Timeline for Ergodic Mean for Schrodinger flow
Current License: CC BY-SA 3.0
9 events
| when toggle format | what | by | license | comment | |
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| Aug 22, 2013 at 21:02 | comment | added | jjcale | Your operator acts on the fourier transform $\hat{f}(k)$ as a multiplication by $(e^{-i k^{2}T}-1)/(-i T k^{2})$ | |
| Aug 22, 2013 at 0:20 | comment | added | hispac | I can't figure it out. Can you show me a proof that use fourier transform? | |
| Aug 20, 2013 at 1:46 | history | edited | hispac | CC BY-SA 3.0 |
added 27 characters in body
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| Aug 19, 2013 at 20:17 | answer | added | András Bátkai | timeline score: 1 | |
| Aug 19, 2013 at 19:16 | comment | added | jjcale | For a proof use fourier transform or resolution of identity of normal operators. However, I don't know if this is useful for the nonlinear case. | |
| S Aug 19, 2013 at 19:07 | history | suggested | José Hdz. Stgo. | CC BY-SA 3.0 |
improved formatting
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| Aug 19, 2013 at 18:59 | review | First posts | |||
| Aug 19, 2013 at 19:15 | |||||
| Aug 19, 2013 at 18:58 | review | Suggested edits | |||
| S Aug 19, 2013 at 19:07 | |||||
| Aug 19, 2013 at 18:43 | history | asked | hispac | CC BY-SA 3.0 |