Non-trivial m-quasi-Einstein metrics on simple Lie groups

Abstract

We call a metric m-quasi-Einstein if RicXm, which replaces a gradient of a smooth function f by a vector field X in m-Bakry-Emery Ricci tensor, is a constant multiple of the metric tensor. It is a generalization of Einstein metrics which contains Ricci solitons. In this paper, we focus on left-invariant metrics on simple Lie groups. First, we prove that X is a left-invariant Killing vector field if the metric on a compact simple Lie group is m-quasi-Einstein. Then we show that every compact simple Lie group admits non-trivial m-quasi-Einstein metrics except SU(3), E8 and G2, and most of them admit infinitely many metrics. Naturally, the study on m-quasi-Einstein metrics can be extended to pseudo-Riemannian case. And we prove that every compact simple Lie group admits non-trivial m-quasi-Einstein Lorentzian metrics and most of them admit infinitely many metrics. Finally, we prove that some non-compact simple Lie groups admit infinitely many non-trivial m-quasi-Einstein Lorentzian metrics.