Algebra with ternary cyclic relations, representations and quark model

IF 1 4区 综合性期刊 Q3 MULTIDISCIPLINARY SCIENCES Proceedings of the Estonian Academy of Sciences Pub Date : 2023-01-01 DOI:10.3176/proc.2023.1.07
Viktor Abramov, Stefan Groote, Priit L¨att
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引用次数: 1

Abstract

We propose a unital associative algebra, which is motivated by a generalization of the Pauli exclusion principle proposed within the framework of the quark model. The generators of this algebra satisfy the following relations: The sum of squares of all generators is equal to zero (binary relation) and the sum of cyclic permutations of factors in any triple product of generators is equal to zero (ternary relations). We study the structure of this algebra and calculate the dimensions of spaces spanned by homogeneous monomials. It is shown how the algebra we propose is related to irreducible representations of the rotation group. Particularly we show that the 10-dimensional space spanned by triple monomials is the space of a double irreducible unitary representation of the rotation group. We use ternary q - and ¯ q -commutators, where q, ¯ q are primitive 3rd order roots of unity, to split the 10-dimensional space spanned by triple monomials into a direct sum of two 5-dimensional subspaces. We endow these subspaces with a Hermitian scalar product by means of an orthonormal basis of triple monomials. In each subspace there is an irreducible unitary representation so (3) → su (5) . We calculate the matrix of this representation and the structure of matrix indicates a possible connection between our algebra and the Georgi-Glashow model.
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具有三元循环关系的代数,表示和夸克模型
在夸克模型的框架内,我们提出了一个由泡利不相容原理推广而来的一元结合代数。这个代数的生成元满足下列关系:所有生成元的平方和等于零(二元关系),生成元的任何三重积中因子的循环置换和等于零(三元关系)。我们研究了这个代数的结构,并计算了齐次单项式张成的空间的维数。证明了我们所提出的代数是如何与旋转群的不可约表示相联系的。特别地,我们证明了由三单项式张成的10维空间是旋转群的二重不可约酉表示的空间。我们使用三元q -和¯q -对易子,其中q,¯q是单位的原始三阶根,将由三重单项式张成的10维空间分割成两个5维子空间的直接和。我们利用三重单项式的标准正交基赋予这些子空间一个厄米标量积。在每个子空间中存在一个不可约的酉表示so(3)→su(5)。我们计算了这种表示的矩阵,矩阵的结构表明我们的代数与george - glashow模型之间可能存在联系。
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来源期刊
Proceedings of the Estonian Academy of Sciences
Proceedings of the Estonian Academy of Sciences 综合性期刊-综合性期刊
CiteScore
1.80
自引率
22.20%
发文量
24
审稿时长
>12 weeks
期刊介绍: The Proceedings of the Estonian Academy of Sciences is an international scientific open access journal published by the Estonian Academy of Sciences in collaboration with the University of Tartu, Tallinn University of Technology, Tallinn University, and the Estonian University of Life Sciences. The journal publishes primary research and review papers in the English language. All articles are provided with short Estonian summaries. All papers to be published in the journal are peer reviewed internationally. The journal is open to word-wide scientific community for publications in all fields of science represented at the Estonian Academy of Sciences and having certain connection with our part of the world, North Europe and the Baltic area in particular.
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