Beyond one-loop calculation: Higher-order effects on Gross-Neveu-Yukawa tensorial criticality

Abstract

We study the Gross-Neveu-Yukawa field theory for the SO(N) symmetric traceless rank-two tensor order parameter coupled to Majorana fermions using the ε-expansion around upper critical dimensions of 3+1 to two loops. Previously we established in the one-loop calculation that the theory does not exhibit a critical fixed point for N ≥ 4, but that nevertheless the stable fixed point inevitably emerges at a large number of fermion flavors Nf. For Nf < Nf,c1 ≈ N/2, no critical fixed point exists; for Nf,c1 < Nf < Nf,c2, a real critical fixed point emerges from the complex plane but fails to satisfy the additional stability conditions necessary for a continuous phase transition; and finally only for Nf > Nf,c2 ≈ N, the fixed point satisfies the stability conditions as well. In the present work we compute the O(ε) (two-loop) corrections to the critical flavour numbers Nf,c1 and Nf,c2. Most importantly, we observe a sharp decrease in Nf,c2 from its one-loop value, which brings it closer to the point Nf =1 relevant to the standard Gross-Neveu model. Some three-loop results are also presented and discussed.