Correlation functions in the two-dimensional random-field Ising model

Abstract

Transfer-matrix methods are used to study the probability distributions of spin-spin correlation functions G in the two-dimensional random-field Ising model, on long strips of width L = 3 - 15 sites, for binary field distributions at generic distance R, temperature T and field intensity h0. For moderately high T, and h0 of the order of magnitude used in most experiments, the distributions are singly-peaked, though rather asymmetric. For low temperatures the single-peaked shape deteriorates, crossing over towards a double-δ ground-state structure. A connection is obtained between the probability distribution for correlation functions and the underlying distribution of accumulated field fluctuations. Analytical expressions are in good agreement with numerical results for R/L 1, low T, h0 not too small, and near G=1. From a finite-size ansatz at T=Tc (h0=0), h0 0, averaged correlation functions are predicted to scale with Ly h0, y =7/8. From numerical data we estimate y=0.875 0.025, in excellent agreement with theory. In the same region, the RMS relative width W of the probability distributions varies for fixed R/L=1 as W h0 f(L h0u) with 0.45, u 0.8 ; f(x) appears to saturate when x ∞, thus implying W h0 in d=2$.

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