We prove that the least area of the non-contractible immersed spheres is no more than $4\pi$ in any oriented compact manifold with dimension $n+2\leq 7$ which satisfies $R\geq 2$ and admits a map to $\mathbf S^2\times T^n$ with nonzero degree. We also prove a rigidity result for the equality case. This can be viewed as a generalization of the result in [2] to higher dimensions.
A proof of the DDVV conjecture and its equality case
Spectral sections, twisted rho invariants and positive scalar curvature
A fully nonlinear equation on 4-manifolds with positive scalar curvature
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