Abstract
We show that if M = X × Y is the product of two complex manifolds (of positive dimensions), then M does not admit any complete Kähler metric with bisectional curvature bounded between two negative constants. More generally, a locally-trivial holomorphic fibre-bundle does not admit such a metric. © 2008 International Press.
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APA
Seshadri, H., & Zheng, F. (2008). Complex product manifolds cannot be negatively curved. Asian Journal of Mathematics, 12(1), 145–150. https://doi.org/10.4310/AJM.2008.v12.n1.a10
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