On recursively differentiable $k$-quasigroups
Parascovia Syrbu,
Elena Cuzneţov Moldova State University, Department of Mathematics
Аннотация:
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 [4]. 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.
Ключевые слова и фразы:
$k$-ary quasigroup, recursive derivative, recursively differentiable quasigroup.
MSC: 20N05,
20N15,
11T71 Поступила в редакцию: 21.07.2022
Язык публикации: английский
DOI:
10.56415/basm.y2022.i2.p68