On the six-loop scaling dimensions of the (φ2)n operators in d=3

Abstract

We consider a class of singlet operators (φ2)n in the three-dimensional O(N) model with λ2 φ6 interaction. Recently, the corresponding anomalous dimensions γ2n were computed by semiclassical methods and the all-loop result for the leading-n corrections in the small λ limit was found. In this paper, we obtain the six-loop expressions not only for the leading-n contribution but also for the subleading one. While the leading correction confirms the predictions of recent semiclassical calculation, the subleading one is a new result and will serve as a future welcome check for all-loop expressions. As an important by-product of our calculation, we provide a full dependence on n of the four-loop γ2n in the O(N) case.

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