Classification of left invariant Hermitian structures on 4-dimensional non-compact rank one symmetric spaces

Abstract: The only 4-dimensional non-compact rank one symmetric spaces are CH 2 and RH 4 . By the classical results of Heintze, one can model these spaces by real solvable Lie groups with left invariant metrics. In this paper we classify all possible left invariant Hermitian structures on these Lie groups, i.e., left invariant Riemannian metrics and the corresponding Hermitian complex structures. We show that each metric from the classification on CH 2 admits at least four Hermitian complex structures. One class of metr… Show more