A characterization of crossed self-similarity on crossed modules in L-algebras

IF 0.6 4区 数学 Q2 LOGIC
Selim Çetin, Utku Gürdal
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引用次数: 0

Abstract

We introduce crossed modules in cycloids, as a generalization of cycloids, which are algebraic logical structures arising in the context of the quantum Yang–Baxter equation. As a spacial case, we in particular focus on the crossed modules of $L-$algebras. These types of crossed modules are exceptional, since the category of $L-$algebras is not protomodular, nor Barr-exact, but it nevertheless has natural semidirect products that have not been described in category theoretic terms. We identify crossed ideals of crossed module in $L-$algebras, and obtain some characteristics of these objects that are normally not encountered on crossed modules of groups or algebras. As a consequence, we characterize crossed self-similarity completely in terms of properties of $L-$algebras and the boundary map forming the crossed module.
L代数中交叉模块上交叉自相似性的表征
我们介绍了环状体中的交叉模块,作为环状体的广义化,环状体是量子杨-巴克斯特方程背景下产生的代数逻辑结构。作为一种空间情况,我们特别关注 $L-$ 算法的交叉模块。这些类型的交叉模块是特殊的,因为 $L-$ 算法的范畴不是原模态的,也不是巴尔精确的,但它却有天然的半直接积,而这些半直接积还没有用范畴论的术语来描述过。我们确定了 $L-$ 算法中交叉模块的交叉理想,并获得了这些对象的一些特征,而这些特征通常不会在群或代数的交叉模块中遇到。因此,我们完全可以用 $L-$ 算法和形成交叉模块的边界映射的性质来描述交叉自相似性。
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来源期刊
CiteScore
2.60
自引率
10.00%
发文量
76
审稿时长
6-12 weeks
期刊介绍: Logic Journal of the IGPL publishes papers in all areas of pure and applied logic, including pure logical systems, proof theory, model theory, recursion theory, type theory, nonclassical logics, nonmonotonic logic, numerical and uncertainty reasoning, logic and AI, foundations of logic programming, logic and computation, logic and language, and logic engineering. Logic Journal of the IGPL is published under licence from Professor Dov Gabbay as owner of the journal.
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