Contracted Preprojective Algebras, Coxeter Groups and cDV Singularities

• Preprojective algebras of quivers are important objects in representation theory. In extended Dynkin case, they give non-commutative resolutions of simple singularities of dimension two. Motivated by studying non-commutative resolutions of cDV singularities, I will discuss tilting theory of a contracted preprojective algebra, which is a subalgebra eAe of a preprojective algebra A given by an idempotent e of A. It has a family of tilting modules which correspond bijectively with the chambers in the contracted Tits cone, and mutation of these tilting modules correspond to wall-crossing of chambers. Moreover, they are parametrized by certain double cosets in the Coxeter group W modulo parabolic subgroups, and mutation can be described in terms of these double cosets by using longest elements. Osamu explained some results and conjectures on the derived equivalence classes of contracted preprojective algebras. This is a joint work with Michael Wemyss.