Growth in SL_3(Z/pZ)
Group Theory
2009-06-08 v3 Number Theory
Abstract
Let G=SL_3(Z/pZ), p a prime. Let A be a set of generators of G. Then A grows under the group operation. To be precise: denote by |S| the number of elements of a finite set S. Assume |A| < |G|^{1-\epsilon} for some \epsilon>0. Then |A\cdot A\cdot A|>|A|^{1+\delta}, where \delta>0 depends only on \epsilon. We also study subsets A\subset G that do not generate G. Other results on growth and generation follow.
Cite
@article{arxiv.0807.2027,
title = {Growth in SL_3(Z/pZ)},
author = {H. A. Helfgott},
journal= {arXiv preprint arXiv:0807.2027},
year = {2009}
}
Comments
88 pages; Theorem 1.1 is new