Timeline for What can one say about the Dirichlet problem for Schrödinger equation with negative potential?
Current License: CC BY-SA 4.0
11 events
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| Sep 30 at 14:03 | history | bumped | CommunityBot | This question has answers that may be good or bad; the system has marked it active so that they can be reviewed. | |
| Jun 2 at 14:01 | history | bumped | CommunityBot | This question has answers that may be good or bad; the system has marked it active so that they can be reviewed. | |
| Feb 3 at 13:57 | comment | added | Giuseppe Negro | Formally, the "Wick rotation" $x=i\xi, y=i\eta$ turns the present problem into a standard eigenvalue problem in the variables $\xi, \eta$. If you have results for the standard problem in the analytic setting, these should pass over to the present problem. Just a formal observation, don't take it too seriously. | |
| Feb 3 at 13:07 | history | bumped | CommunityBot | This question has answers that may be good or bad; the system has marked it active so that they can be reviewed. | |
| Oct 6, 2023 at 13:01 | history | bumped | CommunityBot | This question has answers that may be good or bad; the system has marked it active so that they can be reviewed. | |
| Sep 6, 2023 at 12:30 | answer | added | Michele Caselli | timeline score: 0 | |
| Sep 5, 2023 at 13:33 | comment | added | Willie Wong | Your $c$ is a bounded, smooth function, then basically your problem reduces to the Fredholm Alternative. (See, e.g. L.C. Evans' PDE textbook, Chapter 6.) In a certain sense, for generic $c$ the Dirichlet problem has unique solution. | |
| Sep 5, 2023 at 8:01 | history | edited | Daniele Tampieri | CC BY-SA 4.0 |
Minor Math Jaxing + other minor fixes
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| Sep 5, 2023 at 7:53 | history | edited | YCor | CC BY-SA 4.0 |
edited tags, formatting
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| S Sep 5, 2023 at 7:23 | review | First questions | |||
| Sep 5, 2023 at 8:02 | |||||
| S Sep 5, 2023 at 7:23 | history | asked | Ilya Kossovskiy | CC BY-SA 4.0 |