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

TL;DR

This paper constructs a quantum cluster algebra of Kronecker type linked to dual canonical bases, providing explicit formulas and recursions that connect cluster variables with canonical basis elements.

Contribution

It introduces a new quantum cluster algebra structure associated with a specific subalgebra of U_q(n), including explicit formulas and recursions for dual canonical basis elements.

Findings

Quantum cluster algebra structure established for U_q^+(w)

Explicit formulas for quantized cluster variables provided

Recursions connect cluster variables with dual canonical basis elements

Abstract

The article concerns the dual of Lusztig's canonical basis of a subalgebra of the positive part U_q(n) of the universal enveloping algebra of a Kac-Moody Lie algebra of type A_1^{(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 C_M of nilpotent modules over the preprojective algebra of the Kronecker quiver together with an acyclic cluster algebra A(C_M). The dual semicanonical basis contains all cluster monomials. By construction, the cluster algebra A(C_M) 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 U_q^+(w) of U_q(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 U_q^+(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(C_M) is the specialization of the dual of an appropriate canonical basis element. Therefore, U_q^+(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.