Discrete Approximations to U(1) Principal Bundles in Abelian Gauge Theory
Abstract
A (d+1)-dimensional field theory with a periodic spatial dimension may be approximated by a d-dimensional theory with a truncated Kaluza-Klein tower of k fields; as k∞, one recovers the original (d+1)-dimensional theory. One may similarly expect that U(1)-valued Maxwell theory may be approximated by Zk-valued gauge theory and that, as k∞, one recovers the original Maxwell theory. However, this fails: the k∞ limit of Zk-valued gauge theory is flat Maxwell theory with no local degrees of freedom. We instead construct field theories Tk such that, with appropriate matter couplings, the k∞ limit does recover Maxwell theory in the absence of magnetic monopoles (but with possible Wilson loops), and show that Tk can be understood as Maxwell theory with the insertion of a certain nonlocal operator that projects out principal U(1)-bundles that do not arise from principal Zk-bundles sectors (in particular, projecting out sectors with monopole charges).
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