Dimension estimate and existence of holomorphic sections with polynomial growth on gradient K\"ahler Ricci shrinkers

Abstract

We prove an upper bound for the dimension of the linear space of holomorphic functions with polynomial growth on gradient K\"ahler Ricci shrinkers with bounded curvature. The upper bound is given as a power function of the growth rate. Similar results hold for holomorphic (p, 0)-forms, and holomorphic sections of the pluri-anticanonical line bundle KM-q. We also prove the existence of holomorphic sections of KM-q with polynomial growth when the K\"ahler Ricci shrinker is asymptotically conical, provided q is sufficiently large; as an application, we show that the Kodaira map constructed using such sections is a holomorphic embbedding into a complex projective space.

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