Timeline for Constant term in Green's kernel expansion
Current License: CC BY-SA 3.0
9 events
| when toggle format | what | by | license | comment | |
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| Jul 10, 2017 at 1:52 | answer | added | Bombyx mori | timeline score: 4 | |
| Jun 9, 2017 at 5:20 | comment | added | user21574 | Yes of course, $\omega$-psh Green functions with one pole of maximal Lelong number 1 must have an isotropic pole. Are you looking for page 1 , math.leidenuniv.nl/~pbruin/scriptie.pdf ? | |
| Jun 9, 2017 at 4:55 | history | edited | Poincare-Lelong | CC BY-SA 3.0 |
added 7 characters in body
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| Jun 9, 2017 at 4:55 | comment | added | Poincare-Lelong | Doesn't the lelong number calculate the coefficient in front of the log, which I have already assumed is one? I am interested in the constant term. | |
| Jun 9, 2017 at 2:58 | comment | added | user21574 | See examples of page 7, and 8 ms.u-tokyo.ac.jp/~hirachi/scv/hayama-archive/2009/coman_001.pdf related to isotropic pole and Lelong number. | |
| Jun 8, 2017 at 20:28 | history | edited | Poincare-Lelong | CC BY-SA 3.0 |
Added that the coordinates are required to be normal coordinates; see comment by macbeth.
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| Jun 8, 2017 at 20:27 | comment | added | Poincare-Lelong | Oh of course. Thanks! I should require the coordinates to be normal coordinates, so that at least takes care of scaling. | |
| Jun 8, 2017 at 18:34 | comment | added | macbeth | A change of co-ordinates changes $A$. For example, if $x=\lambda x'$ for some constant $\lambda$, then $\log|x|=\log|x'|+\log|\lambda|$. | |
| Jun 8, 2017 at 5:47 | history | asked | Poincare-Lelong | CC BY-SA 3.0 |