Fuchs' problem for endomorphisms of nonabelian groups

Abstract

In 1960, L\'aszl\'o Fuchs posed the problem of determining which groups G are realizable as the group of units in some ring R. In chebolu2022fuchs, we investigated the following variant of Fuchs' problem, for abelian groups: which groups G are realized by a ring R where every group endomorphism of G is induced by a ring endomorphism of R? Such groups are called fully realizable. In this paper, we answer the aforementioned question for several families of nonabelian groups: symmetric, dihedral, quaternion, alternating, and simple groups; almost cyclic p-groups; and groups whose Sylow 2-subgroup is either cyclic or normal and abelian. We construct three infinite families of fully realizable nonabelian groups using iterated semidirect products.