New Rigidity Results for Critical Metrics of Some Quadratic Curvature Functionals

Abstract

We prove a new rigidity result for metrics defined on closed smooth n -manifolds that are critical for the quadratic functional Ft , 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 > 148 R are Einstein and, by a known result, are isometric to S4 , RP4 or CP2 .