A Tale of Two Orbits: Non-Simply Laced Mirror

Abstract

A three-dimensional N=4 gauge theory is constructed whose Higgs branch realizes the affine closure of the cotangent bundle of the minimal nilpotent orbit of sln. This space is a symplectic singularity recently identified by Fu and Liu as a U(1) hyperkähler quotient of the closure of the minimal nilpotent orbit of so2n+2. The theory arises by gauging an SO(2)(1) subgroup of the flavour symmetry of SU(2) SQCD with n+1 flavours. The Hilbert series is computed and the stratification is determined. A non-simply laced magnetic quiver is proposed whose Coulomb branch reproduces the same singularity. Evidence is thereby provided for a mirror pair involving a non-simply laced quiver, further tested through quiver subtraction and Hasse diagram inversion. A related Z2 quotient of the magnetic lattice is also analysed, and the exceptional behaviour in the case n=2, where A1 C1, is explained. This construction provides a concrete example in which the Higgs-branch structure associated with a non-simply laced magnetic quiver can be inferred and validated through its mirror dual.