Bigraded Lie algebras related to MZVs

Abstract

We prove that Goncharov's dihedral Lie coalgebra D:=k≥ m ≥ 1 Dm,k of the trivial group (D (G) of (arxiv:math/0009121) for G=\e\) is the bigraded dual of Brown's linearized double shuffle Lie algebra ls:=k≥ m ≥ 1lsmk⊂ Q x,z whose Lie bracket is the Ihara bracket initially defined over Q x,z . This by constructing an explicit isomorphism of bigraded Lie coalgebras D ls, where ls is the Lie coalgebra dual in the bigraded sense to ls. The work leads to the equivalence between the two statements: "D is a Lie coalgebra with respect to Goncharov's cobracket formula" and " ls is preserved by the Ihara bracket". We also prove folklore results (that apparently have no written proofs in the literature) stating that for m ≥ 2: Dm,:=k≥ m Dm,k is graded isomorphic (dual) to Ihara-Kaneko-Zagier's double shuffle space Dshm:=k≥ m Dshm(k-m) ⊂ Q[x1,…,xm], and that a given linear map fm: Q x,z m Q[x1,…,xm], where Q x,z m is the space linearly generated by monomials of Q x,z of degree m with respect to z, restricts to a graded isomorphism fm: lsm:=k≥ m lsmk Dshm. Here, we establish three explicit compatible isomorphisms D ls, Dm Dshm and fm: lsm Dshm, where Dshm is the graded dual of Dshm.