摘要
对驱动力作用下的阻尼谐振子 ,通过正则变换 ,引入传播子 ,并采用路径积分方法 ,求出了振子的波函数 ,进而得到了振子的几率密度 .讨论了几种特殊情况下的阻尼谐振子 .
For the damped oscillator under the drive power, the wave function of oscillator is gained by the way of regular transformation, introducing propagator and using paths integral, and then the probability density of oscillator is gained from wave function. The damped oscillator under several special conditions is discussed.
出处
《曲阜师范大学学报(自然科学版)》
CAS
2002年第3期70-72,共3页
Journal of Qufu Normal University(Natural Science)
