Anomalous dimensions of monopole operators in three-dimensional quantum electrodynamics
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The space of local operators in three-dimensional quantum electrodynamics contains monopole operators that create n units of gauge flux emanating from the insertion point. This paper uses the state-operator correspondence to calculate the anomalous dimensions of these monopole operators perturbatively to next-to-leading order in the 1/N[subscript f] expansion, thus improving on the existing leading-order results in the literature. Here, N[subscript f] is the number of two-component complex fermion flavors. The scaling dimension of the n = 1 monopole operator is 0.265N[subscript f] − 0.0383 + O(1/N[subscript f]) at the infrared conformal fixed point.
Date issued
2014-03Department
Massachusetts Institute of Technology. Center for Theoretical PhysicsJournal
Physical Review D
Publisher
American Physical Society
Citation
Pufu, Silviu S. “Anomalous Dimensions of Monopole Operators in Three-Dimensional Quantum Electrodynamics.” Phys. Rev. D 89, no. 6 (March 2014). © 2014 American Physical Society
Version: Final published version
ISSN
1550-7998
1550-2368