沃恩-李的大小为12的幂零循环是基于有限的

IF 0.6 4区数学 Q3 MATHEMATICS

Algebra Universalis Pub Date : 2023-11-14 DOI:10.1007/s00012-023-00832-6

Peter Mayr

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引用次数: 0

摘要

从Vaughan-Lee在[12]的工作中得出，如果一个有限幂零环分裂成素数幂次因子的直接乘积，则它的方程理论具有有限基础。从那时起，直接分解的条件是否必要一直没有定论。在同一篇论文中，Vaughan-Lee给出了一个明确的12阶幂零循环的例子，它不分解成素数幂次循环，并问它是否是有限基的。通过明确地描述其项函数，我们给出了他的例子的有限基础。这也使我们能够证明这个循环的次幂隶属度问题可以在多项式时间内解决。

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Vaughan-Lee’s nilpotent loop of size 12 is finitely based

From work of Vaughan-Lee in [12] it follows that if a finite nilpotent loop splits into a direct product of factors of prime power order, then its equational theory has a finite basis. Whether the condition on the direct decomposition is necessary has remained open since. In the same paper, Vaughan-Lee gives an explicit example of a nilpotent loop of order 12 that does not factor into loops of prime power order and asks whether it is finitely based. We give a finite basis for his example by explicitly characterizing its term functions. This also allows us to show that the subpower membership problem for this loop can be solved in polynomial time.

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来源期刊

Algebra Universalis 数学-数学

CiteScore

1.00

自引率

16.70%

发文量

审稿时长

3 months

期刊介绍： Algebra Universalis publishes papers in universal algebra, lattice theory, and related fields. In a pragmatic way, one could define the areas of interest of the journal as the union of the areas of interest of the members of the Editorial Board. In addition to research papers, we are also interested in publishing high quality survey articles.