Jordan property for groups of bimeromorphic self-maps of complex manifolds with large Kodaira dimension
Abstract
We prove that the image of the pluricanonical representation of a group of bimeromorphic automorphisms of a complex manifold has bounded finite subgroups. As a consequence, we show that the group of bimeromorphic automorphisms of an n-dimensional complex manifold whose Kodaira dimension is at least n-2, satisfies the Jordan property.
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