Four-dimensional shrinkers with nonnegative Ricci curvature

Abstract

In this paper, we investigate classifications of 4-dimensional simply connected complete noncompact nonflat shrinkers satisfying Ric+Hess\,f= 12g with nonnegative Ricci curvature. One one hand, we show that if the sectional curvature K 1/4 or the sum of smallest two eigenvalues of Ricci curvature has a suitable lower bound, then the shrinker is isometric to R×S3. We also show that if the scalar curvature R 3 and the shrinker is asymptotic to R×S3, then the Euler characteristic (M)≥ 0 and equality holds if and only if the shrinker is isometric to R×S3. On the other hand, we prove that if K 1/2 (or the bi-Ricci curvature is nonnegative) and R32-δ for some δ∈ (0,12], then the shrinker is isometric to R2×S2. The proof of these classifications mainly depends on the asymptotic analysis by the evolution of eigenvalues of Ricci curvature, the Gauss-Bonnet-Chern formula with boundary and the integration by parts.