Quivers and Three-Dimensional Lie Algebras

Abstract

We study a family of three-dimensional Lie algebras Lμ that depend on a continuous parameter μ. We introduce certain quivers, which we denote by Qm,n (m,n ∈ Z) and Q∞ × ∞, and prove that idempotented versions of the enveloping algebras of the Lie algebras Lμ are isomorphic to the path algebras of these quivers modulo certain ideals in the case that μ is rational and non-rational, respectively. We then show how the representation theory of the quivers Qm,n and Q∞×∞ can be related to the representation theory of quivers of affine type A, and use this relationship to study representations of the Lie algebras Lμ. In particular, though it is known that the Lie algebras Lμ are of wild representation type, we show that if we impose certain restrictions on weight decompositions, we obtain full subcategories of the category of representations of Lμ that are of finite or tame representation type.