| Residential College | false |
| Status | 已發表Published |
| Geometric phase and non-stationary state | |
Qian L.3; Wu R.-S.4; Xu H.3; Yu Y.1; Pan H.2  ; Wang Z.-S.3
| |
| 2014-09 | |
| Source Publication | Optik
 |
| ISSN | 0030-4026 |
| Volume | 125Issue:17Pages:4814-4818 |
| Abstract | By investigating a particle motion in a three-dimensional potential barrier with moving boundary, we find that due to an alteration of boundary conditions, the wave function pick up an additional nonlocal phase factor independent on the dynamics of physical system. By compare the nonlocal phase with the geometric phase of the physical system, furthermore, we find that the nonlocal feature of quantum behavior can fully be described by its geometric phase. |
| Keyword | Geometric Phase Moving Boundary Non-stationary State Nonlocality Potential Barrier |
| DOI | 10.1016/j.ijleo.2014.04.052 |
| URL | View the original |
| Indexed By | SCIE |
| Language | 英語English |
| WOS Research Area | Optics |
| WOS Subject | Optics |
| WOS ID | WOS:000341897100050 |
| Scopus ID | 2-s2.0-84906787068 |
| Fulltext Access | |
| Citation statistics | |
| Document Type | Journal article |
| Collection | INSTITUTE OF APPLIED PHYSICS AND MATERIALS ENGINEERING |
| Corresponding Author | Pan H.; Wang Z.-S. |
| Affiliation | 1.Wuhan University 2.Universidade de Macau 3.Jiangxi Normal University 4.Xinyu College |
| Corresponding Author Affilication | University of Macau |
| Recommended Citation GB/T 7714 | Qian L.,Wu R.-S.,Xu H.,et al. Geometric phase and non-stationary state[J]. Optik, 2014, 125(17), 4814-4818. |
| APA | Qian L.., Wu R.-S.., Xu H.., Yu Y.., Pan H.., & Wang Z.-S. (2014). Geometric phase and non-stationary state. Optik, 125(17), 4814-4818. |
| MLA | Qian L.,et al."Geometric phase and non-stationary state".Optik 125.17(2014):4814-4818. |
| Files in This Item: | There are no files associated with this item. | |||||
Items in the repository are protected by copyright, with all rights reserved, unless otherwise indicated.
Edit Comment