Local energy statistics in disordered systems: a proof of the local REM conjecture
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Publication:863121
DOI10.1007/s00220-005-1516-1zbMath1104.82026arXivcond-mat/0504366OpenAlexW3105663923WikidataQ123310110 ScholiaQ123310110MaRDI QIDQ863121
Publication date: 25 January 2007
Published in: Communications in Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/cond-mat/0504366
Related Items
On the energy landscape of the mixed even \(p\)-spin model, A tomography of the GREM: Beyond the REM conjecture, Local energy statistics in spin glasses, Universality of the REM for dynamics of mean-field spin glasses, Variational bounds for the generalized random energy model, Proof of the local REM conjecture for number partitioning. I: Constant energy scales, Proof of the local REM conjecture for number partitioning. II. Growing energy scales, Universality and extremal aging for dynamics of spin glasses on subexponential time scales
Cites Work
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- Fluctuations of the free energy in the REM and the \(p\)-spin SK models
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- Random-energy model: An exactly solvable model of disordered systems
- Proof of the local REM conjecture for number partitioning. I: Constant energy scales
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- Phase Transition in the Number Partitioning Problem
- Phase diagram for the constrained integer partitioning problem
- Poisson convergence in the restricted k‐partitioning problem
- Statistical Mechanics of Disordered Systems
- A physicist's approach to number partitioning
