Constructs complete Kähler metrics with negative bisectional curvature on hyperbolic complex manifolds resolving Mok's problem and projective surfaces with negative HSC realizing any rational Chern slope in (2/7, 2/3).
Rosay,Sur une caract´ erisation de la boule parmi les domaines deCn par son groupe d’automorphismes, Ann
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Quantitative strong localization of the Kobayashi-Eisenman volume element near plurisubharmonic peak points, yielding non-tangential asymptotic limits at exponentially flat infinite-type boundary points.
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Strong Localization of the Kobayashi-Eisenman Volume Element and Its Boundary Asymptotics
Quantitative strong localization of the Kobayashi-Eisenman volume element near plurisubharmonic peak points, yielding non-tangential asymptotic limits at exponentially flat infinite-type boundary points.