Phase transition of a one-dimensional Ising model with distance-dependent connections
Abstract
The critical behavior of Ising model on a one-dimensional network, which has long-range connections at distances l>1 with the probability (l) l-m, is studied by using Monte Carlo simulations. Through studying the Ising model on networks with different m values, this paper discusses the impact of the global correlation, which decays with the increase of m, on the phase transition of the Ising model. Adding the analysis of the finite-size scaling of the order parameter [< M>], it is observed that in the whole range of 0<m<2, a finite-temperature transition exists, and the critical exponents show consistence with mean-field values, which indicates a mean-field nature of the phase transition.
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