A class of Sasakian 5-manifolds

Abstract

We obtain some general results on Sasakian Lie algebras and prove as a consequence that a (2n + 1)-dimensional nilpotent Lie group admitting left-invariant Sasakian structures is isomorphic to the real Heisenberg group H2n + 1. Furthermore, we classify Sasakian Lie algebras of dimension 5 and determine which of them carry a Sasakian α-Einstein structure. We show that a 5-dimensional solvable Lie group with a left-invariant Sasakian structure and which admits a compact quotient by a discrete subgroup is isomorphic to either H5 or a semidirect product (H3 × ). In particular, the compact quotient is an S1-bundle over a 4-dimensional K\"ahler solvmanifold.