抄録
A generic map from a finite graph to the 2-space is called identifiable if any two embeddings of the graph into the 3-space obtained by lifting the map with respect to the natural projection from the 3-space to the 2-space are ambient isotopic in the 3-space. We show that only planar graphs have identifiable maps. We characterize the identifiable maps for some planar graphs.
| 本文言語 | English |
|---|---|
| ページ(範囲) | 991-998 |
| ページ数 | 8 |
| ジャーナル | Journal of Knot Theory and its Ramifications |
| 巻 | 13 |
| 号 | 8 |
| DOI | |
| 出版ステータス | Published - 2004 12月 |
ASJC Scopus subject areas
- 代数と数論