A degree formula for equivariant cohomology rings

IF 0.8 4区 数学 Q2 MATHEMATICS Homology Homotopy and Applications Pub Date : 2022-02-14 DOI:10.4310/hha.2023.v25.n1.a18
Mark Blumstein, J. Duflot
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引用次数: 0

Abstract

This paper generalizes a result of Lynn on the"degree"of an equivariant cohomology ring $H^*_G(X)$. The degree of a graded module is a certain coefficient of its Poincar\'{e} series, and is closely related to multiplicity. In the present paper, we study these commutative algebraic invariants for equivariant cohomology rings. The main theorem is an additivity formula for degree: $$deg(H^*_G(X)) = \sum_{[A,c] \in \mathcal{Q'}_{max}(G,X)}\frac{1}{|W_G(A,c)|} \deg(H^*_{C_G(A,c)}(c)).$$ We also show how this formula relates to the additivity formula from commutative algebra, demonstrating both the algebraic and geometric character of the degree invariant.
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等变上同调环的一个度公式
推广了Lynn关于等变上同环“度”的一个结果$H^*_G(X)$。梯度模的度是其庞卡罗级数的一定系数,与多重性密切相关。本文研究了等变上同调环的交换代数不变量。主要定理是阶的可加性公式:$$deg(H^*_G(X)) = \sum_{[A,c] \in \mathcal{Q'}_{max}(G,X)}\frac{1}{|W_G(A,c)|} \deg(H^*_{C_G(A,c)}(c)).$$我们还展示了这个公式是如何与交换代数中的可加性公式联系起来的,展示了阶不变量的代数和几何特征。
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来源期刊
CiteScore
1.10
自引率
0.00%
发文量
37
审稿时长
>12 weeks
期刊介绍: Homology, Homotopy and Applications is a refereed journal which publishes high-quality papers in the general area of homotopy theory and algebraic topology, as well as applications of the ideas and results in this area. This means applications in the broadest possible sense, i.e. applications to other parts of mathematics such as number theory and algebraic geometry, as well as to areas outside of mathematics, such as computer science, physics, and statistics. Homotopy theory is also intended to be interpreted broadly, including algebraic K-theory, model categories, homotopy theory of varieties, etc. We particularly encourage innovative papers which point the way toward new applications of the subject.
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