arXiv:2202.10257 Abstract | arXiv Analytics

arXiv:2202.10257 [math.NT]Abstract References Reviews Resources

$S$-integral quadratic forms and homogeneous dynamics

Published 2022-02-21, updated 2023-04-27Version 2

Let $S = \{ \infty \} \cup S_f$ be a finite set of places of $\mathbb{Q}$. Using homogeneous dynamics, we establish two new quantitative and explicit results about integral quadratic forms in three or more variables: The first is a criterion of $S$-integral equivalence. The second determines a finite generating set of any $S$-integral orthogonal group. Both theorems--which extend results of H. Li and G. Margulis for $S = \{ \infty\}$--are given by polynomial bounds on the size of the coefficients of the quadratic forms.

Comments: We add in the introduction a discussion of the extension of the results to any number field. Some misprints corrected

Categories: math.NT, math.DS

Subjects: 11E12, 37A17, 11E08, 11H55, 37A25

Keywords: integral quadratic forms, homogeneous dynamics, integral orthogonal group, theorems-which extend results, explicit results

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