利用K理论定位的希尔伯特互易

Pub Date : 2023-04-07 DOI:10.4310/pamq.2023.v19.n2.a1

Oliver Braunling

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引用次数: 0

摘要

通常在$K$理论定位中的边界图只给出$K_2$的驯服符号。它看到了希尔伯特符号中温顺的分支部分，但没有狂野的分支。Gillet展示了如何使用这样的边界图来证明Weil互易性。这意味着有限域上曲线的希尔伯特互易性。然而，以类似的方式描述希尔伯特互易性是失败的，因为它关键地取决于野生分支效应。我们解决了这个问题，除了$p=2$。我们的想法是掐取分支轨迹附近的奇点。这使$K$-理论更加丰富，并使狂野符号作为边界图可见。

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Hilbert reciprocity using $K$-theory localization

Usually the boundary map in $K$-theory localization only gives the tame symbol at $K_2$. It sees the tamely ramified part of the Hilbert symbol, but no wild ramification. Gillet has shown how to prove Weil reciprocity using such boundary maps. This implies Hilbert reciprocity for curves over finite fields. However, phrasing Hilbert reciprocity for number fields in a similar way fails because it crucially hinges on wild ramification effects. We resolve this issue, except at $p=2$. Our idea is to pinch singularities near the ramification locus. This fattens up $K$-theory and makes the wild symbol visible as a boundary map.

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