Let G be a group and α ϵ Aut(G).  An α-commutator of elements x, y ϵ G is defined as [x, y]_α = x^-1y^-1xy^α. In 2015, Barzegar et al. introduced an α-commutator of elements of G and defined a new generalization of nilpotent groups by using the definition of α-commutators which is called an α-nilpotent group. They also introduced an α-commutator subgroup of G, denoted by D_α(G) which is a subgroup generated by all α-commutators. In 2016, an α-perfect group, a group that is equal to its α-commutator subgroup, was introduced by authors of this paper and the properties of such group was investigated. They proved some results on α-perfect abelian groups and showed that a cyclic group G of even order is not α-perfect for any α ϵ Aut(G). In this paper, we may continue our investigation on α-perfect groups and in addition to studying the relative perfectness of some classes of finite p-groups, we provide an example of a non-abelian α-perfect 2-group.

P. Hegarty, "The absolute centre of a group," J. Algebra, vol. 169, p. 929–935, 1994.

R. Barzegar and A. Erfanian, "Nilpotency and solubility of groups relative to an automorphism," Caspian J. Math. Sci., vol. 4, no. 2, pp. 271-281, 2015.

A. Erfanian and M. Ganjali, "Nilpotent groups related to an automorphism," 1–12, 2018.

M. Ganjali and A. Erfanian, "Perfect groups and normal subgroups related to an automorphism," Ricerche Mat, pp. 1-7, 2016.