Intersections of orbits of self-maps with subgroups in semiabelian varieties
Abstract
Let G be a semiabelian variety defined over an algebraically closed field K, endowed with a rational self-map . Let α∈ G(K) and let ⊂eq G(K) be a finitely generated subgroup. We show that the set \n∈N n(α)∈ \ is a union of finitely many arithmetic progressions along with a set of Banach density equal to 0. In addition, assuming is regular, we prove that the set S must be finite.
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