Transversely K\"ahler almost contact metric Lie algebras

Abstract

We study transversely K\"ahler almost contact metric Lie algebras (g,,,η,g) such that the structure 1-form η is a contact form. They include both quasi Sasakian and anti-quasi-Sasakian Lie algebras of maximal rank. In the case where the center of the Lie algebra is nontrivial, they are 1-dimensional central extensions of K\"ahler Lie algebras via a symplectic form. We investigate the 5-dimensional case, obtaining a classification of η-Einstein transversely K\"ahler almost contact metric Lie algebras of maximal rank. If the center is trivial, the structure is always α-Sasakian. If the center is nontrivial and the K\"ahler quotient g/z(g) is not abelian, the structure is quasi Sasakian; it is α-Sasakian on central extensions of K\"ahler-Einstein 4-dimensional Lie algebras, and not conversely. Up to isomorphisms, the Heisenberg Lie algebra h5 is the only 5-dimensional Lie algebra admitting η-Einstein transversely K\"ahler structures which are not quasi Sasakian, including anti-quasi-Sasakian structures. In fact, we show that any 5-dimensional anti-quasi-Sasakian Lie algebra is isomorphic to h5.