A compared analysis of the susceptibility in the O(N) theory

Abstract

The longitudinal susceptibility L of the O(N) theory in the broken phase is analyzed by means of three different approaches, namely the leading contribution of the 1/N expansion, the Functional Renormalization Group flow in the Local Potential approximation and the improved effective potential via the Callan-Symanzik equations, properly extended to d=4 dimensions through the expansion in powers of ε=4-d. The findings of the three approaches are compared and their agreement in the large N limit is shown. The numerical analysis of the Functional Renormalization Group flow equations at small N supports the vanishing of L-1 in d=3 and d=3.5 but is not conclusive in d=4, where we have to resort to the Callan-Smanzik approach. At finite N as well as in the limit N∞, we find that -1L vanishes with J as Jε/2 for ε>0 and as ( (J))-1 in d=4.