Free energy expansion of the spin glass with finite connectivity for \(\infty\) RSB

In this paper, we investigate the finite connectivity spin-glass problem. Our work is focused on the expansion around the point of infinite connectivity of the free energy of a spin glass on a graph with Poissonian distributed connectivity: we are interested to study the first-order correction to the infinite connectivity result for large values or the connectivity \(z\). The same calculations for one and two replica symmetry breakings were done in previous works; the result for the first-order correction was divergent in the limit of zero temperature and it was suggested that it was an artifact for having a finite number of replica symmetry breakings. In this paper we are able to calculate the expansion for an infinite number of replica symmetry breakings: in the zero-temperature limit, we obtain a well defined free energy. We have shown that cancellations of divergent terms occur in the case of an infinite number of replica symmetry breakings and that the pathological behavior of the expansion was due only to the finite number of replica symmetry breakings.