Hochschild cohomology for free semigroup algebras

Linzhe Huang, Minghui Ma, Xiaomin Wei
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Abstract

This paper focuses on the cohomology of operator algebras associated with the free semigroup generated by the set $\{z_{\alpha}\}_{\alpha\in\Lambda}$, with the left regular free semigroup algebra $\mathfrak{L}_{\Lambda}$ and the non-commutative disc algebra $\mathfrak{A}_{\Lambda}$ serving as two typical examples. We establish that all derivations of these algebras are automatically continuous. By introducing a novel computational approach, we demonstrate that the first Hochschild cohomology group of $\mathfrak{A}_{\Lambda}$ with coefficients in $\mathfrak{L}_{\Lambda}$ is zero. Utilizing the Ces\`aro operators and conditional expectations, we show that the first normal cohomology group of $\mathfrak{L}_{\Lambda}$ is trivial. Finally, we prove that the higher cohomology groups of the non-commutative disc algebras with coefficients in the complex field vanish when $|\Lambda|<\infty$. These methods extend to compute the cohomology groups of a specific class of operator algebras generated by the left regular representations of cancellative semigroups, which notably include Thompson's semigroup.
自由半群代数的 Hochschild 同调
本文主要研究与集合 $\{z_{\alpha}\}_{\alpha\in\Lambda}$ 所产生的自由半群相关的算子代数的同调,其中左正规自由半群代数 $\mathfrak{L}_{\Lambda}$ 和非交换圆盘代数 $\mathfrak{A}_{\Lambda}$ 是两个典型的例子。我们确定这些代数的所有推导都是自动连续的。通过引入一种新颖的计算方法,我们证明了$\mathfrak{A}_{\Lambda}$中系数为$\mathfrak{L}_{\Lambda}$的第一个霍希尔德同调群为零。利用 Ces\`arooperators 和条件期望,我们证明了 $\mathfrak{L}_{\Lambda}$ 的第一法向同调群是微不足道的。最后,我们证明了当$|\Lambda|<\infty$消失时,复域中有系数的非交换圆盘代数的高次同调群也消失了。这些方法可以扩展到计算由可注解半群的左正则表示生成的一类特定算子数组的同调群,其中主要包括汤普森半群。
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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