The sphere theorems for manifolds with positive scalar curvature

Abstract

Some new differentiable sphere theorems are obtained via the Ricci flow and stable currents. We prove that if Mn is a compact manifold whose normalized scalar curvature and sectional curvature satisfy the pointwise pinching condition R0>σnK, where σn∈ (14,1) is an explicit positive constant, then M is diffeomorphic to a spherical space form. This gives a partial answer to Yau's conjecture on pinching theorem. Moreover, we prove that if Mn(n≥3) is a compact manifold whose (n-2)-th Ricci curvature and normalized scalar curvature satisfy the pointwise condition Ric(n-2)>τn(n-2)R0, where τn∈ (14,1) is an explicit positive constant, then M is diffeomorphic to a spherical space form. We then extend the sphere theorems above to submanifolds in a Riemannian manifold. Finally we give a classification of submanifolds with weakly pinched curvatures, which improves the differentiable pinching theorems due to Andrews, Baker and the authors.