K\"ahler manifolds and the curvature operator of the second kind

Abstract

This article aims to investigate the curvature operator of the second kind on K\"ahler manifolds. The first result states that an m-dimensional K\"ahler manifold with 32(m2-1)-nonnegative (respectively, 32(m2-1)-nonpositive) curvature operator of the second kind must have constant nonnegative (respectively, nonpositive) holomorphic sectional curvature. The second result asserts that a closed m-dimensional K\"ahler manifold with (3m3-m+22m)-positive curvature operator of the second kind has positive orthogonal bisectional curvature, thus being biholomorphic to CPm. We also prove that (3m3+2m2-3m-22m)-positive curvature operator of the second kind implies positive orthogonal Ricci curvature. Our approach is pointwise and algebraic.