Quantitative reduction theory and unlikely intersections
Abstract
We prove quantitative versions of Borel and Harish-Chandra's theorems on reduction theory for arithmetic groups. Firstly, we obtain polynomial bounds on the lengths of reduced integral vectors in any rational representation of a reductive group. Secondly, we obtain polynomial bounds in the construction of fundamental sets for arithmetic subgroups of reductive groups, as the latter vary in a real conjugacy class of subgroups of a fixed reductive group. Our results allow us to apply the Pila--Zannier strategy to the Zilber--Pink conjecture for the moduli space of principally polarised abelian surfaces. Building on our previous paper, we prove this conjecture under a Galois orbits hypothesis. Finally, we establish the Galois orbits hypothesis for points corresponding to abelian surfaces with quaternionic multiplication, under certain geometric conditions.
Cite
@article{arxiv.1911.05618,
title = {Quantitative reduction theory and unlikely intersections},
author = {Christopher Daw and Martin Orr},
journal= {arXiv preprint arXiv:1911.05618},
year = {2023}
}
Comments
44 pages, small corrections and link to online publication in IMRN