並列摘要
Seifert (4) demonstrated that every knot can be spanned by an orientable surface. These Seifert surfaces lead to numerous knot invariants. The purpose of this paper is to demonstrate the existence of a parallel theory concerning connected nonorientable surfaces. These surfaces give rise to additional knot invariants.
延伸閱讀
- Majima, T., & Takai, S. (2016). CAS as a research tool of TKA. Formosan Journal of Musculoskeletal Disorders, 7(1), 30-35. https://doi.org/10.6492/FJMD.20150902
- 劉烘昌(2013)。Cross Wallace's Line。臺灣博物季刊,32(4),30-41。https://www.airitilibrary.com/Article/Detail?DocID=P20150629002-201312-201507010030-201507010030-30-41
- 陳盈潔(2007)。Instability in Loops〔碩士論文,國立臺北藝術大學〕。華藝線上圖書館。https://www.airitilibrary.com/Article/Detail?DocID=U0014-1208200716270200
- 陳博軒(2007)。A Ka-Band Cross-Coupled Push-Push VCO〔碩士論文,國立中央大學〕。華藝線上圖書館。https://www.airitilibrary.com/Article/Detail?DocID=U0031-0207200917345210
- 丁建中(2012)。Loops in the Vacancy〔碩士論文,國立臺北藝術大學〕。華藝線上圖書館。https://www.airitilibrary.com/Article/Detail?DocID=U0014-1309201215082900