Timeline for Can I swap quantum mechanical ground state for some classical trajectory distribution and have it sit still after the swap?
Current License: CC BY-SA 4.0
10 events
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| Jul 5, 2018 at 12:30 | history | edited | Qmechanic♦ | CC BY-SA 4.0 |
Minor
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| Apr 13, 2017 at 12:40 | history | edited | CommunityBot |
replaced http://physics.stackexchange.com/ with https://physics.stackexchange.com/
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| Sep 1, 2016 at 14:10 | comment | added | Qmechanic♦ | The method of quantum characteristics is discussed on this Wikipedia page. | |
| Sep 1, 2016 at 11:37 | history | edited | Qmechanic♦ | CC BY-SA 3.0 |
Added explanation
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| Sep 1, 2016 at 2:39 | history | edited | Qmechanic♦ | CC BY-SA 3.0 |
added 7 characters in body
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| Sep 1, 2016 at 2:27 | history | edited | Qmechanic♦ | CC BY-SA 3.0 |
Added explanation cf. comments.
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| Aug 31, 2016 at 22:43 | comment | added | Emilio Pisanty | Hmmm, ok. To bring this back to the Classical Trajectory Monte Carlo (CTMC) spirit, then, can you comment on whether the modified Liouville equation admits solution by characteristics, and what the equivalent of Hamilton's equations would be for those trajectories? | |
| Aug 31, 2016 at 22:33 | comment | added | Qmechanic♦ | $\uparrow$ Yes. | |
| Aug 31, 2016 at 21:57 | comment | added | Emilio Pisanty | Hang on, I'm not sure I get this. If I understand it correctly, you're saying that the Wigner distribution already follows a Liouville-like equation, except that it needs to be corrected with higher powers of $\hbar$? | |
| Aug 31, 2016 at 20:37 | history | answered | Qmechanic♦ | CC BY-SA 3.0 |