An explicit upper bound for the Helfgott delta in SL(2, p)
Change log
Authors
Button, J
Roney-Dougal, CM
Abstract
Helfgott proved that there exists a δ > 0 such that if S is a symmetric generating subset of SL(2, p)containing 1 then either S^3=SL(2, p)or |S^3| ≥|S|^1+ δ. It is known that δ ≥ 1/3024. Here we show that δ ≤ (log_2 (7) −1)/6 ≈ 0.3012and we present evidence suggesting that this might be the true value of δ.
Description
Keywords
Simple group, Subset growth, Approximate subgroup
Journal Title
Journal of Algebra
Conference Name
Journal ISSN
0021-8693
1090-266X
1090-266X
Volume Title
Publisher
Elsevier BV