Guardat en:
| Autor principal: | |
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| Format: | Preprint |
| Publicat: |
2025
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| Matèries: | |
| Accés en línia: | https://arxiv.org/abs/2505.15744 |
| Etiquetes: |
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Taula de continguts:
- The Weak approximation theorem describes the closure of $G(Q)$ inside $G(Q_p)$ as well as inside $G(R)$ for $G$ an algebraic group over $Q$; the closure is always an open normal subgroup with finite abelian quotient, and is well understood in a certain sense even if precise results are not always available (such as for tori!). In this paper, for a finitely generated subgroup $ L \subset G(Q)$ we consider the topological closure of $ L$ inside $G(Q_p)$ and $G(R)$. The paper is written mostly for $G$ a torus or an abelian variety, but eventually considers a variant of the question for $G$ a semisimple group. The paper is written with the wishful thinking that when dealing with questions on topological closure of algebraic points in an algebraic group defined over a number field, the simplest answers hold, a well-known principle known as ``Occum's razor''.