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Storage and Learning Phase Transitions in the Random-Features Hopfield Model

Matteo Negri, Clarissa Lauditi, Giovanna Perugini, Carlo Lucibello, Enrico M. Malatesta

2023Physical Review Letters18 citationsDOI

Abstract

The Hopfield model is a paradigmatic model of neural networks that has been analyzed for many decades in the statistical physics, neuroscience, and machine learning communities. Inspired by the manifold hypothesis in machine learning, we propose and investigate a generalization of the standard setting that we name random-features Hopfield model. Here, P binary patterns of length N are generated by applying to Gaussian vectors sampled in a latent space of dimension D a random projection followed by a nonlinearity. Using the replica method from statistical physics, we derive the phase diagram of the model in the limit P,N,D→∞ with fixed ratios α=P/N and α_{D}=D/N. Besides the usual retrieval phase, where the patterns can be dynamically recovered from some initial corruption, we uncover a new phase where the features characterizing the projection can be recovered instead. We call this phenomena the learning phase transition, as the features are not explicitly given to the model but rather are inferred from the patterns in an unsupervised fashion.

Topics & Concepts

Hopfield networkStatistical physicsProjection (relational algebra)Random projectionArtificial intelligenceArtificial neural networkComputer scienceUnsupervised learningDimension (graph theory)Phase transitionGeneralizationManifold (fluid mechanics)GaussianPhysicsData pointAlgorithmMathematicsCombinatoricsQuantum mechanicsMathematical analysisMechanical engineeringEngineeringNeural Networks and ApplicationsStatistical Mechanics and EntropyTheoretical and Computational Physics
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