Cone Conditions for the Curvature Operator of the Second Kind on Einstein Manifolds

Abstract

In this note, we study Einstein manifolds whose curvature operator of the second kind R satisfies the cone condition \[ α-1(Σi=1[α] λi+ (α - [α] ) λ[α] + 1 ) -θ λ \] for some real number α ∈ [1, (n+2)(n-1)/2). Here [α] :=\ m ∈ Z: m ≤ α\, θ>-1 and λ1 ·s λ(n+2)(n-1)/2 are the eigenvalues of R and λ is their average. The main result states that any closed Einstein manifold of dimension n 4 with R satisfies the cone condition is flat or a round sphere. These results generalize recent works corresponding to α ∈ Z+ of the authors CW24-1,CW25-2 and Fu-Lu FL25.