English

Commuting Probability of Compact Groups

Group Theory 2021-04-26 v2 Probability

Abstract

For any (Hausdorff) compact group GG with the normalized Haar measure mG{\mathbf m}_G, denote by cp(G){\rm cp}(G) the probability mG×G({(x,y)G×G    xy=yx}){\mathbf m}_{G\times G}(\{(x,y)\in G\times G \;|\; xy=yx\}) of commuting a randomly chosen pair of elements of GG. Here we prove that if cp(G)>0{\rm cp}(G)>0, then there exists a finite group HH such that cp(G)=cp(H)G:F2{\rm cp}(G)= \frac{{\rm cp}(H)}{|G:F|^2}, where FF is the FC-center of GG i.e. the set of all elements of GG whose conjugacy classes are finite and HH is isoclinic to FF with cp(F)=cp(H){\rm cp}(F)={\rm cp}(H). 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 GG we prove that if cp(G)>340{\rm cp}(G)>\frac{3}{40} then either GG is solvable or, else GA5×TG\cong A_5 \times T for some abelian group TT, in which case cp(G)=112{\rm cp}(G)=\frac{1}{12}; where A5A_5 denotes the alternating group of degree 55.

Keywords

Cite

@article{arxiv.2103.11336,
  title  = {Commuting Probability of Compact Groups},
  author = {Alireza Abdollahi and Meisam soleimani Malekan},
  journal= {arXiv preprint arXiv:2103.11336},
  year   = {2021}
}
R2 v1 2026-06-24T00:23:31.045Z