A bstract For any gauge theory, there may be a subgroup of the gauge group which acts
trivially on the matter content. While many physical observables are not sensitive to this fact,
the choice of the precise gauge group becomes crucial when the magnetic lattice of the
theory is considered. This question is addressed in the context of Coulomb branches for
3d\(\mathcal {N}\)= 4 quiver gauge theories, which are moduli spaces of dressed monopole
operators. We compute the Coulomb branch Hilbert series of many unitary-orthosymplectic …

For any gauge theory, there may be a subgroup of the gauge group which acts trivially on
the matter content. While many physical observables are not sensitive to this fact, the choice
of the precise gauge group becomes crucial when the magnetic lattice of the theory is
considered. This question is addressed in the context of Coulomb branches for 3d N= 4
quiver gauge theories, which are moduli spaces of dressed monopole operators. We
compute the Coulomb branch Hilbert series of many unitary-orthosymplectic quivers for …