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Adding machine learning within Hamiltonians: Renormalization group transformations, symmetry breaking and restoration

Dimitrios Bachtis, Gert Aarts, Biagio Lucini

2021Cronfa (Swansea University)20 citationsOpen Access PDF

Abstract

We present a physical interpretation of machine learning functions, opening up the possibility to control properties of statistical systems via the inclusion of these functions in Hamiltonians. In particular, we include the predictive function of a neural network, designed for phase classification, as a conjugate variable coupled to an external field within the Hamiltonian of a system. Results in the two-dimensional Ising model evidence that the field can induce an order-disorder phase transition by breaking or restoring the symmetry, in contrast with the field of the conventional order parameter which causes explicit symmetry breaking. The critical behavior is then studied by proposing a Hamiltonian-agnostic reweighting approach and forming a renormalization group mapping on quantities derived from the neural network. Accurate estimates of the critical point and of the critical exponents related to the operators that govern the divergence of the correlation length are provided. We conclude by discussing how the method provides an essential step toward bridging machine learning and physics.Received 7 October 2020Accepted 27 January 2021DOI:https://doi.org/10.1103/PhysRevResearch.3.013134Published by the American Physical Society under the terms of the Creative Commons Attribution 4.0 International license. Further distribution of this work must maintain attribution to the author(s) and the published article's title, journal citation, and DOI.Published by the American Physical SocietyPhysics Subject Headings (PhySH)Research AreasPhase transitionsRenormalization groupPhysical SystemsArtificial neural networksTechniquesCritical exponentsCritical phenomenaStatistical Physics

Topics & Concepts

Renormalization groupSymmetry breakingArtificial neural networkHamiltonian (control theory)Ising modelTheoretical physicsPhysicsStatistical physicsComputer scienceArtificial intelligenceMathematicsQuantum mechanicsMathematical optimizationQuantum many-body systemsTheoretical and Computational PhysicsStatistical Mechanics and Entropy