Infinite dimensional Chevalley groups and Kac-Moody groups over Z

Abstract

Let A be a symmetrizable generalized Cartan matrix, which is not of finite or affine type. Let g be the corresponding Kac-Moody algebra over a commutative ring R with 1. We construct an infinite-dimensional group GV(R) analogous to a finite-dimensional Chevalley group over R. We use a Z-form of the universal enveloping algebra of g and a Z-form of an integrable highest-weight module V. We construct groups GV(Z) analogous to arithmetic subgroups in the finite-dimensional case. We also consider a universal representation-theoretic Kac-Moody group G and its completion G. For the completion we prove a Bruhat decomposition G(Q)=G(Z)B(Q) over Q, and that the arithmetic subgroup (Z) coincides with the subgroup of integral points G(Z)