| 由因式化L算子所构成的经典可积动力学体系 |
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| 引用本文: | 石康杰,李广良,范桁,侯伯宇.由因式化L算子所构成的经典可积动力学体系[J].中国物理 C,1998,22(12):1100-1111. |
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| 作者姓名: | 石康杰 李广良 范桁 侯伯宇 |
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| 作者单位: | 西北大学现代物理研究所!西安,710069,西北大学现代物理研究所!西安,710069,西北大学现代物理研究所!西安,710069,西北大学现代物理研究所!西安,710069 |
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| 摘 要: | 用因式化的L算子构造了一类在非周期边界条件下的可积模型.对体系的transfer矩阵取三角和标度极限情况下,得到了n维体系(n为奇数)的经典哈密顿量的具体形式.结果表明,这类可积体系与Calogero等人所发现的一系列可积体系是相类似的.
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| 关 键 词: | 因式化的L算子 非周期边界条件 transfer矩阵 |
| 收稿时间: | 1997-12-23 |
A Kind of Classically Integrable Dynamics System Constructed by Factorized L Operator |
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| Shi Kangjie, Li Guangliang, Fan Heng, Hou Boyu.A Kind of Classically Integrable Dynamics System Constructed by Factorized L Operator[J].High Energy Physics and Nuclear Physics,1998,22(12):1100-1111. |
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| Authors: | Shi Kangjie Li Guangliang Fan Heng Hou Boyu |
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| Institution: | Institute of Modern Physics. Northwest University. Xi' an 710069 |
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| Abstract: | An integrable model with non-period boundary condition is constructed by use of factorized L operator. Taking trigonometric limit and scalar limit to the transfer matrix, we obtain the classical Hamiltonian of the n dimentional system (n is odd number). The result shows that this integrable system is similar to those found by Calogero et al. |
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| Keywords: | factorized L operator non-period boundary condition transfer matrix |
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