On recursively differentiable k-quasigroups

Buletinul Academiei de Ştiinţe a Republicii Moldova. Matematica Pub Date : 2023-01-01 DOI:10.56415/basm.y2022.i2.p68

Parascovia Sirbu, Elena Cuznetov

引用次数: 0

Abstract

Recursive differentiability of linear $k$-quasigroups $(k\geq 2)$ is studied in the present work. A $k$-quasigroup is recursively $r$-differentiable (r is a natural number) if its recursive derivatives of order up to $r$ are quasigroup operations. We give necessary and sufficient conditions of recursive $1$-differentiability (respectively, $r$-differentiability) of the $k$-group $(Q,B)$, where $B(x_1,..., x_k)=x_1 \cdot x_2 \cdot ... \cdot x_k , \forall x_1 , x_2 ,..., x_k \in Q,$ and $(Q, \cdot)$ is a finite binary group (respectively, a finite abelian binary group). The second result is a generalization of a known criterion of recursive $r$-differentiability of finite binary abelian groups \cite{IzbashSyrbu}. Also we consider a method of construction of recursively $r$-differentiable finite binary quasigroups of high order $r$. The maximum known values of the parameter $r$ for binary quasigroups of order up to 200 are presented.

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关于递推可微k-拟群

本文研究了线性$k$ -拟群$(k\geq 2)$的递推可微性。一个$k$ -拟群是递归的$r$ -可微的(r是自然数)，如果它的阶递归导数到$r$是拟群运算。给出了$k$ -群$(Q,B)$的递推$1$ -可微性(分别为$r$ -可微性)的充分必要条件，其中$B(x_1,..., x_k)=x_1 \cdot x_2 \cdot ... \cdot x_k , \forall x_1 , x_2 ,..., x_k \in Q,$和$(Q, \cdot)$是有限二元群(分别为有限阿贝尔二元群)。第二个结果是推广了已知的有限二元阿贝尔群的递推$r$ -可微性准则\cite{IzbashSyrbu}。同时考虑了高阶$r$的递归$r$可微有限二元拟群的构造方法。给出了200阶以下二元拟群参数$r$的最大已知值。

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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Buletinul Academiei de Ştiinţe a Republicii Moldova. Matematica

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