Renormalization group flow of O(N)3-invariant general sextic tensor model

Abstract

We compute the beta functions for the O(N)3-invariant general sextic tensor model up to cubic order in the coupling constant, and at leading order in the 1/N expansion. Our method is a direct, explicit one, in the sense that we identify the appropriate Feynman graphs, we compute their amplitudes which then allows us to obtain the β functions of the model. We perform these computation considering both a long-range and a short-range propagator, within the dimensional regularization framework. We find three fixed points in the short-range case and a line of fixed points, parameterized by the wheel interaction, in the long-range case. This line of fixed points is identical to the one found in the case of the U(N)3-invariant model. Our result proves that the additional O(N)3-invariant interactions do not modify the long-range fixed point structure of the model.