23/07/04 11:13:59.61 /K4mC13y.net
>>17
>L^2拡張定理の応用面に重点を置いた講演をした。
独り言ですが
下記が、理解できてないが
なんか面白そうですね
L2 extensionが、L2拡張なのでしょうかね?(^^
(参考)
URLリンク(en.wikipedia.org)
Ohsawa?Takegoshi L2 extension theorem
In several complex variables, the Ohsawa?Takegoshi L2 extension theorem is a fundamental result concerning the holomorphic extension of an
L^{2}-holomorphic function defined on a bounded Stein manifold (such as a pseudoconvex compact set in
\mathbb {C} ^{n} of dimension less than n) to a domain of higher dimension, with a bound on the growth.
It was discovered by Takeo Ohsawa and Kensho Takegoshi in 1987,[1] using what have been described as ad hoc methods involving twisted Laplace?Beltrami operators, but simpler proofs have since been discovered.[2] Many generalizations and similar results exist, and are known as theorems of Ohsawa?Takegoshi type.
See also
・Suita conjecture
note
1. Ohsawa & Takegoshi (1987)
2.Siu (2011)