| 1. | Monotone iteration method generalized solution of nonlinear weakly coupled equations 非线性弱耦合方程组广义解的单调迭代法 |
| 2. | Weak - coupling ground state phase diagram of the one - dimensional extended hubbard model 弱耦合一维扩展赫伯特模型的基态相图 |
| 3. | Due to the weakly - coupled property , it is easy to use software to compensate precision 由于该机型具有弱耦合特性,使得用软件补偿精度的方法变得方便可行。 |
| 4. | We rederive the eqpm , however , with the potential field description of the effective quantum spin modeled from weakly linked two - component becs 我们用等效量子自旋模型的势场描述方法得到了弱耦合双组分bec精确量子相位模型( eqpm ) 。 |
| 5. | The properties of the weak - coupling bound polaron in quantum well are studied using the linear combination operator and the unitary transformation method 摘要采用线性组合算符及幺正变换方法研究了磁场对量子阱中弱耦合束缚极化子的性质的影响。 |
| 6. | Including the scalar lyapunov approach and the vector lyapunov approach . the two approaches are generally suitable for the large - scale system with weak coupling among subsystems 这两种方法主要适用于子系统简具有弱耦合的大系统的稳定性研究(及子系统间相互影响很小的系统) 。 |
| 7. | The results show that the method is more reliable than selecting modes manually , especially for weak coupling mistuned bladed disks with a higher accuracy as well as less computation period 计算结果显示,对失谐叶盘系统,特别是在弱耦合情况下,该方法比人为选择模态更为可靠,可以使用较少机时,获得较高的求解精度。 |
| 8. | We conduct a theoretical study on the properties of a bound polaron in a quantum well under an electric field using linear combination operator and unitary transformation methods , which are valid in the whole range of electron - lo phonon coupling 摘要采用线性组合算符及幺正变换方法研究了电场对量子阱弱耦合束缚极化子的性质的影响。 |
| 9. | We present a distributed application system based on j2ee and it makes the whole system become a multi - tier component system , loose - couple horizontally and vertically , provide flexibility , reusability , testability and extensibility 本文提出基于j2ee的分布式应用系统使整个系统成为一个多层的组件系统,以实现系统横向、纵向之间的弱耦合,使系统具备了灵活性、可重用性、可测性、可扩展性。 |
| 10. | The scalar lyapunov function approach and vector lyapunov function approach of stability for large - scale systems are analyzed . and it is pointed out that the restriction of these approaches are only suited for large - scale systems with week coupling among subsystems 对大系统稳定性的标量lyapunov函数法和向量lyapunov函数法作了分析,指出这些方法只适用于子系统间具有弱耦合的大系统的局限性。 |