English

The kernel of formal polylogarithms

Quantum Algebra 2026-02-23 v2

Abstract

Polylogarithmic functions (polylogs) in nn variables can be viewed as elements of (Upm)(U\mathfrak{p}_{m})^*, the dual of the universal enveloping algebra of the Lie algebra pm\mathfrak{p}_{m} of infinitesimal spherical pure braids with m=n+3m=n+3 strands. Polylogs with m=4,5m=4,5 are used in the theory relating double shuffle relations and Drinfeld associators \cite{furusho_double_2011}. We give explicit formulas for elements of (Upm)(U\mathfrak{p}_{m})^* representing polylogs, and compute the left ideal JmUpmJ_{m} \subset U\mathfrak{p}_{m} given by their joint kernel. We introduce Lie subalgebras km=pmJm\mathfrak{k}_{m}=\mathfrak{p}_{m} \cap J_{m}, and we compute them for m=4,5m=4, 5.

Keywords

Cite

@article{arxiv.2601.19455,
  title  = {The kernel of formal polylogarithms},
  author = {Anton Alekseev and Megan Howarth and Florian Naef and Muze Ren and Pavol Ševera},
  journal= {arXiv preprint arXiv:2601.19455},
  year   = {2026}
}

Comments

24 pages

R2 v1 2026-07-01T09:22:03.910Z