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Inequality for local energy of Ising models with quenched randomness and its application

In this study, we extend the lower bound on the average of the local energy of the Ising model with quenched randomness [J. Phys. Soc. Jpn. 76, 074711 (2007)] obtained for a symmetric distribution to an asymmetric one. Compared with the case of symmetric distribution, our bound has a non-trivial term. By applying the acquired bound to a Gaussian distribution, we obtain the lower bounds on the expectation of the square of the correlation function. Thus, we demonstrate that in the Ising model in a Gaussian random field, the spin-glass order parameter generally has a finite value at any temperature, regardless of the forms of the other interactions.

preprint2020arXivOpen access
Manaka OkuyamaMasayuki Ohzeki
cond-mat.stat-mechmath-phmath.MPcond-mat.dis-nn
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Manaka OkuyamaMasayuki Ohzeki

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