Product manifolds and the curvature operator of the second kind

Abstract

We investigate the curvature operator of the second kind on product Riemannian manifolds and obtain some optimal rigidity results. For instance, we prove that the universal cover of an n-dimensional non-flat complete locally reducible Riemannian manifold with (n+n-2n)-nonnegative (respectively, (n+n-2n)-nonpositive) curvature operator of the second kind must be isometric to Sn-1× R (respectively, Hn-1× R) up to scaling. We also prove analogous optimal rigidity results for Sn1× Sn2 and Hn1× Hn2, n1,n2 ≥ 2, among product Riemannian manifolds, as well as for CPm1× CPm2 and CHm1× CHm2, m1,m2≥ 1, among product K\"ahler manifolds. Our approach is pointwise and algebraic.