Large N critical exponents for the chiral Heisenberg Gross-Neveu universality class

Abstract

We compute the large N critical exponents η, ηφ and 1/ in d-dimensions in the chiral Heisenberg Gross-Neveu model to several orders in powers of 1/N. For instance, the large N conformal bootstrap method is used to determine η at O(1/N3) while the other exponents are computed to O(1/N2). Estimates of the exponents for a phase transition in graphene are given which are shown to be commensurate with other approaches. In particular the behaviour of the exponents in 2 < d < 4 is in qualitative agreement with a functional renormalization group analysis. The ε-expansion of the exponents near four dimensions are in agreement with recent four loop perturbation theory.