中文

André's theorem and weakly bounded height

数论 2026-06-28 v1

摘要

Let VA2(C)V \subset \mathbb{A}^2(\mathbb{C}) be an algebraic curve such that degXdegY\mathrm{deg} X \neq \mathrm{deg} Y, where X,YX, Y denote the coordinate functions on A2(C)\mathbb{A}^2(\mathbb{C}) restricted to VV. We prove there exists an effectively computable constant cc, that depends linearly on the height of VV, such that max{h(x),h(y)}c\max \{h(x), h(y)\} \leq c for every (x,y)V(x, y) \in V with xx and yy both CM jj-invariants. This establishes, for such curves, an effective version of the Andr\'{e}--Oort conjecture that has a better dependence on the height of VV than previous effective results.

引用

@article{arxiv.2606.29369,
  title  = {André's theorem and weakly bounded height},
  author = {Guy Fowler},
  journal= {arXiv preprint arXiv:2606.29369},
  year   = {2026}
}