Motivic coaction and single-valued map of polylogarithms from zeta generators (Q6580024)

In this paper, the authors provide a new construction of both the motivic coaction and the singlevalued map of multiple polylogarithms (MPLs) in any number of variables. The results are based on Lie-algebra structures that intertwine braid operators with additional generators for odd Riemann zeta values. The main novelty is the use of Lie-algebra structures that efficiently reorganize the appearance of multiple zeta values (MZVs) and lower-complexity (MPLs). Unlike earlier approaches, the MPLs and MZVs in the presented formulas are automatically fully simplified with respect to changes of fibration basis and MZV relations over \(\mathbb{Q}\).