Cyclic $\mathcal{U}_ξ(\mathfrak{sl}_2)$-modules and invariants of knots with flat $\mathfrak{sl}_2$ connections in the complement

Abstract: The main result of this paper is the factorization of the holonomy $R$-matrix for quantum $\mathfrak{sl}2$ at a root of unity into a product of four quantum holonomy dilogarithms. This factorization extends previously known results in this direction. We collect many existing results needed for the factorization. We use the holonomy $R$-matrices to define representations of a groupoid of braids with flat $\mathfrak{sl}{2}$ connections, which also define invariants of knots with such connections.