A Program for Constructing New Solvable Models
スポンサーリンク
概要
- 論文の詳細を見る
On the basis of a perspective of the two-dimensional lattice models, we propose a program for constructing new solvable models. To accomplish our program we define a gl_n-Sklyanin algebra. This object gives a quadratic generalization of the universal enveloping algebra of the Lie algebra gl_n. We also discuss the meaning of the parameters contained in it and other related problems.
- 理論物理学刊行会の論文
- 1992-12-10
著者
-
Quano Yas-hiro
Department Of Clinical Engineering Suzuka University Of Medical Science
-
Quano Yas-hiro
Department Of Physics University Of Tokyo
-
Fujii Akira
Institute Of Industrial Science The University Of Tokyo
-
Fujii Akira
Institute Of Physics College Of Arts And Sciences University Of Tokyo
-
FUJII Akira
Institute of Physics, College of Arts and Sciences University of Tokyo
関連論文
- FOOD TOUGHNESS SCORE AS A SIGNIFICANT FACTOR OF LOW BITING FORCE FOR YOUNG JAPANESE FEMALES
- Network based Multi Agent Simulation Analysis : Part 1: Model Development(Architectural/Urban Planning and Design)
- A Program for Constructing New Solvable Models
- Form factors and vertex operators in the eight-vertex model at reflectionless points
- Completely Integrable Systems in Quantum Field Theory and Gravity
- Smirnov-Type Integral Formulae for Correlation Functions of the Bulk/Boundary XXZ Model in the Anti-Ferromagnetic Regime
- Quantum Knizhnik-Zamolodchikov Equations of Level 0 and Form Factors in SOS Model