Groups with soluble minimax conjugate classes of subgroups

A classical result of Neumann characterizes the groups in which each subgroup has finitely many conjugates only as central-by-finite groups. If $\mathfrak{X}$ is a class of groups, a group $G$ is said to have $\mathfrak{X}$-conjugate classes ofsubgroups if $G/core_G(N_G(H)) \in \mathfrak{X}$ for each subgroup $H$ of $G$. Here we study groups which have soluble minimax conjugate classes of subgroups,giving a description in terms of $G/Z(G)$. We also characterize $FC$-groupswhich have soluble minimax conjugate classes of subgroups.