Finiteness Properties of Chevalley Groups over the Laurent Polynomial Ring over a Finite Field

Abstract

We show that if G is a Chevalley group of rank n and Fq[t,t-1] is the ring of Laurent polynomials over a finite field, then G(Fq[t,t-1]) is of type F2n-1. This bound is optimal because it is known -- and we show again -- that the group is not of type F2n.