Cohomology of left-symmetric color algebras

Yin Chen, Runxuan Zhang
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Abstract

We develop a new cohomology theory for finite-dimensional left-symmetric color algebras and their finite-dimensional bimodules, establishing a connection between Lie color cohomology and left-symmetric color cohomology. We prove that the cohomology of a left-symmetric color algebra $A$ with coefficients in a bimodule $V$ can be computed by a lower degree cohomology of the corresponding Lie color algebra with coefficients in Hom$(A,V)$, generalizing a result of Dzhumadil'daev in right-symmetric cohomology. We also explore the varieties of two-dimensional and three-dimensional left-symmetric color algebras.
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左对称色彩代数的同调性
我们为有限维左对称颜色代数及其有限维双模发展了一种新的同调理论,建立了李氏颜色同调与左对称颜色同调之间的联系。我们证明,左对称颜色代数 $A$ 的系数在双模块 $V$ 中的同调可以通过相应的系数在 Hom$(A,V)$中的列色代数的低度同调来计算,这推广了 Dzhumadil'daev 在右对称同调中的一个结果。我们还探讨了二维和三维左对称颜色代数的品种。
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