Perturbative and Nonperturbative Studies of CFTs with MN Global Symmetry
Abstract
Fixed points in three dimensions described by conformal field theories with MNm,n= O(m)n Sn global symmetry have extensive applications in critical phenomena. Associated experimental data for m=n=2 suggest the existence of two non-trivial fixed points, while the expansion predicts only one, resulting in a puzzling state of affairs. A recent numerical conformal bootstrap study has found two kinks for small values of the parameters m and n, with critical exponents in good agreement with experimental determinations in the m=n=2 case. In this paper we investigate the fate of the corresponding fixed points as we vary the parameters m and n. We find that one family of kinks approaches a perturbative limit as m increases, and using large spin perturbation theory we construct a large m expansion that fits well with the numerical data. This new expansion, akin to the large N expansion of critical O(N) models, is compatible with the fixed point found in the expansion. For the other family of kinks, we find that it persists only for n=2, where for large m it approaches a non-perturbative limit with φ≈ 0.75. We investigate the spectrum in the case MN100,2 and find consistency with expectations from the lightcone bootstrap.
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