On solvability of groups with a finite nilpotent supercomplemented subgroup. (Q548777)

A subgroup \(A\) of a group \(G\) is said to be complemented if there exists a subgroup \(B\) of \(G\) such that \(G=AB\) and \(A\cap B=\{1\}\); a subgroup \(H\) of \(G\) is called supercomplemented (in \(G\)) if each subgroup of \(G\) containing \(H\) is complemented. The main result of this paper is: Let \(G\) be an RN-group (or a periodic locally graded group without elements of order \(2\)) with a finite nilpotent supercomplemented subgroup. Then \(G\) is locally finite, solvable and residually finite.