Effect of the quartic gradient terms on the critical exponents of the Wilson-Fisher fixed point in O(N) models

Abstract

The effect of the ∂4 terms of the gradient expansion on anomalous dimension η and the correlation length's critical exponent of the Wilson-Fisher fixed point has been determined for the Euclidean O(N) model for N=1 and the number of dimensions 2< d<4 as well as for N 2 and d=3. Wetterich's effective average action renormalization group method is used with field-independent derivative couplings and Litim's optimized regulator. It is shown that the critical theory for N 2 is well approximated by the effective average action preserving O(N) symmetry with the accuracy of η.