Realizing enveloping algebras via moduli stacks

Abstract

Let CF(Obj .05emA) denote the vector space of Q-valued constructible functions on a given stack Obj .05emA for an exact category A. By using the Ringel--Hall algebra approach, Joyce proved that CF(Obj .05emA) is an associative Q-algebra via the convolution multiplication and the subspace CF indObj .05emA) of constructible functions supported on indecomposables is a Lie subalgebra of CF(Obj .05emA) in [10]. In this paper, we show that there is a subalgebra CFKS(Obj .05emA) of CF(Obj .05emA) isomorphic to the universal enveloping algebra of CF ind(Obj .05emA). Moreover we construct a comultiplication on CFKS(Obj .05emA) and a degenerate form of Green's theorem. This generalizes Joyce's work, as well as results of [3].