Maximal nilpotent complex structures

Abstract

Let the pair (g,J) be a nilpotent Lie algebra g (NLA for short) endowed with a nilpotent complex structure J. In this paper, motivated by a question in the work of Cordero, Fern\'andez, Gray and Ugarte, we prove that 2≤ (J) ≤ 3 for (g,J) when (g)=2, where (g) is the step of g and (J) is the unique smallest integer such that a(J)(J)=g as in Definition 1 and 8 of the paper by Cordero, Fern\'andez, Gray and Ugarte. When (g)=3, for arbitrary n ≥ 3, there exists a pair (g,J) such that (J)=Cg=n, for which we call the J in the pair (g,J), satisfying (J)=Cg=n, a maximal nilpotent (MaxN for short) complex structure. The algebraic dimension of a nilmanifold endowed with a left invariant MaxN complex structure is discussed. Furthermore, a structure theorem is proved for the pair (g,J), where (g)=3 and J is a MaxN complex structure.