利用Fock态表象下的Wigner函数表达式,重构了湮没算符k次幂本征态的Wigner函数,并依据Wigner函数在相空间的分布规律,讨论了湮没算符k次幂本征态的非经典特性.数值结果表明:湮没算符k次幂本征态Wigner函数的分布与复参数α的取值有关;湮没算符1次幂的本征态(即相干态)为准经典态(其Wigner函数值总是非负的),而湮没算符大于或等于2次幂的本征态则都具有明显的非经典特性(它们的Wigner函数均出现了负值).
Wigner functions for the eigenstates of k-th power annihilation operators are constructed in phase spaces by using their expressions in Fock presentations. Based on the negativities of their relevant Wigner functions, the non-classical properties of these eigenstates are discussed. The numerical results show that,depending on the complex parameters α, the coherent states are quasi-classical (their Wigner functions are always non-negative), but the eigenstates of k-th (k ≥ 2) power annihilation operators are really non-classical (their relevant Wigner functions can be negative in phase spaces).
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