| タイトル |
|
| その他のタイトル |
-
The Enumeration of Prime Non-Alternative Knots up to 20 Crossings
|
| 作成者 |
|
| 主題 |
-
Other
結び目
-
Other
結び目の表
-
Other
素な非交代結び目
|
| 内容注記 |
-
Other
type:Article
-
Other
A knot is a smooth embedding of the unit sphere S1 into R3.Two knots are said to be equivalent if there exists a homeomorphism of R3 onto itself taking one of the knots to the other. A knot is either a prime knot or a composite knot, and decomposition of a knot into prime knots is unique like integer factorization. Properties of composite knots are derived from composing prime knots. It is very useful if we have enumerated all the prime knots, and many works have been done until now. In the present, it has been enumerated up to 23 crossings for alternative knots, and 16 crossings for non-alternative knots. In this paper, we give an enumeration of prime non-alternative knots up to 20 crossings. Unfortunately, we can't remove a11 the equivalent knots from the table, our work is not complete and there may exist duplicated entries.
|
| 出版者 |
奈良女子大学大学院人間文化研究科
|
| 日付 |
Created2009-12-18
,
Issued2009-03-31
|
| 言語 |
|
| 資源タイプ |
departmental bulletin paper |
| 出版タイプ |
VoR |
| 資源識別子 |
URI
http://hdl.handle.net/10935/1113
|
| 収録誌情報 |
-
-
人間文化研究科年報
-
巻24
開始ページ179
終了ページ186
|
| ファイル |
|
| コンテンツ更新日時 |
2021-04-13 |
