New Sphere Theorems under Curvature Operator of the Second Kind
Abstract
We investigate Riemannian manifolds (Mn,g) whose curvature operator of the second kind R satisfies the condition equation* α-1 (λ1 +·s +λα) > - θ λ, equation* where λ1 ≤ ·s ≤ λ(n-1)(n+2)/2 are the eigenvalues of R, λ is their average, and θ > -1. Under such conditions with optimal θ depending on n and α, we prove two differentiable sphere theorems in dimensions three and four, a homological sphere theorem in higher dimensions, and a curvature characterization of K\"ahler space forms. These results generalize recent works corresponding to θ =0 of Cao-Gursky-Tran, Nienhaus-Petersen-Wink, and the author. Moreover, examples are provided to demonstrate the sharpness of all results.
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