Quasivariety Generated by Free Metabelian and 2-Nilpotent Groups

Let qG be a quasivariety generated by a group G and be a non-Abelian quasivariety of groups with a finite lattice of subquasivarieties. Suppose is contained in a quasivariety generated by the following two groups: a free 2-nilpotent group F₂(₂) of rank 2 and a free metabelian (i.e., with an Abelian commutant) group F₂(₂) of rank 2. It is proved that either = qF₂(₂) or = qF₂(₂) in this instance.__________Translated from Algebra i Logika, Vol. 44, No. 4, pp. 389–398, July–August, 2005.