Zero cycles on the moduli space of curves

Pub Date : 2019-05-02 DOI:10.46298/epiga.2020.volume4.5601

R. Pandharipande, Johannes Schmitt

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引用次数: 6

Abstract

While the Chow groups of 0-dimensional cycles on the moduli spaces of Deligne-Mumford stable pointed curves can be very complicated, the span of the 0-dimensional tautological cycles is always of rank 1. The question of whether a given moduli point [C,p_1,...,p_n] determines a tautological 0-cycle is subtle. Our main results address the question for curves on rational and K3 surfaces. If C is a nonsingular curve on a nonsingular rational surface of positive degree with respect to the anticanonical class, we prove [C,p_1,...,p_n] is tautological if the number of markings does not exceed the virtual dimension in Gromov-Witten theory of the moduli space of stable maps. If C is a nonsingular curve on a K3 surface, we prove [C,p_1,...,p_n] is tautological if the number of markings does not exceed the genus of C and every marking is a Beauville-Voisin point. The latter result provides a connection between the rank 1 tautological 0-cycles on the moduli of curves and the rank 1 tautological 0-cycles on K3 surfaces. Several further results related to tautological 0-cycles on the moduli spaces of curves are proven. Many open questions concerning the moduli points of curves on other surfaces (Abelian, Enriques, general type) are discussed. Comment: Published version

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曲线模量空间上的零循环

虽然Deligne-Mumford稳定尖曲线模空间上的0维循环的Chow群可能非常复杂，但0维重言循环的跨度总是秩为1。给定模点[C，p_1，…，p_n]是否决定了一个重言循环问题。我们的主要结果解决了有理曲面和K3曲面上的曲线问题。如果C是关于反正则类的正度非奇异有理表面上的非奇异曲线，我们证明了[C，p_1，…，p_n]是重言的，如果标记的数量不超过稳定映射模空间Gromov-Witten理论中的虚维数。如果C是K3曲面上的非奇异曲线，我们证明了[C，p_1，…，p_n]是自治的，如果标记的数量不超过C的亏格，并且每个标记都是Beauville-Voisin点。后一个结果提供了曲线模量上的秩为1的重言0-循环和K3表面上的秩1的自逻辑0-循环之间的联系。证明了曲线模空间上与自逻辑0循环有关的几个进一步结果。讨论了其他曲面（Abelian，Enriques，一般型）上曲线的模点的许多悬而未决的问题。注释：已发布版本

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