Dixmier Groups and Borel Subgroups

Abstract

Let G be the group of symplectic (unimodular) automorphisms of the free associative algebra on two generators. A theorem of G.Wilson and the first author asserts that G acts transitively the Calogero-Moser spaces Cn for all n. We generalize this theorem in two ways: first, we prove that the action of G on Cn is doubly transitive, meaning that G acts transitively on the configuration space of (ordered) pairs of points in Cn; second, we prove that the diagonal action of G on the product of (any number of) copies of Cn is transitive provided the corresponding n's are pairwise distinct. In the second part of the paper, we study the isotropy subgroups Gn of G in Cn. We equip each Gn with the structure of an ind-algebraic group and classify the Borel subgroups of these ind-algebraic groups for all n. Our classification shows that every Borel subgroup of G (= G0) is conjugate to the subgroup B of triangular (elementary) automorphisms; on the other hand, for n > 0, the conjugacy classes of Borel subgroups of Gn are parametrized by certain orbits of B in Cn. Our main result is that the conjugacy classes of non-abelian Borel subgroups of Gn correspond precisely to the B-orbits of the C*-fixed points in Cn and thus, are in bijection with the partitions of n. We also prove an infinite-dimensional analogue of the classical theorem of R.Steinberg, characterizing the (non-abelian) Borel subgroups of Gn in purely group-theoretic terms. Together with our classification this last theorem implies that the Gn are pairwise non-isomorphic as abstract groups. Our study of the groups Gn is motivated by the fact that these are the automorphism groups of non-isomorphic simple algebras Morita equivalent to the Weyl algebra A1(C). From this perspective, our results generalize well-known theorems of J.Dixmier and L.Makar-Limanov about the automorphism group of A1(C).