Diameters of Chevalley groups over local rings

Abstract

Let G be a Chevalley group scheme of rank l. We show that the following holds for some absolute constant d>0 and two functions p0=p0(l) and C=C(l,p). Let p>p0 be a prime number and let Gn:=G(/pn) be the family of finite groups for n>0. Then for any n>0 and any subset S which generates Gn we have diam(Gn,S)< C nd, i.e., any element of Gn is a product of Cnd elements from S S-1. In particular, for some C'=C'(l,p) and for any n>0 we have, diam(Gn,S)< C' logd(|Gn|). Our proof is elementary and effective, in the sense that the constant d and the functions p0(l) and C(l,p) are calculated explicitly. Moreover, there exists an efficient algorithm to compute a short path between any two vertices in any Cayley graph of the groups Gn.