2023
DOI: 10.1007/jhep04(2023)070
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Line operators in Chern-Simons-Matter theories and Bosonization in Three Dimensions II: Perturbative analysis and all-loop resummation

Abstract: We study mesonic line operators in Chern-Simons theories with bosonic or fermionic matter in the fundamental representation. In this paper, we elaborate on the classification and properties of these operators using all loop resummation of large N perturbation theory. We show that these theories possess two conformal line operators in the fundamental representation. One is a stable renormalization group fixed point, while the other is unstable. They satisfy first-order chiral evolution equations, in which a smo… Show more

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Cited by 11 publications
(3 citation statements)
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References 133 publications
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“…2 Sometimes, the transverse rotations SO(d − p) may not be preserved by a conformal defect [21][22][23][24]; this will not be important for our analysis. 3 Notice that when the bulk theory is gapped one can integrate out the bulk degrees of freedom.…”
Section: Jhep03(2024)022mentioning
confidence: 99%
See 2 more Smart Citations
“…2 Sometimes, the transverse rotations SO(d − p) may not be preserved by a conformal defect [21][22][23][24]; this will not be important for our analysis. 3 Notice that when the bulk theory is gapped one can integrate out the bulk degrees of freedom.…”
Section: Jhep03(2024)022mentioning
confidence: 99%
“…This is because the identities (3.1) and (3.2) imply that the defect currents, when they exist, are primary operators of spin J = 1 and scaling dimension ∆ Ĵ = p − 1. 22 However, the representation theory of the p-dimensional conformal group implies that primaries with ∆ − J = p − 2 and J ≥ 1 are conserved, and therefore a defect current cannot contribute nontrivially to eq. (3.1) since ta (y) = ∂ m Ĵm a (y) = 0.…”
Section: Jhep03(2024)022mentioning
confidence: 99%
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