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Let K be an algebraically closed field of arbitrary characteristic and let X be an irreducible projective variety over K. Let G (X) be a bounded-degree subgroup. We prove that there exists an irreducible projective variety Y birational to X, such that every element of G becomes an automorphism of Y after the birational transformation. If K=C, this result is stated in Can14, Theorem 2. 5 and the proof backs to HZ96, Section 5. The proof in HZ96 is not purely algebraic. Inheriting the methods in HZ96, we give a purely algebraic proof of this statement in arbitrary characteristic. We will also discuss a corollary of this result which is useful in arithmetic dynamics.
She Yang (Tue,) studied this question.
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