clwx2 -代数的同伦泊松代数、Maurer-Cartan元和Dirac结构

IF 0.7 2区 数学 Q2 MATHEMATICS Journal of Noncommutative Geometry Pub Date : 2020-01-06 DOI:10.4171/JNCG/398
Jiefeng Liu, Y. Sheng
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引用次数: 0

摘要

本文构造了一个与分裂Lie-2-代数簇相关的3次同伦Poisson代数,并由此给出了一个刻画分裂Lie-2代数簇的新方法。我们发展了与分裂Lie-2-algebroid相关的微分学,并建立了分裂Lie-2-代数的Manin三重理论。更确切地说,我们给出了严格Dirac结构的概念,并将分裂Lie-2-代数丛的Manin三重定义为具有两个横向严格Dirac构造的CLWX2-代数丛。我们证明了分裂Lie-2-algebroids和分裂Lie-2-代数broids的Manin三元组之间存在一一对应关系。我们进一步引入了CLWX2-代数丛的弱Dirac结构的概念,并证明了与分裂Lie-2-代数丛相关的3阶同伦Poisson代数的Maurer-Cartan元素的图是弱Dirac构造。给出了各种例子,包括串李2-代数、由可积分布构造的分裂李2-代数和左对称代数体。
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Homotopy Poisson algebras, Maurer–Cartan elements and Dirac structures of CLWX 2-algebroids
In this paper, we construct a homotopy Poisson algebra of degree 3 associated to a split Lie 2-algebroid, by which we give a new approach to characterize a split Lie 2-bialgebroid. We develop the differential calculus associated to a split Lie 2-algebroid and establish the Manin triple theory for split Lie 2-algebroids. More precisely, we give the notion of a strict Dirac structure and define a Manin triple for split Lie 2-algebroids to be a CLWX 2-algebroid with two transversal strict Dirac structures. We show that there is a one-to-one correspondence between Manin triples for split Lie 2-algebroids and split Lie 2-bialgebroids. We further introduce the notion of a weak Dirac structure of a CLWX 2-algebroid and show that the graph of a Maurer-Cartan element of the homotopy Poisson algebra of degree 3 associated to a split Lie 2-bialgebroid is a weak Dirac structure. Various examples including the string Lie 2-algebra, split Lie 2-algebroids constructed from integrable distributions and left-symmetric algebroids are given.
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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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