Realizing Enveloping Algebras via Varieties of Modules
arXiv:math/0604560
Abstract
By using the Ringel-Hall algebra approach, we investigate the structure of the Lie algebra $L(Î)$ generated by indecomposable constructible sets in the varieties of modules for any finite dimensional $\mathbb{C}$-algebra $Î.$ We obtain a geometric realization of the universal enveloping algebra $R(Î)$ of $L(Î).$ This generalizes the main result of Riedtmann in \cite{R}. We also obtain Green's theorem in \cite{G} in a geometric form for any finite dimensional $\mathbb{C}$-algebra $Î$ and use it to give the comultiplication formula in $R(Î).$