论霍普夫代数无性扩展同调的有限生成

arXiv - MATH - Quantum Algebra Pub Date : 2024-07-08 DOI:arxiv-2407.05881

Nicolás Andruskiewitsch, Sonia Natale

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引用次数: 0

摘要

如果一个有限维霍普夫代数与霍普夫代数的分裂阿贝尔扩展具有莫里特等价性，那么这个有限维霍普夫代数就被称为准分裂霍普夫代数。结合绍恩伯格（Schauenburg）和尼格隆（Negron）的结果，可以证明每个准分裂有限维霍普夫代数都满足艾廷戈夫和奥斯特里克的有限代同调猜想。这被应用于由安吉奥诺、赫肯伯格和第一作者引入的奇异性质的尖顶霍普夫代数家族，证明它们满足上述猜想。

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On the finite generation of the cohomology of abelian extensions of Hopf algebras

A finite-dimensional Hopf algebra is called quasi-split if it is Morita equivalent to a split abelian extension of Hopf algebras. Combining results of Schauenburg and Negron, it is shown that every quasi-split finite-dimensional Hopf algebra satisfies the finite generation cohomology conjecture of Etingof and Ostrik. This is applied to a family of pointed Hopf algebras in odd characteristic introduced by Angiono, Heckenberger and the first author, proving that they satisfy the aforementioned conjecture.

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arXiv - MATH - Quantum Algebra

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