On the combinatorics of the Hopf algebra of dissection diagrams

Abstract

In this article, we are interested in the Hopf algebra HD of dissection diagrams introduced by Dupont in his thesis. We use the version with a parameter x∈K. We want to study its underlying coalgebra. We conjecture it is cofree, except for a countable subset of K. If x=-1 then we know there is no cofreedom. We easily see that H\D is a free commutative right-sided combinatorial Hopf algebra according to Loday and Ronco. So, there exists a pre-Lie structure on its graded dual. Furthermore HD and the enveloping algebra of its primitive elements are isomorphic. Thus, we can equip H\D with a structure of Oudom and Guin. We focus on the pre-Lie structure on dissection diagrams and in particular on the pre-Lie algebra generated by the dissection diagram of degree 1. We prove that it is not free. We express a Hopf algebra morphism between the Grossman and Larson Hopf algebra and HD by using pre-Lie and Oudom and Guin structures.