On Dynamical Cancellation
Abstract
Let X be a projective variety and let f be a dominant endomorphism of X, both of which are defined over a number field K. We consider a question of the second author, Meng, Shibata, and Zhang, which asks whether the tower of K-points Y(K)⊂eq (f-1(Y))(K)⊂eq (f-2(Y))(K)⊂eq ·s eventually stabilizes, where Y⊂ X is a subvariety invariant under f. We show this question has an affirmative answer when the map f is \'etale. We also look at a related problem of showing that there is some integer s0, depending only on X and K, such that whenever x, y ∈ X(K) have the property that fs(x) = fs(y) for some s ≥ 0, we necessarily have fs0(x) = fs0(y). We prove this holds for \'etale morphisms of projective varieties, as well as self-morphisms of smooth projective curves. We also prove a more general cancellation theorem for polynomial maps on P1 where we allow for composition by multiple different maps f1,…,fr.
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