Decay probability distribution of quantum-mechanical unstable systems and time operator
| contributor author | M. Courbage | en |
| contributor author | سید مجید صابری فتحی | en |
| contributor author | Seyed Majid Saberi Fathi | fa |
| date accessioned | 2020-06-06T13:07:52Z | |
| date available | 2020-06-06T13:07:52Z | |
| date issued | 2008 | |
| identifier uri | https://libsearch.um.ac.ir:443/fum/handle/fum/3342752?show=full | |
| description abstract | We study the decay probability distribution and the survival probability of unstable quantum systems using an explicit formula of the spectral projections of the time operator in the statistical Liouville description for solvable Hamiltonians. We apply this formula to the one-level Friedrichs model to study the decay distribution of the excited decaying state under coupling with a continuum of degrees of freedom. Then we show that this formula eliminates the Zeno effect for short-time decay. We also show that the long-time asymptotic of the survival probability is a sum of an algebraically decaying term and an exponentially decaying one. | en |
| language | English | |
| title | Decay probability distribution of quantum-mechanical unstable systems and time operator | en |
| type | Journal Paper | |
| contenttype | External Fulltext | |
| subject keywords | Decay | en |
| subject keywords | survival probability | en |
| subject keywords | time super-operator | en |
| journal title | Physica A: Statistical Mechanics and its Applications | fa |
| pages | 2205-2224 | |
| journal volume | 387 | |
| journal issue | 10 | |
| identifier link | https://profdoc.um.ac.ir/paper-abstract-1027564.html | |
| identifier articleid | 1027564 |
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