On the Hall algebra of semigroup representations over F1

Abstract

Let be a finitely generated semigroup with 0. An -module over (also called an --set), is a pointed set (M,*) together with an action of . We define and study the Hall algebra of the category of finite --modules. is shown to be the universal enveloping algebra of a Lie algebra , called the Hall Lie algebra of . In the case of the - the free monoid on one generator , the Hall algebra (or more precisely the Hall algebra of the subcategory of nilpotent -modules) is isomorphic to Kreimer's Hopf algebra of rooted forests. This perspective allows us to define two new commutative operations on rooted forests. We also consider the examples when is a quotient of by a congruence, and the monoid G \0\ for a finite group G.