中间乘法卷积和超几何方程

IF 0.4 Q4 MATHEMATICS Journal of Singularities Pub Date : 2018-09-24 DOI:10.5427/jsing.2021.23k

Nicolas Martin

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引用次数: 4

摘要

利用Katz建立的一个关系，将可加性卷积和乘法卷积联系起来，我们明确了一些Hodge不变量通过中间乘法卷积的行为，在可加性情况下遵循[DS13]和[Mar18a]。此外，主要定理给出了Fedorov计算超几何方程Hodge不变量的结果的一个新的证明。

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Middle multiplicative convolution and hypergeometric equations

Using a relation due to Katz linking up additive and multiplicative convolutions, we make explicit the behaviour of some Hodge invariants by middle multiplicative convolution, following [DS13] and [Mar18a] in the additive case. Moreover, the main theorem gives a new proof of a result of Fedorov computing the Hodge invariants of hypergeometric equations.

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