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On Eccentric Sets of Edges in Graphs
http://hdl.handle.net/10191/22384
8cd955cb-bc0b-45ab-819b-92495d468424
| 名前 / ファイル | ライセンス | アクション | |
|---|---|---|---|
E74-A_4_687-691.pdf (283.3 kB)
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| Item type | 学術雑誌論文 / Journal Article(1) | |||||
|---|---|---|---|---|---|---|
| 公開日 | 2013-05-17 | |||||
| タイトル | ||||||
| タイトル | On Eccentric Sets of Edges in Graphs | |||||
| タイトル | ||||||
| 言語 | en | |||||
| タイトル | On Eccentric Sets of Edges in Graphs | |||||
| 言語 | ||||||
| 言語 | eng | |||||
| 資源タイプ | ||||||
| 資源 | http://purl.org/coar/resource_type/c_6501 | |||||
| タイプ | journal article | |||||
| 著者 |
Sengoku, Masakazu
× Sengoku, Masakazu× Shinoda, Shoji× Abe, Takeo |
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| 抄録 | ||||||
| 内容記述タイプ | Abstract | |||||
| 内容記述 | We introduce the distance between two edges in a graph (nondirected graph) as the minimum number of edges in a tieset with the two edges. Using the distance between edges we define the eccentricity ε_τ (e_j) of an edge e_j. A finite nonempty set J of positive integers (no repetitions) is an eccentric set if there exists a graph G with edge set E such that ε_τ (e_j) ∈J for all e_i ∈E and each positive integer in J is ε_τ (e_j) for some e_j ∈E.. In this paper, we give necessary and sufficient conditions for a set J to be eccentric. | |||||
| 書誌情報 |
IEICE transactions on fundamentals of electronics, communications and computer sciences en : IEICE transactions on fundamentals of electronics, communications and computer sciences 巻 E74-A, 号 4, p. 687-691, 発行日 1991-04 |
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| 出版者 | ||||||
| 出版者 | 電子情報通信学会 | |||||
| ISSN | ||||||
| 収録物識別子タイプ | ISSN | |||||
| 収録物識別子 | 09168508 | |||||
| 書誌レコードID | ||||||
| 収録物識別子タイプ | NCID | |||||
| 収録物識別子 | AA10826239 | |||||
| 権利 | ||||||
| 権利情報 | copyright(C)1991 IEICE | |||||
| 著者版フラグ | ||||||
| 値 | publisher | |||||
| 異版である | ||||||
| 関連タイプ | isVersionOf | |||||
| 関連識別子 | ||||||
| 識別子タイプ | URI | |||||
| 関連識別子 | http://www.ieice.org/jpn/trans_online/ | |||||
