Adams运算的Riemann-Roch定理

IF 0.8 4区 数学 Q2 MATHEMATICS Expositiones Mathematicae Pub Date : 2023-08-01 DOI:10.1016/j.exmath.2023.07.002
A. Navarro , J. Navarro
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引用次数: 0

摘要

我们证明了k理论上Adams运算的经典Riemann-Roch定理:一个在Z[j−1]上有系数的命题,它适用于任意射影态射,以及另一个具有积分系数的命题,它适用于闭浸入。在有理系数存在的情况下,我们还分析了一个Adams运算对应的Riemann-Roch公式与chen特征的类似公式之间的关系。为了做到这一点,我们完成了对Panin-Smirnov的工作的基本阐述,这是由第一作者在前一篇论文中发起的。他们关于代数变异的有向上同论的概念允许使用经典论证来证明一般和整齐的陈述,这意味着所有上述结果都是特殊情况。
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The Riemann–Roch theorem for the Adams operations

We prove the classical Riemann–Roch theorems for the Adams operations ψj on K-theory: a statement with coefficients on Z[j1], that holds for arbitrary projective morphisms, as well as another statement with integral coefficients, that is valid for closed immersions. In presence of rational coefficients, we also analyze the relation between the corresponding Riemann–Roch formula for one Adams operation and the analogous formula for the Chern character. To do so, we complete the elementary exposition of the work of Panin–Smirnov that was initiated by the first author in a previous paper. Their notion of oriented cohomology theory on algebraic varieties allows to use classical arguments to prove general and neat statements, which imply all the aforementioned results as particular cases.

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来源期刊
CiteScore
1.30
自引率
0.00%
发文量
41
审稿时长
40 days
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