Non-virtually abelian anisotropic linear groups are not boundedly generated
Group Theory
2022-01-19 v3 Number Theory
Abstract
We prove that if a linear group over a field of characteristic zero is boundedly generated by semi-simple (diagonalizable) elements then it is virtually solvable. As a consequence, one obtains that infinite -arithmetic subgroups of absolutely almost simple anisotropic algebraic groups over number fields are never boundedly generated. Our proof relies on Laurent's theorem from Diophantine geometry and properties of generic elements.
Keywords
Cite
@article{arxiv.2101.09386,
title = {Non-virtually abelian anisotropic linear groups are not boundedly generated},
author = {Pietro Corvaja and Andrei Rapinchuk and Jinbo Ren and Umberto Zannier},
journal= {arXiv preprint arXiv:2101.09386},
year = {2022}
}
Comments
Final version; to appear in Invent. Math