Mutation graphs of maximal rigid modules over finite dimensional preprojective algebras

Abstract

Let Q be a finite quiver of Dynkin type and =Q be the preprojective algebra of Q over an algebraically closed field k. Let T be the mutation graph of maximal rigid modules. Geiss, Leclerc and Schr oer conjectured that T is connected, see [C.Geiss, B.Leclerc, J.Schr\"oer, Rigid modules over preprojective algebras, Invent.Math., 165(2006), 589-632]. In this paper, we prove that this conjecture is true when is of representation finite type or tame type. Moreover, we also prove that T is isomorphic to the tilting graph of End T for each maximal rigid -module T if is representation-finite.