<p>Quotient quiver subtraction is a simple combinatorial prescription for gauging Coulomb branch isometry subgroups of 3d <InlineEquation ID="IEq1"> <EquationSource Format="MATHML"><math display="inline"> <mi mathvariant="script">N</mi> </math></EquationSource> <EquationSource Format="TEX">\( \mathcal{N} \)</EquationSource> </InlineEquation> = 4 quiver gauge theories. This paper uses Type IIB brane constructions with O5 planes to extend the prescription to gauge Sp(<i>n</i>), SO(<i>n</i>), and Sp(<i>n</i>) coupled to a half-hypermultiplet Coulomb branch isometry subgroups of quivers with unitary gauge groups. The gauging procedure is no longer solely a subtraction — additional steps change the graph type. The method is applied to provide alternative constructions of the Higgs branch of certain SCFTs in higher dimensions.</p>

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Quotient quiver subtraction — Classical groups

  • Sam Bennett,
  • Amihay Hanany,
  • Guhesh Kumaran

摘要

Quotient quiver subtraction is a simple combinatorial prescription for gauging Coulomb branch isometry subgroups of 3d N \( \mathcal{N} \) = 4 quiver gauge theories. This paper uses Type IIB brane constructions with O5 planes to extend the prescription to gauge Sp(n), SO(n), and Sp(n) coupled to a half-hypermultiplet Coulomb branch isometry subgroups of quivers with unitary gauge groups. The gauging procedure is no longer solely a subtraction — additional steps change the graph type. The method is applied to provide alternative constructions of the Higgs branch of certain SCFTs in higher dimensions.