Kac-Moody groups and cluster algebras

Abstract

Let Q be a finite quiver without oriented cycles, let be the associated preprojective algebra, let g be the associated Kac-Moody Lie algebra with Weyl group W, and let n be the positive part of g. For each Weyl group element w, a subcategory Cw of mod() was introduced by Buan, Iyama, Reiten and Scott. It is known that Cw is a Frobenius category and that its stable category is a Calabi-Yau category of dimension two. We show that Cw yields a cluster algebra structure on the coordinate ring [N(w)] of the unipotent group N(w) := N (w-1N-w). Here N is the pro-unipotent pro-group with Lie algebra the completion of n. One can identify [N(w)] with a subalgebra of the graded dual of the universal enveloping algebra U(n) of n. Let S* be the dual of Lusztig's semicanonical basis S of U(n). We show that all cluster monomials of [N(w)] belong to S*, and that S* [N(w)] is a basis of [N(w)]. Moreover, we show that the cluster algebra obtained from [N(w)] by formally inverting the generators of the coefficient ring is isomorphic to the algebra [Nw] of regular functions on the unipotent cell Nw := N (B-wB-) of the Kac-Moody group G with Lie algebra g. We obtain a corresponding dual semicanonical basis of [Nw]. As one application we obtain a basis for each acyclic cluster algebra, which contains all cluster monomials in a natural way.