自由周期群中子集的幂

Proceedings of the YSU A: Physical and Mathematical Sciences Pub Date : 2022-07-13 DOI:10.46991/pysu:a/2022.56.2.043

V. S. Atabekyan, H. T. Aslanyan, Satenik T. Aslanyan

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引用次数: 0

摘要

证明了对于每一个奇数$n \ge 1039$，在自由Burnside群$B(2 ,n),$的群字母表$\{x,y\}$上有两个长度为$\le 658n^2$的单词$u(x, y), v(x,y)$，它们产生了自由Burnside群$B(2,n)$的子群。这意味着对于群$B(m,n)$的任意有限子集$S$，不等式$|S^t|>4\cdot 2.9^{[\frac{t}{658s^2}]}$成立，其中$s$是满足不等式$s\ge1039$的$n$的最小奇约数。

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POWERS OF SUBSETS IN FREE PERIODIC GROUPS

It is proved that for every odd $n \ge 1039$ there are two words $u(x, y), v(x,y)$ of length $\le 658n^2$ over the group alphabet $\{x,y\}$ of the free Burnside group $B(2 ,n),$ which generate a free Burnside subgroup of the group $B(2,n)$. This implies that for any finite subset $S$ of the group $B(m,n)$ the inequality $|S^t|>4\cdot 2.9^{[\frac{t}{658s^2}]}$ holds, where $s$ is the smallest odd divisor of $n$ that satisfies the inequality $s\ge1039$.

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Proceedings of the YSU A: Physical and Mathematical Sciences

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