计算了磁极化子的基态能量。
结果表明:极化子结合能随外加压力增加。
It is found that the polaron binding energy increases with pressure.
研究了抛物阱中极化子效应对激子的影响。
The polaron effects on excitons in a parabolic quantum well are studied.
研究了半导体量子点中极化子的有效质量。
The properties of the effective mass of polaron in semiconductor quantum dot are studied.
研究多原子晶体中强耦合表面极化子的性质。
The properties of strong coupling surface polaron in a polyatomic crystals was studied.
极化子速率对量子点中磁极化子性质的影响。
Polaron rate of quantum dots in magnetic polaron properties. -Polaron rate of quantum dots in magnetic polaron properties.
讨论了极性半导体中表面极化子重正化质量的性质。
In this paper, renormalization mass of the surface polaron in polar crystals were studied.
讨论了电子自旋对强耦合表面磁极化子性质的影响。
The influence of electron spin on the properties of the strong coupling surf ace magnetopolaron was discussed.
抛物量子点内弱耦合极化子的基态能量是本文的主要内容。
The thesis concerns mainly about the ground state energy of weak coupling polaron in a parabolic quantum dot.
同时给出光学声子对极化子自陷能影响随阱宽的变化关系。
The influences of optical phonon modes on polaron self-trapping energies as functions of well width are given respectively.
本文研究磁场中弱耦合多原子半无限晶体中表面极化子的性质。
In this paper, the properties of the weak coupling surface polaron for polyatomic semi-infinite crystals in magnetic field are studied.
综述了近年来对声学形变势表面极化子的性质方面的部分工作。
This article is a review on our studies in recent years for the properties of acoustic deformation potential surface polaron.
对弱耦合和中间耦合情形,导出了极化子基态能量和有效质量。
For the weak coupling and intermediate coupling cases, the ground state energy and effective mass of the polaron are derived.
费曼路径积分的变分方法是计算束缚极化子基态能的最有效方法。
The Feynman path-integral variational theory is the best way to compute the ground-state energy of bound polarons.
假设自旋极化子和不带自旋的双极化子为有机半导体中的载流子。
Self-trapped states, such as spin polarons as well as spinless bipolarons are assumed to be the main carriers in organic semiconductors.
研究了半导体非对称双异质结(ADHS)中,极化子的基态性质。
The polaron ground state in asymmetric double heterostructure (ADHS) is studied.
论文的第三章研究了极化子效应对方形量子阱中三次谐波产生的影响。
In the third chapter, polaron effects on the third-harmonic generation in square Wells are investigated.
而强耦合极化子的振动频率随量子点的有效受限长度的减小而迅速增加。
The relation of these quantities with the effective confinement length of the quantum dot, and the electron-phonon coupling strength is discussed.
强耦合极化子的振动频率和声子平均数随有效受限长度的减小而迅速增大。
The Vibration frequency and the mean number of phonon of the strong coupling polaron in parabolic quantum wires will strongly increase with decreasing the effective confinement length.
本文用量子化学的PPP法讨论了双极化子的稳定构型,得到了较好的结果。
In this paper, we calculate the stable configuration of the bipolaron with PPP method, and gain a good result.
在所研究的温度范围内,所有材料的导电机理都属于极化子的变程跳跃导电。
In the investigated temperature range, the conductive mechanism ofr all samples belongs to the variable range hopping conduction of the polarons.
仅考虑高频分支对极化子的贡献,研究了单模型三元混晶界面极化子的性质。
Taking higher frequency branch into account, The interface polaron of one mode behavior ternary mixed crystals was studied.
提出了利用极化子效应进行双色选通存储的物理机制,并得到了实验上的验证。
We propose the polaron effect to explain the mechanism of the two-color gated storage and get the experimental confirmation.
用自洽迭代的方法研究了顺式聚乙炔中双极化子的能谱及其附近的局域振动模。
We have studied the energy spectra of bi-polaron and the localized modes around a bi-polaron in cis - (ch), by using a self-consistent approach.
极化子的研究对于解释离子晶体和极性半导体的光跃迁过程及输运现象有重要意义。
The study on this subject plays an important role in explaining the phenomena of light transition and transport in the ionic crystal and polar semiconductor.
采用线性组合算符法和变分法研究了电场对抛物量子线中强耦合极化子性质的影响。
The influence of electric field on the properties of strong-coupling polaron in parabolic quantum wires are studied by using linear combination operator and variational methods.
在声子色散影响下利用压缩态变分法计算了抛物量子点中弱耦合极化子的基态能量。
The ground state energy of weak-coupling polaron in a parabolic quantum dot considering the phonon dispersion is calculated using the squeezed-state variational approach.
在声子色散影响下利用压缩态变分法计算了抛物量子点中弱耦合极化子的基态能量。
The ground state energy of weak-coupling polaron in a parabolic quantum dot considering the phonon dispersion is calculated using the squeezed-state variational approach.
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