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量子力学系统与双线性系统可控性关系的对比研究 被引量:4

Comparative study on controllability relationship of quantum mechanical systems and bilinear systems
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摘要 在界定了双线性系统、矩阵系统和右不变系统后,归纳出已有的3种不同系统的可控性定理,重点放在对右不变系统的可控性定理的总结以及与双线性系统可控性之间的关系上,特别强调了它们的可控性定理主要是根据李群、李代数的特性来判断的,以类似方法详细分析各种不同情况下的量子系统的可控性定理,通过对比,指出现有的有关量子系统可控性定理与双线性系统可控性定理之间的对应关系,由此揭示每一种量子系统可控性定理的适用情况以及各种不同量子系统可控性概念之间的相互关系。 Bilinear systems, matrix systems and right-invariant systems are distinguished first. Then controllability theorems of such three different systems are summarized, the key points focus on the necessary and sufficient controllability conditions for right-invariant systems, and the relation with bilinear systems. Controllability theorems of these three different systems are especially emphasized by using Lie groups and Lie algebra. Different controllability theorems of quantum systems using similar method are analyzed in detail. Corresponding relations of controllability between quantum systems with bilinear systems are pointed out by means of comparison, and each type of controllability applied to different situations are also given. Relationships among different notions of controllability of quantum systems are established.
作者 丛爽 东宁
机构地区 中国科学技术大学自动化系
出处 《量子电子学报》 CAS CSCD 北大核心 2006年第1期83-92,共10页 Chinese Journal of Quantum Electronics
基金 国家自然科学基金资助项目(50375148)
关键词 量子系统 系统可控性 李代数 李群 双线性系统 右不变系统 quantum systems controllability Lie algebra Lie groups bilinear systems right-invariant systems
分类号 O413 [理学—理论物理]
  • 相关文献

参考文献34

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共引文献19

同被引文献96

  • 1丛爽,郑祺星.双线性系统下的量子系统最优控制[J].量子电子学报,2005,22(5):736-742. 被引量:1
  • 2丛爽.相互作用的量子系统模型及其物理控制过程[J].控制理论与应用,2006,23(1):131-134. 被引量:3
  • 3匡森,丛爽.基于最优搜索步长的封闭量子系统的控制[J].中国科学院研究生院学报,2006,23(5):601-606. 被引量:2
  • 4CONG Shuang,KUANG Sen.Quantum Control Strategy Based on State Distance[J].自动化学报,2007,33(1):28-31. 被引量:10
  • 5Sen Kuang, Shuang Cong. Lyapunov control methods of closed quantum systems [J]. Automatica (S0005-1098), 2008, 44(1):98-108.
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引证文献4

二级引证文献7

量子电子学报
2006年 第1期

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