On non-gradient (m,)-quasi-Einstein contact metric manifolds

Abstract

Many authors have studied Ricci solitons and their analogs within the framework of (almost) contact geometry. In this article, we thoroughly study the (m,)-quasi-Einstein structure on a contact metric manifold. First, we prove that if a K-contact or Sasakian manifold M2n+1 admits a closed (m,)-quasi-Einstein structure, then it is an Einstein manifold of constant scalar curvature 2n(2n+1), and for the particular case -- a non-Sasakian (k,μ)-contact structure -- it is locally isometric to the product of a Euclidean space n+1 and a sphere Sn of constant curvature 4. Next, we prove that if a compact contact or H-contact metric manifold admits an (m,)-quasi-Einstein structure, whose potential vector field V is collinear to the Reeb vector field, then it is a K-contact η-Einstein manifold.