1.Symmetry Degeneracy and the Non-Abelian Berry Phase Factor
对称性?并和非阿?尔Berry相位因子
2.Counting Function Asymptotics and the Weak Weyl-Berry Conjecture for Connected Domains with Fractal Boundaries
关于具分形边界连通区域上的谱渐近及弱Weyl-Berry猜想
3.Based on the service quality theory that Gronroos and Parasuraman,Zeithaml and Berry proposed and use SERVPERF of Cronin & Taylor to study the influential factors on healthcare service quality. The assessment system for healthcare service quality has been established,and the patient characteristics index has been set up for prompt management of healthcare service quality.
以格罗鲁斯及Parasuraman,Zeithaml,Berry的服务质量理论为依据,运用SERVPERF评价技术,对上海市医院系统服务质量的影响因素进行研究,建立了医院服务质量的评价体系,分析了医院不同患者群体对医疗服务质量的影响,以期为医院的医疗服务质量管理提供快速解决方案。
4.The Method of High-order Quantum Adiabatic Approximation and the Properties of Berry’s phase
高阶量子绝热近似方法和Berry相因子的性质
5.The Geometrical Structure of Berry Phase in Quantum Adiabatic Approximation
量子绝热近似中Berry相因子的几何结构
6.The non-adiabatic Berry Phase of the Quantum State of a Harmonic Oscillator with Time-dependent Frequency and Boundary Conditions
具有时间依赖频率和边界条件的谐振子的非绝热Berry相位
7.Also we use the time-dependent SU(2) gauge transformation to diagonalize the Hamilton operator ,obtain the berry phase and analytically the time-evolution operator. The particle number difference of species A between the two wells is studied analyticall
并且用含时SU(2)规范变换对角化哈密顿量得到了系统的Berry位相和时间演化算符,并研究了量子随穿过程。
8.xJ(^Fn(x))d^Fn(x), is derived. Furthermore, the representation is also used to establish a Berry-Essen inequality for T(^Fn).
xJ(^Fn(x))d^Fn(x),的U-统计量表示, 并通过该表示建立了T(^Fn)的Berry-Essen不等式.
9.The development of the quantum adiabatic theorem and adiabatic approximation before and after the discovery of Berry′s phase is reviewed, with emphasis on the physical concepts involved.
阐述了量子绝热定理和绝热近似的现状、物理概念和方法,也回溯到它们的历史渊源和演变,强调Berry相位的发现对量子绝热定理的影响.
10.QUASI-ADIABATIC APPROXIMATION FOR THE SLOWLYCHANGING QUANTUM PROCCESS AND BERRY PHASE FACTOR
量子体系缓变过程的准绝热近似和Berry相因子
