Double shuffle Lie algebra and special derivations

Abstract

Racinet's double shuffle Lie algebra dmr0 is a Lie subalgebra of the Lie algebra tder of tangential derivations of the free Lie algebra with generators x0,x1, i.e. of derivations such that x1 0 and x0 [a,x0] for some element a. We prove: (1) dmr0 is contained in the Lie subalgebra sder of tder of special derivations, i.e. satisfying the additional condition that x∞ [b,x∞] for some element b, where x∞:=x1-x0; (2) dmr0 is stable under the involution of sder induced by the exchange of x0 and x∞. The first statement: (a) says that any element of dmr0 satisfies the "senary relation" (a fact announced without proof by Ecalle in 2011); (b) implies the inclusion dmr0⊂ krv2 (which was proved by Schneps in 2012 only conditionally to the truth of (1)). We also derive the analogues of statements (a) and (b) respective to Racinet's ``double shuffle schemes'' DMRμ( k) and to the Betti double shuffle group DMRB( k) introduced in our earlier work.