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 |
---|---|
担当者 | 權業 善範、河上 龍郎 、榎園 誠 |
2010年05月17日(月)
16:40-18:10 数理科学研究科棟(駒場) 126号室
尾高 悠志 氏 (京都大学数理解析研究所(RIMS))
On the GIT stability of Polarized Varieties (JAPANESE)
尾高 悠志 氏 (京都大学数理解析研究所(RIMS))
On the GIT stability of Polarized Varieties (JAPANESE)
[ 講演概要 ]
Background:
Original GIT-stability notion for polarized variety is
"asymptotic stability", studied by Mumford, Gieseker etc around 1970s.
Recently a version appeared, so-called "K-stability", introduced by
Tian(1997) and reformulated by Donaldson(2002), by the way of seeking
the analogue of Kobayashi-Hitchin correspondence, which gives
"differential geometric" interpretation of "stability". These two have
subtle but interesting differences in dimension higher than 1.
Contents:
(1*) Any semistable (in any sense) polarized variety should have only
"semi-log-canonical" singularities. (Partly observed around 1970s)
(2) On the other hand, we proved some stabilities, which corresponds to
"Calabi conjecture", also with admitting mild singularities.
As applications these yield
(3*) Compact moduli spaces with GIT interpretations.
(4) Many counterexamples (as orbifolds) to folklore conjecture:
"K-stability implies asymptotic stability".
(*: Some technical points are yet to be settled.
Some parts for (1)(2) are available on arXiv:0910.1794.)
Background:
Original GIT-stability notion for polarized variety is
"asymptotic stability", studied by Mumford, Gieseker etc around 1970s.
Recently a version appeared, so-called "K-stability", introduced by
Tian(1997) and reformulated by Donaldson(2002), by the way of seeking
the analogue of Kobayashi-Hitchin correspondence, which gives
"differential geometric" interpretation of "stability". These two have
subtle but interesting differences in dimension higher than 1.
Contents:
(1*) Any semistable (in any sense) polarized variety should have only
"semi-log-canonical" singularities. (Partly observed around 1970s)
(2) On the other hand, we proved some stabilities, which corresponds to
"Calabi conjecture", also with admitting mild singularities.
As applications these yield
(3*) Compact moduli spaces with GIT interpretations.
(4) Many counterexamples (as orbifolds) to folklore conjecture:
"K-stability implies asymptotic stability".
(*: Some technical points are yet to be settled.
Some parts for (1)(2) are available on arXiv:0910.1794.)