|
| related topics |
| {time, wave, function} |
| {classical, space, random} |
| {field, particle, equation} |
| {particle, mechanics, theory} |
| {light, field, probe} |
| {temperature, thermal, energy} |
| {measurement, state, measurements} |
| {spin, pulse, spins} |
| {wave, scattering, interference} |
| {let, theorem, proof} |
|
Stability properties of |Psi|^2 in Bohmian dynamics
G. Potel, M. Munoz-Alenar, F. Barranco, E. Vigezzi
abstract: According to Bohmian dynamics, the particles of a quantum system move along
trajectories, following a velocity field determined by the wave-function
Psi(x,t). We show that for simple one-dimensional systems any initial
probability distribution of a statistical ensemble approaches asymptotically
|Psi(x,t)}|^2 if the system is subject to a random noise of arbitrarily small
intensity.
- oai_identifier:
- oai:arXiv.org:quant-ph/0206043
- categories:
- quant-ph
- comments:
- 6 pages, 4 figures; accepted for publication in Phys. Lett. A
- arxiv_id:
- quant-ph/0206043
- created:
- 2002-06-07
Full article ▸
|
|
| related documents |
| 0502079v1 |
| 9708034v1 |
| 9508025v1 |
| 0504105v1 |
| 0107152v1 |
| 0609039v1 |
| 0608242v1 |
| 0607098v2 |
| 0206177v1 |
| 0301148v1 |
| 0606171v1 |
| 0210009v1 |
| 0504029v1 |
| 0006110v1 |
| 0702270v1 |
| 0301054v1 |
| 0702140v1 |
| 0506156v2 |
| 0403154v1 |
| 0312096v2 |
| 0301073v1 |
| 0406121v1 |
| 0312220v1 |
| 0702143v1 |
| 0507194v1 |
|