Applications of spherical twist functors to Lie algebras associated to root categories of preprojective algebras

Abstract

Let Q be the preprojective algebra of a finite acyclic quiver Q of non-Dynkin type and Db(repn Q) be the bounded derived category of finite dimensional nilpotent Q-modules. We define spherical twist functors over the root category R_Q of Db(repn Q) and then realize the Weyl group associated to Q as certain subquotient of the automorphism group of the Ringel-Hall Lie algebra g(R_Q) of R_Q induced by spherical twist functors. We also present a conjectural relation between certain Lie subalgebras of g(R_Q) and g(RQ), where g(RQ) is the Ringe-Hall Lie algebra associated to the root category RQ of Q.