Fractionalization of flux tubes in 3d and screening by emergent electric charges in 2d
Abstract
We consider a class of 3d theories with a Zn magnetic symmetry in which confinement is generated by charge n clusters of monopoles. Such theories naturally arise in quantum antiferromagnets in 2+1, QCD-like theories on R3 × S1, and U(1) lattice theory with restricted monopole sums. A confining string fractionates into n strings which each carry 1/n electric flux. We construct a twisted compactification (equivalently periodic compactification with a topological defect insertion) on R2 × S1 that preserves the vacuum structure. Despite the absence of electric degrees of freedom in the microscopic Lagrangian, we show that large Wilson loops are completely/partially screened for even/odd n, even when the compactification scale is much larger than the Debye length. We show the emergence of fractional electric charges ( 2/n) at the junctions of the domain lines and topological defects. We end with some remarks on screening vs. confinement.
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