Automorphisms of bounded growth
Abstract
We study birational automorphisms of algebraic varieties of bounded growth, i.e. such that the norms of the inverse images (fn)* NS(X) NS(X) of the powers of the automorphism f∈Bir(X) are bounded above for n≥slant 0. We prove that some power of an infinite order automorphism of a variety X with such property factors either through an infinite order translation on the Albanese variety of X or through an infinite order regular automorphism of Pm for m≥slant 1. We deduce from this that if a rationally connected threefold admits an infinite order automorphism whose growth is bounded then the threefold is rational and an iterate of the automorphism is birationally conjugate to a regular automorphism of P3, a generalization of Blanc and Deserti's result.
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