The ascending central series of nilpotent Lie algebras with complex structure

Abstract

We obtain several restrictions on the terms of the ascending central series of a nilpotent Lie algebra g under the presence of a complex structure J. In particular, we find a bound for the dimension of the center of g when it does not contain any non-trivial J-invariant ideal. Thanks to these results, we provide a structural theorem describing the ascending central series of 8-dimensional nilpotent Lie algebras g admitting this particular type of complex structures J. Since our method is constructive, it allows us to describe the complex structure equations that parametrize all such pairs ( g, J).