Fluctuations of the Free Energy of the Spherical Sherrington–Kirkpatrick Model

Abstract: We consider the free energy of the bipartite spherical Sherrington-Kirkpatrick model. We find the critical temperature and prove the limiting free energy for all non-critical temperature. We also show that the law of the fluctuation of the free energy converges to the Gaussian distribution when the temperature is above the critical temperature, and to the GOE Tracy-Widom distribution when the temperature is below the critical temperature. The result is universal, and the analysis is applicable to a more genera… Show more

“…Baik and Lee's result is based on a contour integral representation for the partition function, which reduces the evaluation of F N (β) to a (delicate) saddle point analysis involving quantities studied in random matrix theory. In a subsequent series of work, these authors exploit similar representations to derive the thermodynamic limit of variants of the SSK model, including a model with an additional ferromagnetic (Curie-Weiss) interaction in the Hamiltonian [3], the bipartite SSK model [4], for which the computation of the first order behavior at all temperatures was open, and in a recent joint work with H. Wu, the SSK/Curie-Weiss model at the critical coupling strength [5].…”

“…One such computation is the remarkable result by J. Baik and J.O. Lee [2] concerning the fluctuations of the logarithm partition function Z N (β), defined by…”

Central limit theorem near the critical temperature for the overlap in the 2-spin spherical SK model

“…Baik and Lee's result is based on a contour integral representation for the partition function, which reduces the evaluation of F N (β) to a (delicate) saddle point analysis involving quantities studied in random matrix theory. In a subsequent series of work, these authors exploit similar representations to derive the thermodynamic limit of variants of the SSK model, including a model with an additional ferromagnetic (Curie-Weiss) interaction in the Hamiltonian [3], the bipartite SSK model [4], for which the computation of the first order behavior at all temperatures was open, and in a recent joint work with H. Wu, the SSK/Curie-Weiss model at the critical coupling strength [5].…”

“…One such computation is the remarkable result by J. Baik and J.O. Lee [2] concerning the fluctuations of the logarithm partition function Z N (β), defined by…”

Central limit theorem near the critical temperature for the overlap in the 2-spin spherical SK model

“…As the minimum of the quadratic form (1) on a sphere is obviously given by (minus one half of) the largest eigenvalue λ max of the matrix J, the statistics of the ground state are governed by the Tracy-Widom distribution for GOE, which describes the fluctuations of the largest/smallest eigenvalue in that ensemble [7]. Besides, it was recently proved that for T < T c , the fluctuations of the free energy are also given by the Tracy-Widom distribution, see [6]. Throughout this paper, we will be interested in the limiting case T = 0, which already contains many interesting aspects.…”

Large time zero temperature dynamics of the spherical p  =  2-spin glass model of finite size

“…This completes the proof of the asymptotic normality of log dQ n dP n |P n . Proof of part (2) of Theorem 2.1: Before proving part (1) of Theorem 2.1, we prove part (2). Since…”

“…The case low temperature case (β > 1 2 ) is also well-known in this case where the free energy has a limiting GOE Tracy-Widom distribution with O n − 2 3 fluctuations. One might look at Baik and Lee [2] for a reference.…”

Fluctuation of the Free Energy of Sherrington–Kirkpatrick Model with Curie–Weiss Interaction: The Paramagnetic Regime