Nontrivial bundles and defect operators in n-form gauge theories
Abstract
In (d+1)-dimensional 1-form nonabelian gauge theories, we classify nontrivial 0-form bundles in Rd , which yield configurations of D(d-2j)-branes wrapping (d-2j)-cycles cd-2j in Dd-branes. We construct the related defect operators U(2j-1) ( cd-2j ) , which are disorder operators carrying the D(d-2j) charge. We compute the commutation relations between the defect operators and Chern-Simons operators on odd-dimensional closed manifolds, and derive the generalized Witten effect for U(2j-1) ( cd-2j ) . When cd-2j is not exact, U(2j-1) ( cd-2j ) and U(2j-1) (- cd-2j ) can also combine into an electric (2j-1)-form global symmetry operator, where the (2j-1)-form is the Chern-Simons form. The dual magnetic (d-2j)-form global symmetry is generated by the D(d-2j) charge. We also study nontrivial 1-form bundles in (d+1)-dimensional 2-form nonabelian gauge theories, where the defect operators are U(2j) ( cd-2j-1 ) . With the field strength of the 1-form taken as the flat connection of the 2-form, we classify the topological sectors in 2-form theories.
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