Periods of Real Biextensions

Richard Hain
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Abstract

A real biextension is a real mixed Hodge structure that is an extension of R(0) by a mixed Hodge structure with weights $-1$ and $-2$. A unipotent real biextension over an algebraic manifold is a variation of mixed Hodge structure over it, each of whose fibers is a real biextension and whose weight graded quotients are do not vary. We show that if a unipotent real biextension has non abelian monodromy, then its ``general fiber'' does not split. This result is a tool for investigating the boundary behaviour of normal functions and is applied in arXiv:2408.07809 to study the boundary behaviour of the normal function of the Ceresa cycle.
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实际双延期的周期
实双延是实混合霍奇结构,它是权值为$-1$和$-2$的混合霍奇结构对R(0)的扩展。代数流形上的单能实双延是混合霍奇结构在代数流形上的变异,其每个纤维都是实双延,其权重梯度平方不变化。我们证明,如果一个单能实双延具有非阿贝尔单色性,那么它的 "一般纤维 "不会分裂。这一结果是研究正函数边界行为的工具,并在 arXiv:2408.07809 中被应用于研究 Ceresa 循环的正函数边界行为。
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