The Wu-Yau theorem on Sasakian manifolds
Abstract
In this note, We proved that a compact Sasakian manifold ( M, , η, , g ) with negative transverse holomorphic sectional curvature must have has a Sasakian structure ( , η , , g ) with negative transverse Ricci curvature. Similarly, a compact Sasakian manifold with non-positive transverse holomorphic sectional curvature, then the negative first basic Chern class is transverse nef and we have the Miyaoka-Yau type inequality. When transverse holomorphic sectional curvature is quasi-negative, we obtain a Chern number inequality.
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