Flops and mutations for crepant resolutions of polyhedral singularities

Abstract

Let G be a polyhedral group G⊂ SO(3) of types Z/nZ, D2n and T. We prove that there exists a one-to-one correspondence between flops of G-HilbC3 and mutations of the McKay quiver with potential which do not mutate the trivial vertex. This correspondence provides two equivalent methods to construct every projective crepant resolution for the singularities C3/G, which are constructed as moduli spaces MC of quivers with potential for some chamber C in the space of stability conditions. In addition, we study the relation between the exceptional locus in MC with the corresponding quiver QC, and we describe explicitly the part of the chamber structure in where every such resolution can be found.