K\"ahler manifolds and cross quadratic bisectional curvature

Abstract

In this article we continue the study of the two curvature notions for K\"ahler manifolds introduced by the first named author earlier: the so-called cross quadratic bisectional curvature (CQB) and its dual (dCQB). We first show that compact K\"ahler manifolds with CQB1>0 or dCQB1>0 are Fano, while nonnegative CQB1 or dCQB1 leads to a Fano manifold as well, provided that the universal cover does not contain a flat de Rham factor. For the latter statement we employ the K\"ahler-Ricci flow to deform the metric. We conjecture that all K\"ahler C-spaces will have nonnegative CQB and positive dCQB. By giving irreducible such examples with arbitrarily large second Betti numbers we show that the positivity of these two curvature put no restriction on the Betti number. A strengthened conjecture is that any K\"ahler C-space will actually have positive CQB unless it is a P1 bundle. Finally we give an example of non-symmetric, irreducible K\"ahler C-space with b2>1 and positive CQB, as well as compact non-locally symmetric K\"ahler manifolds with CQB<0 and dCQB<0.