ON INNER AUTOMORPHISMS AND CENTRAL AUTOMORPHISMS OF NILPOTENT GROUP OF CLASS 2

Let G be a group and let Aut(c)(G) be the group of all central automorphisms of G. Let C* = C(Autc(G))(Z(G)) be the set of all central automorphisms of G fixing Z(G) elementwise. In this paper, we prove that if G is a finitely generated nilpotent group of class 2, then C* similar or equal to Inn(G) if and only if Z(G) is cyclic or Z(G) similar or equal to C(m) x Z(r) where G/Z(G) has exponent dividing m and r is torsion-free rank of Z(G). Also we prove that if G is a finitely generated group which is not torsion-free, then C* = Inn(G) if and only if G is nilpotent group of class 2 and Z(G) is cyclic or Z(G) similar or equal to C(m) x Z(r) where G/Z(G) has exponent dividing m and r is torsion-free rank of Z(G). In both cases, we show G has a particularly simple form.