2015
DOI: 10.1088/1742-5468/2015/01/p01021
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Finite size corrections in the random energy model and the replica approach

Abstract: We present a systematict and exact way of computing finite size corrections for the random energy model, in its low temperature phase. We obtain explicit (though complicated) expressions for the finite size corrections of the overlap functions. In its low temperature phase, the random energy model is known to exhibit Parisi's broken symmetry of replicas. The finite size corrections given by our exact calculation can be reproduced using replicas if we make specific assumptions about the fluctuations (with negat… Show more

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Cited by 12 publications
(42 citation statements)
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References 60 publications
(167 reference statements)
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“…This can be interpreted as fluctuations in the replica block size with a negative variance. The mechanism is similar to the one we found recently in the random energy model [1]. We also consider a simultaneous freezing situation, which is known to exhibit one step replica symmetry breaking.…”
supporting
confidence: 66%
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“…This can be interpreted as fluctuations in the replica block size with a negative variance. The mechanism is similar to the one we found recently in the random energy model [1]. We also consider a simultaneous freezing situation, which is known to exhibit one step replica symmetry breaking.…”
supporting
confidence: 66%
“…In this paper we will study a variant of the original GREM that we will refer to as the Poisson GREM. As in the REM [1] this has the advantage of simplifying some of the analysis while giving the same results for large systems, including the leading finite size corrections (see appendix B).…”
Section: Definition Of the Poisson Gremmentioning
confidence: 99%
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