Towards Common Zeros of Iterated Morphisms

Abstract

Recently, the authors have proved the finiteness of common zeros of two iterated rational maps under some compositional independence assumptions. In this article, we advance towards a question of Hsia and Tucker on a Zariski non-density of common zeros of iterated morphisms on a variety. More precisely, we provide an affirmative answer in the case of H\'enon type maps on A2, endomorphisms on (P1)n, and polynomial skew products on A2 defined over Q. As a by-product, we prove a Tits' alternative analogy for semigroups generated by two regular polynomial skew products.

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