On the classification of 4-dimensional (m,)-quasi-Einstein manifolds with harmonic Weyl curvature

Abstract

In this paper we study 4-dimensional (m,)-quasi-Einstein manifolds with harmonic Weyl curvature when m\0,1,-2,∞\ and \14,16\. We prove that a non-trivial (m,)-quasi-Einstein metric g (not necessarily complete) is locally isometric to one of the followings: (i) B2R2(m+2)× N2R(m+1)2(m+2) where B2R2(m+2) is a northern hemisphere in the 2-dimensional sphere S2R2(m+2), Nδ is the 2-dimensional Riemannian manifold with constant curvature δ and R is the constant scalar curvature of g, (ii) D2R2(m+2)×N2R(m+1)2(m+2) where D2R2(m+2) is one half (cut by a hyperbolic line) of the hyperbolic plane H2R2(m+2), (iii) H2R2(m+2)×N2R(m+1)2(m+2), (iv) a certain singular metric with =0, (vi) a locally conformally flat metric. By applying this local classification, we obtain a classification of complete (m,)-quasi-Einstein manifolds under the harmonic Weyl curvature condition. Our result can be viewed as a local classification of gradient Einstein-type manifolds. One corollary of our result is the classification of (λ,4+m)-Einstein manifolds which can be viewed as (m,0)-quasi-Einstein manifolds.