Ensemble renormalization group for the random-field hierarchical model

Decelle, Aurélien; Parisi, G.; Rocchi, Jacopo

doi:10.1103/physreve.89.032132

Cited by 9 publications

(7 citation statements)

References 28 publications

(52 reference statements)

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“…In this regard, we observe that a variant of the ERG method has been recently applied to the ferromagnetic version of the HEA with a random magnetic field, where it has been claimed to yield accurate estimates of ν [19]. Specifically, this modification of the ERG method differs from the one of [18].…”

Section: Discussionmentioning

confidence: 99%

“…The sample-by-sample procedure predicts the correct mean-field value of the critical exponent ν related to the divergence of the correlation length above the upper critical dimension, while its predictions disagree with numerical simulations below the upper critical dimension [15,18]. On the other hand, the ERG procedure has been claimed to predict the correct behavior of ν , both above and below the upper critical dimension [18,19].…”

Section: Introductionmentioning

confidence: 87%

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Real-space renormalization-group methods for hierarchical spin glasses

Castellana¹

2019

J. Phys. A: Math. Theor.

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We focus on two real-space renormalization-group (RG) methods recently proposed for a hierarchical model of a spin glass: A sample-by-sample method, in which the RG transformation is performed separately on each disorder sample, and an ensemble RG (ERG) method [M. C. Angelini, G. Parisi, and F. Ricci-Tersenghi. Ensemble renormalization group for disordered systems. Phys. Rev. B, 87(13):134201, 2013] in which the transformation is based on an average over samples. Above the upper critical dimension, the sample-by-sample method yields the correct mean-field value for the critical exponent ν related to the divergence of the correlation length, while it does not predict the correct qualitative behavior of ν below the upper critical dimension. On the other hand, the ERG procedure has been claimed to predict the correct behavior of ν both above and below the upper critical dimension. Here, we straighten out the reasons for the discrepancy between the two methods above, by demonstrating that the ERG method predicts a marginally stable critical fixed point, thus implying a prediction for the critical exponent ν given by 2 1/ν 1. This prediction disagrees, on a qualitative and quantitative level, both with the mean-field value of ν above the critical dimension, and with numerical estimates of ν below the upper critical dimension. Therefore, our results show that finding a real-space RG method for spin glasses which yields the correct prediction for universal quantities below the upper critical dimension is still an open problem, for which our analysis may provide some general guidance for future studies.

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Section: Discussionmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 87%

Real-space renormalization-group methods for hierarchical spin glasses

Castellana¹

2019

J. Phys. A: Math. Theor.

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“…, P q k that interact through the off-diagonal elements of A k (s 1,...,q ), as can be noted from eq. (28). By assuming a > βλ…”

Section: The Replica Methodsmentioning

confidence: 99%

“…Dyson hierarchical models exhibit qualitatively a similar phenomenology, with the dimension D replaced by an exponent τ , the latter being responsible for controlling the power-law decay of the interactions as a function of the inter-site distance. Although this intuitive analogy has been recently exploited to study quenched disorder systems in the non-mean-field sector [17,18,19,20,21,22,23,24,25,26,27,28,29], it is not clear to which extent there is a clear mapping between the spatial dimension D and the exponent τ [25,26,27,29]. Indeed, a strict mapping holds in the mean-field region, whereas it does not give satisfying results for low enough dimensions [27,29].…”

Section: Introductionmentioning

confidence: 99%

Statistical mechanics of the spherical hierarchical model with random fields

Metz,

Rocchi,

Urbani

2014

Preprint

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We study analytically the equilibrium properties of the spherical hierarchical model in the presence of random fields. The expression for the critical line separating a paramagnetic from a ferromagnetic phase is derived. The critical exponents characterising this phase transition are computed analytically and compared with those of the corresponding D-dimensional short-range model, leading to conclude that the usual mapping between one dimensional long-range models and D-dimensional short-range models holds exactly for this system, in contrast to models with Ising spins. Moreover, the critical exponents of the pure model and those of the random field model satisfy a relationship that mimics the dimensional reduction rule. The absence of a spin-glass phase is strongly supported by the local stability analysis of the replica symmetric saddle-point as well as by an independent computation of the free-energy using a renormalization-like approach. This latter result enlarges the class of random field models for which the spin-glass phase has been recently ruled out.

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“…Far from artificial intelligence, but related to the task of bypassing mean-field limitations, there is currently renewed interest in hierarchical models, and specifically in models where closer spins result in stronger links (see figure 1). Recently, Dysonʼs pioneering work [30], where the hierarchical ferromagnet was introduced and its phase transition (splitting an ergodic region from a ferromagnetic one) was rigorously proven, has been extended to investigate extensions to spin-glasses [31,[33][34][35][36][37][38]. Although an analytical solution is still not available, researchers have made significant steps toward deep comprehension of hierarchical statistical mechanics [32,[39][40][41][42][43][44][45].…”

Section: Introductionmentioning

confidence: 99%

Metastable states in the hierarchical Dyson model drive parallel processing in the hierarchical Hopfield network

Agliari

Barra

Galluzzi

et al. 2014

J. Phys. A: Math. Theor.

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In this paper we introduce and investigate the statistical mechanics of hierarchical neural networks: First, we approach these systems à la Mattis, by thinking at the Dyson model as a single-pattern hierarchical neural network and we discuss the stability of different retrievable states as predicted by the related self-consistencies obtained from a mean-field bound and from a bound that bypasses the mean-field limitation. The latter is worked out by properly reabsorbing fluctuations of the magnetization related to higher levels of the hierarchy into effective fields for the lower levels. Remarkably, mixing Amit's ansatz technique (to select candidate retrievable states) with the interpolation procedure (to solve for the free energy of these states) we prove that (due to gauge symmetry) the Dyson model accomplishes both serial and parallel processing. One step forward, we extend this scenario toward multiple stored patterns by implementing the Hebb prescription for learning within the couplings. This results in an Hopfield-like networks constrained on a hierarchical topology, for which, restricting to the low storage regime (where the number of patterns grows at most logarithmical with the amount of neurons), we prove the existence of the thermodynamic limit for the free energy and we give an explicit expression of its mean field bound and of the related improved bound. The resulting self-consistencies for the Mattis magnetizations (that act as order parameters) are studied and the stability of solutions is analyzed to get a picture of the overall retrieval capabilities of the system according to the mean field and to the non-mean-field scenarios. Our main finding is that embedding the Hebbian rule on a hierarchical topology allows the network to accomplish both serial and parallel processing. By tuning the level of fast noise affecting it, or triggering the decay of the interactions with the distance among neurons, the system may switch from sequential retrieval to multitasking features and vice versa. However, as these multitasking capabilities are basically due to the vanishing "dialogue" between spins at long distance, such an effective penury of links strongly penalizes the network's capacity, which results bounded by the low storage.

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Ensemble renormalization group for the random-field hierarchical model

Cited by 9 publications

References 28 publications

Real-space renormalization-group methods for hierarchical spin glasses

Real-space renormalization-group methods for hierarchical spin glasses

Statistical mechanics of the spherical hierarchical model with random fields

Metastable states in the hierarchical Dyson model drive parallel processing in the hierarchical Hopfield network

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