Bounded Generation by semi-simple elements: quantitative results

Abstract

We prove that for a number field F, the distribution of the points of a set ⊂ AFn with a purely exponential parametrization, for example a set of matrices boundedly generated by semi-simple (diagonalizable) elements, is of at most logarithmic size when ordered by height. As a consequence, one obtains that a linear group ⊂ GLn(K) over a field K of characteristic zero admits a purely exponential parametrization if and only if it is finitely generated and the connected component of its Zariski closure is a torus. Our results are obtained via a key inequality about the heights of minimal m-tuples for purely exponential parametrizations. One main ingredient of our proof is Evertse's strengthening of the S-Unit Equation Theorem.