Sharp Dimension Estimates of Holomorphic Functions and Rigidity

Abstract

Let Mn be a complete noncompact Kahler manifold of complex dimension n with nonnegative holomorphic bisectional curvature. Denote by Od(Mn) the space of holomorphic functions of polynomial growth of degree at most d on Mn. In this paper we prove that dimCOd(Mn)≤ dimCO[d](Cn), for all d>0, with equality for some positive integer d if and only if Mn is holomorphically isometric to Cn. We also obtain sharp improved dimension estimates when its volume growth is not maximal or its Ricci curvature is positive somewhere.

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