Cluster Realization of Uq(g) and Factorization of the Universal R-Matrix

Abstract

For each simple Lie algebra g, we construct an algebra embedding of the quantum group Uq(g) into certain quantum torus algebra Dg via the positive representations of split real quantum group. The quivers corresponding to Dg is obtained from amalgamation of two basic quivers, where each of them is mutation equivalent to the cluster structure of the moduli space of framed G-local system on a disk with 3 marked points when G is of classical type. We derive a factorization of the universal R-matrix into quantum dilogarithms of cluster variables, and show that conjugation by the R-matrix corresponds to a sequence of quiver mutations which produces the half-Dehn twist rotating one puncture about the other in a twice punctured disk.