On derivations of free algebras over operads and the generalized divergence

IF 0.7 2区数学 Q2 MATHEMATICS

Journal of Pure and Applied Algebra Pub Date : 2025-03-18 DOI:10.1016/j.jpaa.2025.107947

Geoffrey Powell

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引用次数: 0

Abstract

For

O

a reduced operad, a generalized divergence from the derivations of a free

O

-algebra to a suitable trace space is constructed. In the case of the Lie operad, this corresponds to Satoh's trace map and, for the associative operad, to the double divergence of Alekseev, Kawazumi, Kuno and Naef. The generalized divergence is shown to be a 1-cocycle for the usual Lie algebra structure on derivations. These results place the previous constructions into a unified framework; moreover, they are natural with respect to the operad.

An important new ingredient is the use of naturality with respect to the category of finite-rank free modules and split monomorphisms over a commutative ring R. This allows the notion of torsion for such functors to be exploited.

Supposing that the ring R is a PID and that the operad

O

is binary, the main result relates the kernel of the generalized divergence to the sub Lie algebra of the Lie algebra of derivations that is generated by the elements of degree one with respect to the grading induced by arity.

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自由代数在操作数上的导数与广义散度

对于约简操作数O，构造了一个从自由O代数的导数到合适迹空间的广义散度。在Lie操作符的情况下，这对应于佐藤的轨迹映射，对于关联操作符，对应于Alekseev， Kawazumi， Kuno和Naef的双重散度。证明了一般李代数结构在导数上的广义散度是一个1环。这些结果将之前的结构置于一个统一的框架中；此外，它们对于操作符来说是自然的。一个重要的新成分是对交换环r上有限秩自由模和分裂单态范畴的自然性的使用，这允许利用这种函子的扭转概念。假设环R为PID，操作数O为二元，主要结果将广义散度的核与由次元对由性诱导的分级所产生的导数的李代数的子李代数联系起来。

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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来源期刊

Journal of Pure and Applied Algebra 数学-数学

CiteScore

1.70

自引率

12.50%

发文量

225

审稿时长

17 days

期刊介绍： The Journal of Pure and Applied Algebra concentrates on that part of algebra likely to be of general mathematical interest: algebraic results with immediate applications, and the development of algebraic theories of sufficiently general relevance to allow for future applications.