Holonomy and (stated) skein algebras in combinatorial quantization

Abstract

The algebra Lg,n(H) was introduced by Alekseev-Grosse-Schomerus and Buffenoir-Roche and quantizes the character variety of the Riemann surface g,n\!\! D (D is an open disk). In this article we define a holonomy map in that quantized setting, which associates a tensor with components in Lg,n(H) to tangles in (g,n\!\!D) × [0,1], generalizing previous works of Buffenoir-Roche and Bullock-Frohman-Kania-Bartoszynska. We show that holonomy behaves well for the stack product and the action of the mapping class group; then we specialize this notion to links in order to define a generalized Wilson loop map. Thanks to the holonomy map, we give a geometric interpretation of the vacuum representation of Lg,0(H) on L0,g(H). Finally, the general results are applied to the case H=Uq2(sl2) in relation to skein theory and the most important consequence is that the stated skein algebra of a compact oriented surface with just one boundary edge is isomorphic to Lg,n( Uq2(sl2) ). Throughout the paper we use a graphical calculus for tensors with coefficients in Lg,n(H) which makes the computations and definitions very intuitive.