Monte Carlo Study of Correlations in Quantum Spin Chains at Non-Zero Temperature

Abstract

Antiferromagnetic Heisenberg spin chains with various spin values (S=1/2,1,3/2,2,5/2) are studied numerically with the quantum Monte Carlo method. Effective spin S chains are realized by ferromagnetically coupling n=2S antiferromagnetic spin chains with S=1/2. The temperature dependence of the uniform susceptibility, the staggered susceptibility, and the static structure factor peak intensity are computed down to very low temperatures, T/J ≈ 0.01. The correlation length at each temperature is deduced from numerical measurements of the instantaneous spin-spin correlation function. At high temperatures, very good agreement with exact results for the classical spin chain is obtained independent of the value of S. For S=2 chains which have a gap , the correlation length and the uniform susceptibility in the temperature range < T < J are well predicted by a semi-classical theory due to Damle and Sachdev.

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