| 1. | Extended virial theorem and its application
超维里定理及其应用 |
| 2. | We find that virial theorem values decrease quickly as magnetic value is increased
此外我们证明在加磁场后维里定理值变小。 |
| 3. | Scaling of hydrogenic impurity binding energy and virial theorem in semiconductor quantum wells and wires
半导体量子阱和量子线中杂质束缚能的度规法则与维里定理 |
| 4. | This is because the origin of the virial theorem value of 2 lies in the inverse square coulomb force being the only interaction seen by the electron and impurity ion
其原因是在理想的一维、二维、三维结构中,对于杂质体系只存在电子和施主离子间的平方反比库仑力,而没有量子阱宽的限制。 |
| 5. | In the first part , the scaling rule for the hydrogenic impurity binding energy and the virial theorem value ( potential - to kinetic - energy ) in infinite quantum wells and quantum wires of rectangular cross - section with three different aspect ratios are studied through the variational method
在第一部分,利用变分法计算了无限深gaas矩形量子线和量子阱中类氢杂质束缚能的度规法则和维里定理值。 |
| 6. | The binding energies of excitons are calculated with the use of variational approach , we consider the mismatch of effective masses between the well and the barrier in the process of calculation , calculate and talk about the virial theorem values in square quantum - well wires in presence of a magnetic field
本文采用变分法,在外加磁场条件下分别计算了激子在无限深和有限深方形量子线中的基态束缚能。在计算的过程中进一步考虑了阱,垒中粒子有效质量不匹配的影响,最后我们计算并讨论了外加磁场情况下的维里定理。 |
| 7. | Comparing our results with that of predecessors , we find that ( i ) there indeed exists a parameter ( impurity bohr radius ajm ) on which the impurity binding energy has strong dependence ; ( ii ) the virial theorem value is non - constant but approach 2 from above when the well width is smaller or larger
计算结果表明:的确存在一个参数(杂质有效玻尔半径)可用来完全确定束缚能的值,而不必考虑截面的形状和尺寸;体系的维里定理值并不等于常数,而是随杂质有效玻尔半径的变化而变化,在阱宽较小和较大时,维里定理值都趋于同一值2 。 |
