The energy eigenvalues and the squeezed state solutions are obtained by making use of algebraic diagonalization.
利用代数对角化方法,可得到压缩态形式的能量本征态和相应的能量本征值。
The squeezed state of single module is discussed frome aspects of squeezed operator, squeezed coherent state, squeezed transformation, the diagonalization of Hamiltionian, and so on.
从压缩算符、压缩相干态、压缩变换与哈密顿量的对角化等几个方面对单模压缩态进行了讨论。
In this paper, the precise solution of a generalized time dependent harmonic oscillator is obtained by a sequence of unitary transformations and applied to construct the squeezed state of the system.
利用一系列幺正变换,求出了广义含时谐振子系统的精确解,并利用此精确解构造了此系统的压缩态。
应用推荐