In this note, we point out that infinite-volume Gibbs measures of spin glass models on the hypercube can be identified as random probability measures on the unit ball of a Hilbert space. This simple observation follows from a result of Dovbysh and Sudakov on weakly exchangeable random matrices. Limiting Gibbs measures can then be studied as single well-defined objects. This approach naturally extends the space of random overlap structures as defined by Aizenman et al. We discuss the Ruelle probability cascades and the stochastic stability within this framework. As an application, we use an idea of Parisi and Talagrand to prove that if a sequence of finite-volume Gibbs measures satisfies the Ghirlanda–Guerra identities, then the infinite-volume measure must be singular as a measure on a Hilbert space.

Topics
Magnetic materials, Magnetic ordering, Free energy, Measure theory, Probability theory, Calculus of variations, Hilbert space, Covariance and correlation, Markov processes, Stochastic processes
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© 2008 American Institute of Physics.
2008
American Institute of Physics
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