Boundedly finite conjugacy classes of tensors.

R. Bastos, C. Monetta
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Abstract

Let $n$ be a positive integer and let $G$ be a group. We denote by $\nu(G)$ a certain extension of the non-abelian tensor square $G \otimes G$ by $G \times G$. Set $T_{\otimes}(G) = \{g \otimes h \mid g,h \in G\}$. We prove that if the size of the conjugacy class $\left |x^{\nu(G)} \right| \leq n$ for every $x \in T_{\otimes}(G)$, then the second derived subgroup $\nu(G)''$ is finite with $n$-bounded order. Moreover, we obtain a sufficient condition for a group to be a BFC-group.
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张量的有界有限共轭类。
设$n$为正整数,设$G$为一个组。我们用$\nu(G)$表示非阿贝尔张量平方的某个扩展$G \otimes G$乘以$G \times G$。设置$T_{\otimes}(G) = \{g \otimes h \mid g,h \in G\}$。证明了如果共轭类$\left |x^{\nu(G)} \right| \leq n$对于每一个$x \in T_{\otimes}(G)$的大小,则第二派生子群$\nu(G)''$是有限的,阶为$n$ -有界。此外,还得到了群为bfc群的充分条件。
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