广义树状代数的极化与变形

IF 0.7 2区 数学 Q2 MATHEMATICS Journal of Noncommutative Geometry Pub Date : 2019-12-19 DOI:10.4171/jncg/449
Cyrille Ospel, F. Panaite, P. Vanhaecke
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引用次数: 2

摘要

我们将M.Aguiar的三个结果推广到任意的树状代数,即与满足任何给定关系集的代数相关的树状代数。我们使用双模性质定义了这些树状代数,并展示了如何容易地确定树状关系。我们使用的一个重要概念是代数的极化概念,我们在这里将其推广到(任意)树状代数:它导致了Aguiar的两个结果的推广,涉及树状代数的变形和过滤。我们还引入了任意代数的弱Rota-Baxter算子,这导致了广义树状代数的构造,并推广了Aguiar的第三个结果,该结果从树状代数的角度解释了无穷小双代数和前李代数之间的自然关系。在整个文本中,我们给出了许多例子,并展示了它们之间的关系。
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Polarization and deformations of generalized dendriform algebras
We generalize three results of M. Aguiar, which are valid for Loday's dendriform algebras, to arbitrary dendriform algebras, i.e., dendriform algebras associated to algebras satisfying any given set of relations. We define these dendriform algebras using a bimodule property and show how the dendriform relations are easily determined. An important concept which we use is the notion of polarization of an algebra, which we generalize here to (arbitrary) dendriform algebras: it leads to a generalization of two of Aguiar's results, dealing with deformations and filtrations of dendriform algebras. We also introduce weak Rota-Baxter operators for arbitrary algebras, which lead to the construction of generalized dendriform algebras and to a generalization of Aguiar's third result, which provides an interpretation of the natural relation between infinitesimal bialgebras and pre-Lie algebras in terms of dendriform algebras. Throughout the text, we give many examples and show how they are related.
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来源期刊
CiteScore
1.60
自引率
11.10%
发文量
30
审稿时长
>12 weeks
期刊介绍: The Journal of Noncommutative Geometry covers the noncommutative world in all its aspects. It is devoted to publication of research articles which represent major advances in the area of noncommutative geometry and its applications to other fields of mathematics and theoretical physics. Topics covered include in particular: Hochschild and cyclic cohomology K-theory and index theory Measure theory and topology of noncommutative spaces, operator algebras Spectral geometry of noncommutative spaces Noncommutative algebraic geometry Hopf algebras and quantum groups Foliations, groupoids, stacks, gerbes Deformations and quantization Noncommutative spaces in number theory and arithmetic geometry Noncommutative geometry in physics: QFT, renormalization, gauge theory, string theory, gravity, mirror symmetry, solid state physics, statistical mechanics.
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