Ridigity of Ricci Solitons with Weakly Harmonic Weyl Tensors

Abstract

In this paper, we prove rigidity results on gradient shrinking Ricci solitons with weakly harmonic Weyl curvature tensors. Let (Mn, g) be a compact gradient shrinking Ricci soliton satisfying Ricg + Ddf = g with >0 constant. We show that if (M,g) satisfies δ W (·, ·, ∇ f) = 0, then (M, g) is Einstein. Here W denotes the Weyl curvature tensor. In the case of noncompact, if M is complete and satisfies the same condition, then M is rigid in the sense that M is given by a quotient of product of an Einstein manifold with Euclidean space. These are generalizations of the previous known results in l-r, m-s and p-w3.