Divided powers in the Witt ring of symmetric bilinear forms

IF 0.5 Q3 MATHEMATICS Annals of K-Theory Pub Date : 2022-09-18 DOI:10.2140/akt.2023.8.275
B. Totaro
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引用次数: 0

Abstract

The Witt ring of symmetric bilinear forms over a field has divided power operations. On the other hand, it follows from Garibaldi-Merkurjev-Serre's work on cohomological invariants that all operations on the Witt ring are essentially linear combinations of exterior powers. We find the explicit formula for the divided powers as a linear combination of exterior powers. The coefficients involve the ``tangent numbers'', related to Bernoulli numbers. The divided powers on the Witt ring give another construction of the divided powers on Milnor K-theory modulo 2.
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对称双线性形式Witt环的幂除法
域上对称双线性形式的Witt环具有除幂运算。另一方面,根据Garibaldi-Merkurjev-Serre关于上同调不变量的研究,Witt环上的所有运算本质上都是外幂的线性组合。我们发现幂的显式公式是外部幂的线性组合。系数涉及到与伯努利数相关的“正切数”。Witt环上的分幂给出了Milnor k理论模2上的分幂的另一种构造。
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来源期刊
Annals of K-Theory
Annals of K-Theory MATHEMATICS-
CiteScore
1.10
自引率
0.00%
发文量
12
期刊最新文献
Analytic cyclic homology in positive characteristic Prorepresentability of KM-cohomology in weight 3 generalizing a result of Bloch Divided powers in the Witt ring of symmetric bilinear forms On classification of nonunital amenable simple C∗-algebras, III : The range and the reduction Degree 3 relative invariant for unitary involutions
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