仿射曲面的loxodromic自动形的轨道交集

arXiv - MATH - Number Theory Pub Date : 2024-09-12 DOI:arxiv-2409.07826

Marc Abboud

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引用次数: 0

摘要

我们证明了以下结果：如果 $X_0$ 是一个域 $K$ 上的仿射曲面，而 $f，g$ 是两个loxodromic 自变分，它们的轨道相交无穷多次，那么 $f$ 和 $g$ 必须共享一个共同迭代。证明使用了作者在[Abb23]中关于有限曲面内形变动力学的初步工作以及算术动力学的论证。然后，我们展示了在 $X_0 \times X_0$ 中曲面的拟合莫德尔-朗类型结果。

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Intersection of orbits of loxodromic automorphisms of affine surfaces

We show the following result: If $X_0$ is an affine surface over a field $K$ and $f, g$ are two loxodromic automorphisms with an orbit meeting infinitely many times, then $f$ and $g$ must share a common iterate. The proof uses the preliminary work of the author in [Abb23] on the dynamics of endomorphisms of affine surfaces and arguments from arithmetic dynamics. We then show a dynamical Mordell-Lang type result for surfaces in $X_0 \times X_0$.

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arXiv - MATH - Number Theory

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