Les algebres de Hopf des arbres enracines decores

Abstract

In Kreimer1,Connes,Broadhurst,Kreimer2, a commutative, non cocommutative Hopf algebra HR of (decorated) rooted trees was introduced. It is related to the Hopf algebra HCM introduced in Moscovici. Its dual Hopf algebra is the enveloping algebra of the Lie algebra of rooted trees L1. In this paper, we introduce a non commutative, non cocommutative Hopf algebra HPR of decorated planar rooted trees. We first show that HPR is self dual. We then use this result to construct a non degenerate bilinear form (,) on HPR, which respects the Hopf algebra structure of HPR. Moreover, we give a combinatorial expression for the bilinear form (,). This allows us to give a direct formula for a basis of the primitive elements of HPR. In the next sections, we show that HPR is isomorphic to the Hopf algebra of planar binary trees introduced in Frabetti, Brouder, and construct a subalgebra of formal non commutative diffeomorphisms. We then classify the Hopf algebra endomorphisms and coalgebra endomorphisms of HPR. In the last sections, we give results about tensorial coalgebras and apply them to HPR and HR. We show how to construct the primitive elements of HR from the primitive elements of HPR and finally prove that L1 is a free Lie algebra.

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