Some sharp differential sphere theorems for nonnegative scalar curvature manifolds

Abstract

In this paper, we obtain several new intrinsic and extrinsic differential sphere theorems via Ricci flow. For intrinsic case, we show that a closed simply connected n( 4)-dimensional Riemannian manifold M is diffeomorphic to Sn if one of the following conditions holds pointwisely: (i)\ R0>(1-24(10-3)n(n-1))Kmax; \ (ii)\ Ric[4]4(n-1)>(1-6(10-3)n-1)Kmax. Here Kmax, Ric[k] and R0 stand for the maximal sectional curvature, the k-th weak Ricci curvature and the normalized scalar curvature. For extrinsic case, i.e., when M is a closed simply connected n( 4)-dimensional submanifold immersed in M. We prove that M is diffeomorphic to Sn if it satisfies some pinching curvature conditions. The only involved extrinsic quantities in our pinching conditions are the maximal sectional curvature Kmax and the squared norm of mean curvature vector H2. More precisely, we show that M is diffeomorphic to Sn if one of the following conditions holds: itemize [(1)] R0 (1-2n(n-1))Kmax +n(n-2)(n-1)2 H2, and strict inequality is achieved at some point; [(2)] Ric[2]2 (n-2) Kmax+n28 H2, and strict inequality is achieved at some point; [(3)] Ric[2]2 n(n-3)n-2( Kmax+ H2), and strict inequality is achieved at some point. itemize It is worth pointing out that, in the proof of extrinsic case, we apply suitable complex orthonormal frame and simplify the calculations considerably. We also emphasize that both of the pinching constants in (2) and (3) are optimal for n=4.