On thermodynamic states of the Ising model on scale-free graphs

Abstract

There is proposed a model of scale-free random graphs which are locally close to the uncorrelated complex random networks with divergent k2 studied in e.g. S. N. Dorogovtsev et al, Rev. Mod. Phys. 80, 1275 (2008). It is shown that the Ising model on these graphs with interaction intensities of arbitrary signs with probability one is in a paramagnetic state at sufficiently high finite values of the temperature. For the same graphs, the bond percolation model with probability one is in a nonpercolative state for positive values of the percolation probability. Possible extensions are discussed.