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About: Random energy model     Goto   Sponge   NotDistinct   Permalink

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In the statistical physics of disordered systems, the random energy model is a toy model of a system with quenched disorder, such as a spin glass, having a first-order phase transition. It concerns the statistics of a collection of spins (i.e. degrees of freedom that can take one of two possible values ) so that the number of possible states for the system is . The energies of such states are independent and identically distributed Gaussian random variables with zero mean and a variance of . Many properties of this model can be computed exactly. Its simplicity makes this model suitable for pedagogical introduction of concepts like quenched disorder and replica symmetry.