Commuting Probability of Compact Groups

Alireza Abdollahi, Meisam soleimani Malekan

Published 2021-03-21Version 1

For any (Hausdorff) compact group $G$ with the normalized Haar measure ${\mathbf m}_G$, denote by ${\rm cp}(G)$ the probability ${\mathbf m}_{G\times G}(\{(x,y)\in G\times G \;|\; xy=yx\})$ of commuting a randomly chosen pair of elements of $G$. It is proved that there exists a finite group $H$ such that ${\rm cp}(G)= \frac{{\rm cp}(H)}{|G:FC(G)|^2}$, where $FC(G)$ is the FC-center of $G$ i.e. the set of all elements of $G$ whose conjugacy classes are finite and $H$ is isoclinic to $FC(G)$, with the usual convention that if $|G:FC(G)|$ is infinite, then $\frac{1}{|G:FC(G)|}=0$. The latter equality enables one to transfer many existing results concerning commuting probability of finite groups to one of compact groups. For example, here for a compact group $G$ we prove that if ${\rm cp}(G)>\frac{3}{40}$ then either $G$ is solvable or, else $G\cong A_5 \times T$ for some abelian group $T$, in which case ${\rm cp}(G)=\frac{1}{12}$; where $A_5$ denotes the alternating group of degree $5$.