Wei-Kuo Chen, Hsi-Wei Hsieh, Chii-Ruey Hwang, Yuan-Chung Sheu
Published 2015-01-09Version 1
We consider the problem of disorder chaos in the spherical mean-field model. It is concerned about the behavior of the overlap between two independently sampled spin configurations from two Gibbs measures with the same external parameters. The prediction states that if the disorders in the Hamiltonians are slightly decoupled, then the overlap will be concentrated near a constant value. Following Guerra's replica symmetry breaking scheme, we establish this at the level of the free energy as well as the Gibbs measure irrespective the presence or absence of the external field.
Absence of Disorder Chaos for Ising Spin Glasses on $\mathbb Z^d$
Structure of Gibbs measures for planar FK-percolation and Potts models
Parisi formula, disorder chaos and fluctuation for the ground state energy in the spherical mixed p-spin models
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