A Cluster Expansion and the Decay of Correlations of the 1D Long-Range Ising Model at Low Temperatures
Abstract
In this work, a convergent low-temperature cluster expansion of the one-dimensional long-range ferromagnetic Ising model with polynomial decay α∈ (1,2] is developed; that is, J(r)=r-α. As an application, the n-point correlations are studied and the two-point correlation is shown to be algebraic with rate of decay exactly α.
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