Wilson lines and their Laurent positivity

Abstract

For a marked surface and a semisimple algebraic group G of adjoint type, we study the Wilson line morphism g[c]:PG, G associated with the homotopy class of an arc c connecting boundary intervals of , which is the comparison element of pinnings via parallel-transport. The matrix coefficients of the Wilson lines give a generating set of the function algebra O(PG,) when has no punctures. The Wilson lines have the multiplicative nature with respect to the gluing morphisms introduced by Goncharov--Shen [GS19], hence can be decomposed into triangular pieces with respect to a given ideal triangulation of . We show that the matrix coefficients cf,vV(g[c]) give Laurent polynomials with positive integral coefficients in the Goncharov--Shen coordinate system associated with any decorated triangulation of , for suitable f and v.