Strong integrality of inversion subgroups of Kac-Moody groups

Abstract

Let A be a symmetrizable generalized Cartan matrix with corresponding Kac--Moody algebra g over Q. Let V=Vλ be an integrable highest weight g-module and let V Z=Vλ Z be a ZZ-form of V. Let G be an associated minimal representation-theoretic Kac--Moody group and let G( Z) be its integral subgroup. Let ( Z) be the Chevalley subgroup of G, that is, the subgroup that stabilizes the lattice V Z in V. For a subgroup M of G, we say that M is integral if M G( Z)=M ( Z) and that M is strongly integral if there exists v∈ Vλ Z such that, for all g∈ M, g· v∈ VZ implies g∈ G(Z). We prove strong integrality of inversion subgroups U(w) of G where, for w∈ W, U(w) is the the group generated by positive real root groups that are flipped to negative roots by w-1. We use this to prove strong integrality of subgroups of the unipotent subgroup U of G generated by commuting real root groups. When A has rank 2, this gives strong integrality of subgroups U1 and U2 where U=U1*\ U2 and each Ui is generated by `half' the positive real roots.