Generalized F-Theorem and the ε Expansion

Abstract

Some known constraints on Renormalization Group flow take the form of inequalities: in even dimensions they refer to the coefficient a of the Weyl anomaly, while in odd dimensions to the sphere free energy F. In recent work arXiv:1409.1937 it was suggested that the a- and F-theorems may be viewed as special cases of a Generalized F-Theorem valid in continuous dimension. This conjecture states that, for any RG flow from one conformal fixed point to another, F UV > F IR, where F= (π d/2) ZSd. Here we provide additional evidence in favor of the Generalized F-Theorem. We show that it holds in conformal perturbation theory, i.e. for RG flows produced by weakly relevant operators. We also study a specific example of the Wilson-Fisher O(N) model and define this CFT on the sphere S4-ε, paying careful attention to the beta functions for the coefficients of curvature terms. This allows us to develop the ε expansion of F up to order ε5. Pade extrapolation of this series to d=3 gives results that are around 2-3\% below the free field values for small N. We also study RG flows which include an anisotropic perturbation breaking the O(N) symmetry; we again find that the results are consistent with F UV > F IR.