Journal of High Energy Physics (Oct 2019)
The large charge limit of scalar field theories, and the Wilson-Fisher fixed point at 𝜖 = 0
Abstract
Abstract We study the sector of large charge operators ϕ n (ϕ being the complexified scalar field) in the O(2) Wilson-Fisher fixed point in 4−E dimensions that emerges when the coupling takes the critical value g ∼ 𝜖. We show that, in the limit g → 0, when the theory naively approaches the gaussian fixed point, the sector of operators with n → ∞ at fixed g n 2 ≡ λ remains non-trivial. Surprisingly, one can compute the exact 2-point function and thereby the non-trivial anomalous dimension of the operator ϕ n by a full resummation of Feynman diagrams. The same result can be reproduced from a saddle point approximation to the path integral, which partly explains the existence of the limit. Finally, we extend these results to the three-dimensional O(2)-symmetric theory with ( ϕ ¯ $$ \overline{\phi} $$ ϕ)3 potential.
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