On Nilpotent and Solvable Quasi-Einstein Manifolds

Abstract

In this paper, we investigate nilpotent and unimodular solvable Lie groups that admit quasi-Einstein metrics (M,g,X) with X a left-invariant vector field, which we call totally left-invariant quasi-Einstein metrics. We give a complete classification of nilpotent Lie groups admitting such metrics, proving that this occurs if and only if the group is Heisenberg. For unimodular solvable Lie groups S, we show that the existence of a non-flat totally left-invariant quasi-Einstein metric forces the center of S to be one-dimensional. Furthermore, under the additional assumption that the adjoint action ada of S is a normal derivation, we obtain a full classification: these groups are standard and their nilradical must be Heisenberg Lie algebra. As an application, we prove that the only near-horizon geometries on a nilmanifold are Hn, where Hn is n-dimensional Heisenberg Lie group.