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引用次数: 26
摘要
彼得·奥沙利文(Peter O 'Sullivan)的一个显著成果断言,从阿贝变的有理Chow环到它的有理Chow环模数值等价的代数上的外胚允许一个(正则)截面。在Beauville分裂原理的激励下,我们给出了一个猜想的截面性质,该性质预测了对于光滑射影全纯辛变种存在这样一个代数截面,其象包含了该变种的所有chen类。本文研究了具有阿贝尔型Chow动机的(不一定是辛的)变量的这一性质。我们引入了对称区分阿贝尔动机的概念,并利用它为光滑射影变种允许这样的截面提供了充分条件。然后,我们给出了一系列我们的理论适用的变种的例子。例如,我们证明了具有有限秩的Chow群的变种、阿贝尔变种、超椭圆曲线、费马三次超曲面、阿贝尔曲面、Kummer曲面或Picard数至少为19的K3曲面上点的Hilbert格式和广义Kummer变种的任意积的存在性。后一种情况为推测的截面性质提供了证据,并举例说明了全纯辛变量的动机应该表现为阿贝尔变量的动机,作为代数对象。
Distinguished cycles on varieties with motive of abelian type and the Section Property
A remarkable result of Peter O’Sullivan asserts that the algebra epimorphism from the rational Chow ring of an abelian variety to its rational Chow ring modulo numerical equivalence admits a (canonical) section. Motivated by Beauville’s splitting principle, we formulate a conjectural Section Property which predicts that for smooth projective holomorphic symplectic varieties there exists such a section of algebra whose image contains all the Chern classes of the variety. In this paper, we investigate this property for (not necessarily symplectic) varieties with a Chow motive of abelian type. We introduce the notion of a symmetrically distinguished abelian motive and use it to provide a sufficient condition for a smooth projective variety to admit such a section. We then give a series of examples of varieties for which our theory works. For instance, we prove the existence of such a section for arbitrary products of varieties with Chow groups of finite rank, abelian varieties, hyperelliptic curves, Fermat cubic hypersurfaces, Hilbert schemes of points on an abelian surface or a Kummer surface or a K3 surface with Picard number at least 19, and generalized Kummer varieties. The latter cases provide evidence for the conjectural Section Property and exemplify the mantra that the motives of holomorphic symplectic varieties should behave as the motives of abelian varieties, as algebra objects.
期刊介绍:
The Journal of Algebraic Geometry is devoted to research articles in algebraic geometry, singularity theory, and related subjects such as number theory, commutative algebra, projective geometry, complex geometry, and geometric topology.
This journal, published quarterly with articles electronically published individually before appearing in an issue, is distributed by the American Mathematical Society (AMS). In order to take advantage of some features offered for this journal, users will occasionally be linked to pages on the AMS website.