Eight-Dimensional Hermitian Lie Groups Conformally Foliated by Minimal SU(2) × SU(2) Leaves

Abstract

We investigate the 8-dimensional Riemannian Lie groups G8, carrying a left-invariant, conformal and minimal foliation F, with leaves diffeomorphic to the subgroup SU(2) × SU(2) of G8. Such groups have been classified by E. Ghandour, S. Gudmundsson and T. Turner in their recent work. They show that these 8-dimensional Lie groups form a real 13-dimensional family. For each left-invariant Hermitian structure JV on SU(2) × SU(2), we extend this to an almost Hermitian structures J on G adapted to the foliation F i.e. respecting the leaf structure on G induced by F. We then classify those 8-dimensional Lie groups G for which the almost Hermitian structures J are integrable (W34), semi-K\"ahler (W4), locally conformal K\"ahler (W3) or even K\"ahler (K). It turns out that for each JV we obtain a 9-dimensional family of Lie groups G for which J is integrable. In the case of J being semi-K\"ahler, we yield a 3-dimensional family of such groups. We then show that in the cases of J being K\"ahler or locally conformal K\"ahler there are no solutions i.e. such 8-dimensional Lie groups do not exist.