Dn Dynkin quiver moduli spaces

Abstract

We study 3d N=4 quiver gauge theories with gauge nodes forming a Dn Dynkin diagram. The class of good Dn Dynkin quivers is completely characterised and the moduli space singularity structure fully determined for all such theories. The class of good Dn Dynkin quivers is denoted Dμ(n)p where n ≥ 2 is an integer, and μ are integer partitions and p ∈ \ even, odd\ denotes membership of one of two broad subclasses. A full assessment of which so2n nilpotent varieties are realisable as Dn Dynkin quiver moduli spaces is provided. Quiver addition is introduced and is used to give large subclasses of Dn Dynkin quivers poset structure. The partial ordering is determined by inclusion relations for the moduli space branches. The resulting Hasse diagrams are used to both classify Dn Dynkin quivers and determine the moduli space singularity structure for an arbitrary good theory. The poset constructions and local moduli space analyses are complemented throughout by explicit checks utilising moduli space dimension matching.