Equivariant cohomology of odd-dimensional complex quadrics from a combinatorial point of view

Shintaro Kuroki, Bidhan Paul
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Abstract

This paper aims to determine the ring structure of the torus equivariant cohomology of odd-dimensional complex quadrics by computing the graph equivariant cohomology of their corresponding GKM graphs. We show that its graph equivariant cohomology is generated by three types of subgraphs in the GKM graph, which are subject to four different types of relations. Furthermore, we consider the relationship between the two graph equivariant cohomology rings induced by odd- and even-dimensional complex quadrics.
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从组合的角度看奇维复数二次元的等变同调
本文旨在通过计算奇数维复四边形对应的 GKM 图的图变同调来确定其环状结构。我们证明其图等变同调由 GKM 图中的三种子图生成,这三种子图受四种不同类型的关系制约。此外,我们还考虑了奇数维和偶数维复四维图引起的两个图等变同调环之间的关系。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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