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Seminar "Complex analysis in several variables" (Vitushkin Seminar)
February 17, 2021 16:45, Moscow, online
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Extension of plurisubharmonic functions with subharmonic singularities
Zywomir Dinew
Jagiellonian University
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| This page: | 198 | | Materials: | 25 |
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Abstract:
Let $u$ be a subharmonic function which is furthermore plurisubharmonic outside a closed set $E$. Then $u$ is said to be a plurisubharmonic function with subharmonic singularities
along $E$. We prove the following:
Theorem. Let $E\subseteq\Omega\subseteq \mathbb C^{n}$ be a closed subset of Lebesgue measure zero. Then any subharmonic function $u$ in $\Omega$ which is plurisubharmonic in $\Omega\setminus E$ is actually plurisubharmonic in the whole $\Omega$. This can be seen as a removable singularity theorem with special assumptions. In particular this solves a problem posed by Chirka.
Supplementary materials:
presentation17feb.pdf (1.3 Mb)
Language: English
Website:
https://mi-ras-ru.zoom.us/j/6119310351?pwd=anpleGlnYVFXNEJnemRYZk5kMWNiQT09
* ID: 611 931 0351. Password: 5MAVBP. |
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