Abstract
Abstract We prove a new rigidity result for metrics defined on closed smooth n-manifolds that are critical for the quadratic functional 𝔉 t , which depends on the Ricci curvature Ric and the scalar curvature R, and that satisfy a pinching condition of the form Sec > ε R, where ε is a function of t and n, while Sec denotes the sectional curvature. In particular, we show that Bach-flat metrics with constant scalar curvature satisfying Sec > 1 48 $\begin{array}{} \displaystyle \frac{1}{48} \end{array}$ R are Einstein and, by a known result, are isometric to 𝕊4, ℝℙ4 or ℂℙ2.
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