A power counting theorem for a p2aφ4 tensorial group field theory

Abstract

We introduce a tensorial group field theory endowed with weighted interaction terms of the form p2a φ4. The model can be seen as a field theory over d=3,4 copies of U(1) where formal powers of Laplacian operators, namely a, a>0, act on tensorial φ4-interactions producing, after Fourier transform, p2aφ4 interactions. Using multi-scale analysis, we provide a power counting theorem for this type of models. A new quantity depending on the incidence matrix between vertices and faces of Feynman graphs is invoked in the degree of divergence of amplitudes. As a result, generally, the divergence degree is enhanced compared to the divergence degree of models without weighted vertices. The subleading terms in the partition function of the φ4 tensorial models become, in some cases, the dominant ones in the p2aφ4 models. Finally, we explore sufficient conditions on the parameter a yielding a list of potentially super-renormalizable p2aφ4 models.