代数幾何学セミナー
過去の記録 ~05/01|次回の予定|今後の予定 05/02~
開催情報 | 金曜日 13:30~15:00 数理科学研究科棟(駒場) 118号室 |
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担当者 | 權業 善範、河上 龍郎 、榎園 誠 |
2021年04月21日(水)
15:00-16:00 数理科学研究科棟(駒場) ZOOM号室
京大と共催です。
服部真史 氏 (京大数学教室)
A decomposition formula for J-stability and its applications (日本語)
京大と共催です。
服部真史 氏 (京大数学教室)
A decomposition formula for J-stability and its applications (日本語)
[ 講演概要 ]
J-stability is an analog of K-stability and plays an important role in K-stability for general polarized varieties (not only for Kahler-Einstein metrics). Strikingly, G.Chen proved uniform J-stability and slope uniform J-stability are equivalent, analogous to Ross-Thomas slope theory and Mumford-Takemoto slope theory for vector bundles, by differential geometric arguments recently. However, this fact has not been proved in algebro-geometric way before. In this talk, I would like to explain a decomposition formula of non-Archimedean J-functional, the (n+1)-dimensional intersection number into n-dimensional intersection numbers and its applications to prove the fact for surfaces and to construct a K-stable but not uniformly K-stable lc pair. Based on arXiv:2103.04603
J-stability is an analog of K-stability and plays an important role in K-stability for general polarized varieties (not only for Kahler-Einstein metrics). Strikingly, G.Chen proved uniform J-stability and slope uniform J-stability are equivalent, analogous to Ross-Thomas slope theory and Mumford-Takemoto slope theory for vector bundles, by differential geometric arguments recently. However, this fact has not been proved in algebro-geometric way before. In this talk, I would like to explain a decomposition formula of non-Archimedean J-functional, the (n+1)-dimensional intersection number into n-dimensional intersection numbers and its applications to prove the fact for surfaces and to construct a K-stable but not uniformly K-stable lc pair. Based on arXiv:2103.04603