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Bondal–Orlov’s reconstruction theorem in noncommutative projective geometry

组织者

斯拉瓦·皮缅诺夫 , 安吉尔·托莱多

演讲者

Yuki Mizuno

时间

2026年04月13日 16:00 至 17:00

地点

A3-1-301

线上

Zoom 559 700 6085 (BIMSA)

摘要

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 in the setting of noncommutative projective geometry.