Correlation functions of the One-Dimensional Random Field Ising Model at Zero Temperature

Abstract

We consider the one-dimensional random field Ising model, where the spin-spin coupling, J, is ferromagnetic and the external field is chosen to be +h with probability p and -h with probability 1-p. At zero temperature, we calculate an exact expression for the correlation length of the quenched average of the correlation function s0 sn - s0 sn in the case that 2J/h is not an integer. The result is a discontinuous function of 2J/h. When p = 1 2, we also place a bound on the correlation length of the quenched average of the correlation function s0 sn .

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