Miyaoka-Yau-type inequalities for Kähler-Einstein manifolds

We investigate Chern number inequalities on Kähler-Einstein manifolds and their relations to uniformization. For Kähler-Einstein manifolds with $c_1$ \lt 0, we prove certain Chern number inequalities in the toric case. For Kähler-Einstein manifolds with $c_1$ \gt 0, we propose a series of Chern number inequalities, interpolating Yau's and Miyaoka's inequalities.

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Published 1 January 2007