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引用次数: 1
摘要
本文研究了给定Abelian变量上的半齐次向量束的连续Castelnuovo-Mumford正则性,该正则性由a . k ronya和Y. Mustopa [Adv. Geom. 20 (2020), no. 1]表述。3, 401 - 412]。我们的主要结果给出了一个新颖的描述。通过对阿贝尔变体的内模代数的Wedderburn分解得到若干归一化多项式函数。该结果建立在Mumford和Kempf早期工作的基础上,并应用了N. Grieve建立的Riemann-Roch定理的形式[New York J. Math. 23(2017), 1087-1110]。在补充的方向上,我们解释了这些主题如何与简单半齐次向量束的索引和一般消失理论条件相关联。在此过程中,我们改进了M. Gulbrandsen [Matematiche (Catania) 63 (2008), no。[j] .中国科学:国际科学。数学学报,25(2014),第1期。D. Mumford[关于代数变量的问题(c.m.e, III Ciclo, Varenna, 1969),罗马,1970,pp. 29-100]。
Wedderburn components, the index theorem and continuous Castelnuovo-Mumford regularity for semihomogeneous vector bundles
Abstract We study the property of continuous Castelnuovo-Mumford regularity, for semihomogeneous vector bundles over a given Abelian variety, which was formulated in A. Küronya and Y. Mustopa [Adv. Geom. 20 (2020), no. 3, 401-412]. Our main result gives a novel description thereof. It is expressed in terms of certain normalized polynomial functions that are obtained via the Wedderburn decomposition of the Abelian variety’s endo-morphism algebra. This result builds on earlier work of Mumford and Kempf and applies the form of the Riemann-Roch Theorem that was established in N. Grieve [New York J. Math. 23 (2017), 1087-1110]. In a complementary direction, we explain how these topics pertain to the Index and Generic Vanishing Theory conditions for simple semihomogeneous vector bundles. In doing so, we refine results from M. Gulbrandsen [Matematiche (Catania) 63 (2008), no. 1, 123–137], N. Grieve [Internat. J. Math. 25 (2014), no. 4, 1450036, 31] and D. Mumford [Questions on Algebraic Varieties (C.I.M.E., III Ciclo, Varenna, 1969), Edizioni Cremonese, Rome, 1970, pp. 29-100].
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