Statistical Physics Group

Team 106, Jean Lamour Institute

                     
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Articles in peer-reviewed journals

Infinite disorder and correlation fixed point in the Ising model with correlated disorder
Chatelain C.
Eur. Phys. J. Spec. Top. 226 (2017) 805
DOI : 10.1140/epjst/e2016-60332-9
ArXiv : arxiv:1610.05539 [PDF]

Recent Monte Carlo simulations of the q-state Potts model with a disorder displaying slowly-decaying correlations reported a violation of hyperscaling relation caused by large disorder fluctuations and the existence of a Griffiths phase, as in random systems governed by an infinite-disorder fixed point. New simulations, directly made in the limit of an infinite disorder strength, are presented. The magnetic scaling dimension is shown to correspond to the correlated percola-tion fixed point. The latter is shown to be unstable at finite disorder strength but with a large cross-over length which is not accessible to Monte Carlo simulations.



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