A note on Rigidity of Shrinking Gradient Ricci Solitons with Constant Scalar Curvature

Abstract

Let (Mn, g, f) be an n-dimensional complete noncompact gradient shrinking Ricci soliton with the equation Ric+∇2f= 12g. 1. If its scalar curvature is k2, Ricci curvature is nonnegative and sectional curvature has upper bound 12(k-1), we prove that the Ricci shrinker is isometric to a finite quotient of Rn-k× Sk. 2. If M has constant scalar curvature R=n-22, and each level set of f has vanishing Weyl curvature, we prove that it is a finite quotient of R2× Sn-2. This can be seen a generalization of Cheng-Zhou's four dimensional result Cheng-Zhou to high dimension, since the level set of the potential function f has vanishing Weyl curvature automatically when n=4.