Exact Results for Scaling Dimensions of Neutral Operators in scalar CFTs

Abstract

We determine the scaling dimension n for the class of composite operators φn in the λ φ4 theory in d=4-ε taking the double scaling limit n→ ∞ and λ → 0 with fixed λ n via a semiclassical approach. Our results resum the leading power of n at any loop order. In the small λ n regime we reproduce the known diagrammatic results and predict the infinite series of higher-order terms. For intermediate values of λ n we find that n/n increases monotonically approaching a (λ n)1/3 behavior in the λ n ∞ limit. We further generalize our results to neutral operators in the φ4 in d=4-ε, φ3 in d=6-ε, and φ6 in d=3-ε theories with O(N) symmetry.