Rchr
J-GLOBAL ID:201801016000578985
Update date: Mar. 22, 2023
Kanenobu Taizo
カネノブ タイゾウ | Kanenobu Taizo
Affiliation and department:
Homepage URL (1):
https://kaken.nii.ac.jp/d/r/00152819.ja.html
Research field (1):
Geometry
Research theme for competitive and other funds (44):
- 2021 - 2024 Classification of ribbon 2-knots and their cross sectional ribbon 1-knots
- 2019 - 2024 Research on 4-dimensional topology from the viewpoint of graphics and quandle theory
- 2019 - 2024 グラフィクスとカンドル理論の観点からの4次元トポロジーの研究
- 2017 - 2023 高分子のトポロジーに応用する結び目の数学
- 2018 - 2021 結び目と3次元多様体の量子トポロジー
- 2016 - 2021 結び目と3次元多様体の量子トポロジー
- 2017 - 2021 高分子のトポロジーに応用する結び目の数学
- 2016 - 2019 Canonical fundamental domains and holonomy representations for cone hyperbolic manifolds
- 2015 - 2019 Extended knot
- 2014 - 2019 Research on 4-dimensional topology from the viewpoint of graphics and quandle theory
- 2014 - 2019 グラフィクスとカンドル理論の観点からの4次元トポロジーの研究
- 2012 - 2017 Studies of knot theory and their applications
- 2012 - 2017 Study on local moves of knots with application to polymer topology
- 2012 - 2015 Applications of knot theory to game and sciences
- 2009 - 2014 Research on 4-dimensional topology from the viewpoint of graphics and quandle theory
- 2010 - 2012 THE RESEARCH OF THE STRUCTURES AND INVARIANTS OF STABLE EQUIVALENCE CLASSES OF KNOTS IN THICKENED SURFACES
- 2009 - 2011 Studies of Knot Theory
- 2009 - 2011 Study on local moves of knots with application to DNA knots
- 2007 - 2009 Overall study of topology
- 2005 - 2008 グラフィクスとカンドル理論の観点からの4次元トポロジーの研究
- 2003 - 2005 Research on several geometry from the view point of sinuglarity theory
- 2002 - 2005 STUDY OF TOPOLOGICAL INVARIANTS FOR KNOTS AND THEIR APPLICATIONS
- 2002 - 2004 Classification of 3-manifolds by link correspondence and knot theory
- 1999 - 2001 STUDY ON KNOT INVARIANTS AND ITS APPLICATIONS
- 1998 - 2000 Teichmuller Spaces and Mapping Class Groups
- 1997 - 1999 Knot Theory and Geometry of Manifolds
- 1997 - 1999 Heegaand spliffings and hyperbolic structures of 3-manifolds
- 1997 - 1998 STUDY ON KNOT INVARIANTS
- 1996 - 1996 低次元多様体と結び目理論
- 1996 - 1996 Comprehensive Researches in Knot Theory
- 1996 - 1996 変換群の幾何学
- 1995 - 1995 3,4次元多様体と結び目理論
- 1995 - 1995 多様体の量子不変量
- 1994 - 1994 3,4次元多様体と結び目理論の不変量
- 1994 - 1994 代数系の表現の研究
- 1994 - 1994 変換群の幾何学
- 1993 - 1993 3次元多様体と結び目理論
- 1992 - 1992 結び目の多項式不変量の研究
- 1991 - 1991 結び目理論
- 1990 - 1990 結び目の多項式不変量の研究
- 1989 - 1989 結び目の多項式不変量の研究
- 1986 - 1986 ガロア分岐被覆の研究
- 1986 - 1986 結び目の多項式不変量
- 1984 - 1984 2次元多様体の4次元多様体への埋め込み
Show all
Papers (84):
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Taizo Kanenobu, Toshio Sumi. Extension of Takahashi’s ribbon 2-knots with isomorphic groups. Journal of Knot Theory and Its Ramifications. 2023
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Taizo Kanenobu, Hideo Takioka. 4-Move distance of knots. Journal of Knot Theory and Its Ramifications. 2022. 31. 09
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Taizo Kanenobu, Kota Takahashi. Classification of ribbon 2-knots of 1-fusion with length up to six. Topology and its Applications. 2021. 301. 107521-107521
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Taizo Kanenobu, Toshio Sumi. Twisted Alexander polynomial of a ribbon 2-knot of 1-fusion. Osaka Journal of Mathematics. 2020. 57. 4. 789-803
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Taizo Kanenobu. Classification of ribbon 2-knots with ribbon crossing number up to four. RIMS K\^{o}ky\^{u}roku. 2020. 2163. 1-14
more...
MISC (10):
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金信泰造. 結び目理論研究事始め. 「結び目の数学教育」への導入ー小学生・中学生・高校生を対象としてー. 2017. 5. 205-212
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金信 泰造. 結び目の連立方程式--分子生物学への結び目の数学の応用 (フォーラム:現代数学の風景/結び目の不思議). 数学のたのしみ. 1998. 5. 56-71
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Colin C.Adams:The Knot Book,An Elementary Introduction to the Mathematical Theory of Knots. SUGAKU. 1997. 49. 3. 326-335
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Kanenobu Taizo. The Peripheral Subgroup of a Knotted Torus in $S^4. RIMS Kokyuroku. 1992. 813. 45-50
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Birman Joan S., Kanenobu Taizo. Jones's Braid-Plat Formulae, and a New Surgery Triple. RIMS Kokyuroku. 1987. 620. 162-168
more...
Books (3):
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結び目の数学 : 結び目理論への初等的入門
丸善出版 2021 ISBN:9784621305959
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曲面・結び目・多様体のトポロジー
培風館 2003 ISBN:456300331X
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The Knot Book
1998 ISBN:4563002542
Lectures and oral presentations (13):
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Classification of ribbon 2-knots of 1-fusion with up to six crossings
(Third Pan-Pacific International Conference on Topology and Applications 2019)
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Classification of ribbon 2-knots of 1-fusion with length up to seven
(Knots in Tsushima 2019 2019)
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小さい2次元リボン結び目の分類をめぐって
(研究集会「拡大 KOOK セミナー 2019」 2019)
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Twisted Alexander polynomial of a ribbon 2-knot
(The 14th East Asian Conference on Geometric Topology 2019)
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結び目の2重ケーブル絡み目のジョーンズ多項式
(研究集会 「トポロジーとコンピュータ2018」 2018)
more...
Education (3):
- 1980 - 1982 Kobe University
- 1978 - 1980 Kobe University Graduate School, Division of Natural Science
- 1974 - 1978 Kyoto University Faculty of Science
Professional career (2):
- Doctor of Science (Kyushu University)
- Master of Science (Kobe University)
Work history (5):
- 2022/04 - 現在 Osaka Metropolitan University Graduate School of Science
- 2021/04 - 2022/03 Osaka City University Graduate School of Science
- 2005/04 - 2021/03 Osaka City University Department of Mathematics, Faculty of Science Professor
- 1990/10/01 - 2005/03/31 Osaka City University Department of Mathematics, Faculty of Science Associate Professor
- 1982/07/01 - 1990/09/30 Kyushu University
Association Membership(s) (2):
「結び目の数学教育」研究会
, Mathematical Society of Japan
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