Rational self-maps of projective surfaces with a regular iterate
Abstract
We show that if : X X is a dominant rational self-map of a projective surface X over C with a regular and non-invertible iterate n, then we can take n ≤ 12. This bound is sharp and realized on X = P2. In the case where is a birational self-map of P2 we prove that as long as does not preserve a non-constant fibration, if some iterate n is regular then itself must be regular.
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