There are efficient and useful algorithms for binary trees, including the Shunt contraction algorithm and one based on the m-bridge decomposition method. However, for trees of unbounded degree, there are few practical tree contraction algorithms. The standard approach is “binarization,” namely to translate the input tree to a full binary tree beforehand. To prevent the overhead introduced by binarization, we previously proposed the Rake-Shunt contraction algorithm (ICCS 2011), which is a generalization of the Shunt contraction algorithm to trees of unbounded degree. This paper further extends this result. The major contribution is to show that the Rake-Shunt contraction algorithm is a tree contraction algorithm that uses fewer types of primitive contraction operations if we assume the input tree has been binarized. This observation clarifies the connection between the Rake-Shunt contraction algorithm and those based on binarization. In particular, it enables us to translate a parallel program developed based on the Rake-Shunt contraction algorithm to one based on the m-bridge decomposition method. Thus, we can choose whether to use binarization according to the situation. |
| 論文抄録(英) |
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内容記述タイプ |
Other |
|
内容記述 |
Parallel tree contraction is a well established method of parallel tree processing. There are efficient and useful algorithms for binary trees, including the Shunt contraction algorithm and one based on the m-bridge decomposition method. However, for trees of unbounded degree, there are few practical tree contraction algorithms. The standard approach is “binarization,” namely to translate the input tree to a full binary tree beforehand. To prevent the overhead introduced by binarization, we previously proposed the Rake-Shunt contraction algorithm (ICCS 2011), which is a generalization of the Shunt contraction algorithm to trees of unbounded degree. This paper further extends this result. The major contribution is to show that the Rake-Shunt contraction algorithm is a tree contraction algorithm that uses fewer types of primitive contraction operations if we assume the input tree has been binarized. This observation clarifies the connection between the Rake-Shunt contraction algorithm and those based on binarization. In particular, it enables us to translate a parallel program developed based on the Rake-Shunt contraction algorithm to one based on the m-bridge decomposition method. Thus, we can choose whether to use binarization according to the situation. |
| 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 |
AA11464814 |
| 書誌情報 |
情報処理学会論文誌プログラミング(PRO)
巻 7,
号 5,
p. 1-9,
発行日 2014-12-05
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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 |
1882-7802 |
| 出版者 |
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言語 |
ja |
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出版者 |
情報処理学会 |
IPSJ-TPRO0705002.pdf (372.4 kB)
