On non-Zariski density of (D,S)-integral points in forward orbits and the Subspace Theorem
Abstract
Working over a base number field , we study the attractive question of Zariski non-density for (D,S)-integral points in Of(x) the forward f-orbit of a rational point x ∈ X(). Here, f X → X is a regular surjective self-map for X a geometrically irreducible projective variety over . Given a non-zero and effective f-quasi-polarizable Cartier divisor D on X and defined over , our main result gives a sufficient condition, that is formulated in terms of the f-dynamics of D, for non-Zariski density of certain dynamically defined subsets of Of(x). For the case of (D,S)-integral points, this result gives a sufficient condition for non-Zariski density of integral points in Of(x). Our approach expands on that of Yasufuku, Yasufuku:2015, building on earlier work of Silverman Silverman:1993. Our main result gives an unconditional form of the main results of loc.~cit.; the key arithmetic input to our main theorem is the Subspace Theorem of Schmidt in the generalized form that has been given by Ru and Vojta in Ru:Vojta:2016 and expanded upon in Grieve:points:bounded:degree and Grieve:qualitative:subspace.
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