First-order transition features of the 3D bimodal random-field Ising model

Abstract

Two numerical strategies based on the Wang-Landau and Lee entropic sampling schemes are implemented to investigate the first-order transition features of the 3D bimodal ( h) random-field Ising model at the strong disorder regime. We consider simple cubic lattices with linear sizes in the range L=4-32 and simulate the system for two values of the disorder strength: h=2 and h=2.25. The nature of the transition is elucidated by applying the Lee-Kosterlitz free-energy barrier method. Our results indicate that, despite the strong first-order-like characteristics, the transition remains continuous, in disagreement with the early mean-field theory prediction of a tricritical point at high values of the random-field.