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東京名古屋代数セミナー
過去の記録 ~06/06|次回の予定|今後の予定 06/07~
| 担当者 | 阿部 紀行、Aaron Chan、伊山 修、行田 康晃、淺井 聡太、高橋 亮 |
|---|---|
| セミナーURL | http://www.math.nagoya-u.ac.jp/~aaron.chan/TNAseminar.html |
2026年05月27日(水)
16:00-17:30 オンライン開催
水野 雄貴 氏 (Utrecht University)
Bondal–Orlov’s reconstruction theorem in noncommutative projective geometry (Japanese)
http://www.math.nagoya-u.ac.jp/~aaron.chan/TNAseminar.html
水野 雄貴 氏 (Utrecht University)
Bondal–Orlov’s reconstruction theorem in noncommutative projective geometry (Japanese)
[ 講演概要 ]
The (derived) category of coherent sheaves on a scheme encodes rich
information about the underlying geometry. P. Gabriel showed that for
noetherian schemes X and Y, if Coh X and Coh Y are equivalent as abelian
categories, then X and Y are isomorphic. Furthermore, A. Bondal and D.
Orlov proved that for smooth projective schemes X and Y with
(anti-)ample canonical bundles, if D^b(Coh X) and D^b(Coh Y) are
equivalent as triangulated categories, then X and Y are isomorphic. On
the other hand, J.-P. Serre showed that the category of coherent sheaves
on a projective scheme can be described as the quotient category of
finitely generated graded modules over the homogeneous coordinate ring
by the subcategory of torsion modules. Motivated by the results of
Gabriel and Serre, the quotient category of finitely generated graded
modules over a (not necessarily commutative) graded ring by the
subcategory of torsion modules is called a noncommutative projective scheme.
In this talk, I will present an analogue of Bondal–Orlov’s
reconstruction theorem for noncommutative projective geometry.
Furthermore, if time permits, I will discuss recent progress on the
study of the derived autoequivalence groups of noncommutative projective
schemes. Specifically, I will mention a structure result for the derived
autoequivalence groups of certain noncommutative projective planes.
ミーティング ID: 828 6882 8074
パスコード: 131261
[ 講演参考URL ]The (derived) category of coherent sheaves on a scheme encodes rich
information about the underlying geometry. P. Gabriel showed that for
noetherian schemes X and Y, if Coh X and Coh Y are equivalent as abelian
categories, then X and Y are isomorphic. Furthermore, A. Bondal and D.
Orlov proved that for smooth projective schemes X and Y with
(anti-)ample canonical bundles, if D^b(Coh X) and D^b(Coh Y) are
equivalent as triangulated categories, then X and Y are isomorphic. On
the other hand, J.-P. Serre showed that the category of coherent sheaves
on a projective scheme can be described as the quotient category of
finitely generated graded modules over the homogeneous coordinate ring
by the subcategory of torsion modules. Motivated by the results of
Gabriel and Serre, the quotient category of finitely generated graded
modules over a (not necessarily commutative) graded ring by the
subcategory of torsion modules is called a noncommutative projective scheme.
In this talk, I will present an analogue of Bondal–Orlov’s
reconstruction theorem for noncommutative projective geometry.
Furthermore, if time permits, I will discuss recent progress on the
study of the derived autoequivalence groups of noncommutative projective
schemes. Specifically, I will mention a structure result for the derived
autoequivalence groups of certain noncommutative projective planes.
ミーティング ID: 828 6882 8074
パスコード: 131261
http://www.math.nagoya-u.ac.jp/~aaron.chan/TNAseminar.html
