Jordan - manin三元组的Jordan d -双代数新方法

IF 0.4 4区数学 Q4 MATHEMATICS

Algebra Colloquium Pub Date : 2022-03-20 DOI:10.1142/s100538672300007x

Dongping Hou

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引用次数: 0

摘要

Zhelyabin引入Jordan d双代数。本文利用Jordan代数正则表示的对偶表示的新概念，提出了一种研究Jordan d -双代数的新方法。基于李双代数与Manin三元组之间的本质联系，我们给出了一类特殊的Jordan - Manin三元组与伪欧几里德Jordan代数的双重构造之间的等价性的显式证明。我们还证明了在共边条件下Jordan d双代数可以得到Jordan Yang-Baxter方程，并且Jordan Yang-Baxter方程的反对称非退化解对应于一个反对称双线性形式，我们称之为Jordan代数上的Jordan辛形式。此外，在具有约当辛形式的约当代数上存在一种新的代数结构，称为前约当代数。

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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A New Approach to Jordan D-Bialgebras via Jordan–Manin Triples

Jordan D-bialgebras were introduced by Zhelyabin. In this paper, we use a new approach to study Jordan D-bialgebras by a new notion of the dual representation of the regular representation of a Jordan algebra. Motivated by the essential connection between Lie bialgebras and Manin triples, we give an explicit proof of the equivalence between Jordan D-bialgebras and a class of special Jordan–Manin triples called double constructions of pseudo-euclidean Jordan algebras. We also show that a Jordan D-bialgebra leads to the Jordan Yang–Baxter equation under the coboundary condition and an antisymmetric nondegenerate solution of the Jordan Yang–Baxter equation corresponds to an antisymmetric bilinear form, which we call a Jordan symplectic form on Jordan algebras. Furthermore, there exists a new algebra structure called pre-Jordan algebra on Jordan algebras with a Jordan symplectic form.

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来源期刊

Algebra Colloquium 数学-数学

CiteScore

0.60

自引率

0.00%

发文量

625

审稿时长

15.6 months

期刊介绍： Algebra Colloquium is an international mathematical journal founded at the beginning of 1994. It is edited by the Academy of Mathematics & Systems Science, Chinese Academy of Sciences, jointly with Suzhou University, and published quarterly in English in every March, June, September and December. Algebra Colloquium carries original research articles of high level in the field of pure and applied algebra. Papers from related areas which have applications to algebra are also considered for publication. This journal aims to reflect the latest developments in algebra and promote international academic exchanges.