Classification of Gradient Ricci solitons with harmonic Weyl curvature

Abstract

We make classifications of gradient Ricci solitons (M, g, f) with harmonic Weyl curvature. As a local classification, we prove that the soliton metric g is locally isometric to one of the following four types: an Einstein manifold, the Riemannian product of a Ricci flat manifold and an Einstein manifold, a warped product of R and an Einstein manifold, and a singular warped product of R2 and a Ricci flat manifold. Compared with the previous four-dimensional study in Ki, we have developed a novel method of refined adapted frame fields and overcome the main difficulty arising from a large number of Riemmannian connection components in dimension ≥ 5. Next we have obtained a classification of complete gradient Ricci solitons with harmonic Weyl curvature. For the proof, using the real analytic nature of g and f, we elaborate geometric arguments to fit together local regions.