Groups in which every non-Abelian subgroup is permutable. (Q2568665)

A subgroup \(H\) of a group \(G\) is `permutable' if \(HX=XH\) for every subgroup \(X\) of \(G\), a group is `quasi-Hamiltonian' if every subgroup is permutable, and a group is `meta-quasi-Hamiltonian' if every subgroup is either Abelian or permutable. The following theorem is proved: Let \(G\) be a locally graded meta-quasi-Hamiltonian group. Then \(G\) contains a finite normal subgroup \(N\) such that the factor \(G/N\) is quasi-Hamiltonian. Moreover, \(G\) is solvable with derived length at most \(4\).