A fusion variant of the classical and dynamical Mordell-Lang conjectures in positive characteristic
Abstract
We study an open question at the interplay between the classical and the dynamical Mordell-Lang conjectures in positive characteristic. Let K be an algebraically closed field of positive characteristic, let G be a finitely generated subgroup of the multiplicative group of K, and let X be a (irreducible) quasiprojective variety defined over K. We consider K-valued sequences of the form an:=f(n(x0)), where X→ X and f X→P1 are rational maps defined over K and x0∈ X is a point whose forward orbit avoids the indeterminacy loci of and f. We show that the set of n for which an∈ G is a finite union of arithmetic progressions along with a set of upper Banach density zero. In addition, we show that if an∈ G for every n and the orbit of x is Zariski dense in X then there is a multiplicative torus Gmd and maps :Gmd Gmd and g:Gmd Gm such that an = g n(y) for some y∈ Gmd. We then describe various applications of our results.
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