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科学研究
The Moduli Space of Cubic Surface Pairs Via the Intermediate Jacobians of Eckardt Cubic Threefolds
发布时间:2021-11-09浏览次数:

题目:The Moduli Space of Cubic Surface Pairs Via the Intermediate Jacobians of Eckardt Cubic Threefolds

报告人:张正 助理教授 (上海科技大学)

地点:宁静楼115室

时间:2021年11月12日(星期五) 10:00-11:00

摘要:We study the moduli space of pairs consisting of a smooth cubic surface and a transverse plane via a period map. More specifically, the construction associates to a cubic surface pair a so-called Eckardt cubic threefold which admits an involution, and the period map sends the pair to the anti-invariant part of the intermediate Jacobian. Our main result is that the global Torelli theorem holds for the period map (in other words, the period map is injective). The key ingredients of the proof include a description of the anti-invariant part of the intermediate Jacobian as a Prym variety of a branched cover and a detailed study of certain positive dimensional fibers of the corresponding Prym map. This is joint work with S. Casalaina-Martin.

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