On the Abuaf-Ueda Flop via Non-Commutative Crepant Resolutions

Abstract

The Abuaf-Ueda flop is a 7-dimensional flop related to G<sub>2</sub> homogeneous spaces. The derived equivalence for this flop was first proved by Ueda using mutations of semi-orthogonal decompositions. In this article, we give an alternative proof for the derived equivalence using tilting bundles. Our proof also shows the existence of a non-commutative crepant resolution of the singularity appearing in the flopping contraction. We also give some results on moduli spaces of finite-length modules over this non-commutative crepant resolution.