Rational self-maps with a regular iterate on a semiabelian variety
Abstract
Let G be a semiabelian variety defined over an algebraically closed field K of characteristic 0. Let G G be a dominant rational self-map. Assume that an iterate m G G is regular for some m ≥slant 1 and that there exists no non-constant homomorphism τ: G G0 of semiabelian varieties such that τ m k=τ for some k ≥slant 1. We show that under these assumptions itself must be a regular. We also prove a variant of this assertion in prime characteristic and present examples showing that our results are sharp.
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