Finiteness Properties of Chevalley Groups over the Ring of (Laurent) Polynomials over a Finite Field

Abstract

In these notes we determine the finiteness length of the groups G(OS) where G is an Fq-isotropic, connected, noncommutative, almost simple Fq-group and OS is one of Fq[t], Fq[t-1], and Fq[t,t-1]. That is, k = Fq(t) and S contains one or both of the places s0 and s∞ corresponding to the polynomial p(t) = t respectively to the point at infinity. The statement is that the finiteness length of G(OS) is n-1 if S contains one of the two places and is 2n-1 if it contains both places, where n is the Fq-rank of G. For example, the group SL3(Fq[t,t-1]) is of type F3 but not of type F4, a fact that was previously unknown.