Curvature of hyperbolic complex manifolds

Abstract

The article addresses the construction and geography of negatively curved metrics on hyperbolic complex manifolds. We introduce a mechanism for constructing complete Kähler metrics with negative bisectional curvature. This applies to some product complex manifolds, thereby resolving a longstanding problem attributed to N. Mok. We then construct projective Kobayashi hyperbolic surfaces with negative holomorphic sectional curvature whose Chern slopes c12/c2 realize any s ∈ Q ( 27, 23 ). For slopes s∈ Q ( 27,13 ), the corresponding surfaces admit a Hermitian metric with HSC<0, but their Kähler--Einstein metric cannot have HSC<0. We finally construct, for every s ∈ ( 12, 3 ), a sequence of projective Kobayashi hyperbolic surfaces that do not admit a Hermitian metric of nonpositive holomorphic sectional curvature, whose Chern slopes c12/c2 converge to s.