Braid Group Representations and Link Polynomials Derived from Generalized <I>SU</I>(<I>n</I>) Vertex Models
スポンサーリンク
概要
- 論文の詳細を見る
A new hierarchy of braid group representations is derived from a generalization of solvable vertex models associated with <I>SU</I>(<I>n</I>) symmetry. A family of link polynomials is obtained based on the Markov traces on the braid group representations. The hierarchy includes both the Alexander-Conway polynomial and the Jones polynomial as special cases. The link polynomials are one-variable realizations of the HOMFLY polynomial.
- 社団法人 日本物理学会の論文
社団法人 日本物理学会 | 論文
- Infrared Study of Sapphire α-Al2O3 by Small-Angle Oblique-Incidence Reflectometry
- Theory of the g-Factor in Graphite Intercalation Compounds
- Diamagnetism of Dilute Acceptor Compounds of Graphite
- Nuclear Spin-Lattice Relaxation Study in Spin Glass CoxGa1−x Intermetallic Compounds
- Localized Magnetic Moment of Co Impurity in CrVCo Alloys