Stable group theory and approximate subgroups
Abstract
We note a parallel between some ideas of stable model theory and certain topics in finite combinatorics related to the sum-product phenomenon. For a simple linear group G, we show that a finite subset X with |X X \^{-1} X |/ |X| bounded is close to a finite subgroup, or else to a subset of a proper algebraic subgroup of G. We also find a connection with Lie groups, and use it to obtain some consequences suggestive of topological nilpotence. Combining these methods with Gromov's proof, we show that a finitely generated group with an approximate subgroup containing any given finite set must be nilpotent-by-finite. Model-theoretically we prove the independence theorem and the stabilizer theorem in a general first-order setting.
Cite
@article{arxiv.0909.2190,
title = {Stable group theory and approximate subgroups},
author = {Ehud Hrushovski},
journal= {arXiv preprint arXiv:0909.2190},
year = {2011}
}
Comments
Further local corrections, thanks to two anonymous referres