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| 特形脉冲的欧拉角 | |
| 引用本文: | 周进元 李丽云 等. 特形脉冲的欧拉角[J]. 波谱学杂志, 1994, 11(4): 345-351 |
| 作者姓名: | 周进元 李丽云 等 |
| 作者单位: | 中国科学院武汉物理研究所波谱与原子分子物理国家重点实验室, 武汉 430071 |
| 摘 要: | 本文提出了用量子力学的空间转动变换算符描述特形脉冲的方法。它把任意的特形脉冲用三个欧拉角来表示,并且使得在特形脉冲下的相干演化可以很容易地利用多极NMR理论,张量算符理论或者积算符理论来分析,作为例子,用数值方法计算了高斯脉冲的三个参数。 |
| 关 键 词: | 特形脉冲 欧拉角 欧拉几何方程 |
| 收稿时间: | 1993-11-22 |
THE EULER ANGLES FORSHAPED PULSES |
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| Zhou Jinyuan,Li Liyun and Ye Chaohui. THE EULER ANGLES FORSHAPED PULSES[J]. Chinese Journal of Magnetic Resonance, 1994, 11(4): 345-351 | |
| Authors: | Zhou Jinyuan Li Liyun Ye Chaohui |
| Affiliation: | State Key Laboratory of Magnetic Resonance and Atomic and Molecular Physics, Wuhan institute ofPhysics, The Chinese Academy of Sciences, Wuhan 430071 |
| Abstract: | he propagator of a shaped pulse is taken as the rotation operator with the threeEuler angles. The coherence evolutions under the shaped pulse are described by MultipoleNMR , the tensor operator formalism, and the Cartesian operator formalism. The nu-merical calculation for a Gaussian-shaped pulse is made as an example. |
| Keywords: | Shaped pulse Euler angles Euler geometric equations |
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