A quantum cluster algebra of Kronecker type and the dual canonical basis

Abstract

The article concerns the dual of Lusztig's canonical basis of a subalgebra of the positive part Uq(n) of the universal enveloping algebra of a Kac-Moody Lie algebra of type A1(1). The examined subalgebra is associated with a terminal module M over the path algebra of the Kronecker quiver via an Weyl group element w of length four. Geiss-Leclerc-Schroeer attached to M a category CM of nilpotent modules over the preprojective algebra of the Kronecker quiver together with an acyclic cluster algebra A(CM). The dual semicanonical basis contains all cluster monomials. By construction, the cluster algebra A(CM) is a subalgebra of the graded dual of the (non-quantized) universal enveloping algebra U(n). We transfer to the quantized setup. Following Lusztig we attach to w a subalgebra Uq+(w) of Uq(n). The subalgebra is generated by four elements that satisfy straightening relations; it degenerates to a commutative algebra in the classical limit q=1. The algebra Uq+(w) possesses four bases, a PBW basis, a canonical basis, and their duals. We prove recursions for dual canonical basis elements. The recursions imply that every cluster variable in A(CM) is the specialization of the dual of an appropriate canonical basis element. Therefore, Uq+(w) is a quantum cluster algebra in the sense of Berenstein-Zelevinsky. Furthermore, we give explicit formulae for the quantized cluster variables and for expansions of products of dual canonical basis elements.