Hilbert Series and Complete-Intersection Structure of Coulomb Branches for Non-Maximal Nilpotent Orbits of SL(N)

Abstract

We study the Coulomb branches of three-dimensional N=4 quiver gauge theories of type T(SU(N)) associated with non-maximal nilpotent orbits of SL(N). Using the Hall--Littlewood closed form for Coulomb-branch Hilbert series, together with independent checks from the monopole formula, we compute exact unrefined Hilbert series for all non-maximal partitions N with N=4, and extend the analysis to N=5,6. By analyzing the plethystic logarithms of the resulting Hilbert series, we find that in all cases examined the Coulomb branch is a complete intersection. The number of generators and relations follows a uniform pattern governed by the transpose partition T, with exactly N-1 relations appearing independently of in these examples. We summarize the results in explicit classification tables and formulate conjectures extending these patterns to arbitrary N. Our findings provide strong evidence for a remarkable uniformity in the algebraic structure of Coulomb branches within the T(SU(N)) family at low rank.