Litcius/Paper detail

Hilbert series, machine learning, and applications to physics

Jiakang Bao, Yang‐Hui He, Edward Hirst, Johannes Hofscheier, Alexander Kasprzyk, Suvajit Majumder

2022Physics Letters B20 citationsDOIOpen Access PDF

Abstract

We describe how simple machine learning methods successfully predict geometric properties from Hilbert series (HS). Regressors predict embedding weights in projective space to ∼1 mean absolute error, whilst classifiers predict dimension and Gorenstein index to >90% accuracy with ∼0.5% standard error. Binary random forest classifiers managed to distinguish whether the underlying HS describes a complete intersection with high accuracies exceeding 95%. Neural networks (NNs) exhibited success identifying HS from a Gorenstein ring to the same order of accuracy, whilst generation of “fake” HS proved trivial for NNs to distinguish from those associated to the three-dimensional Fano varieties considered.

Topics & Concepts

Series (stratigraphy)PhysicsFano planeEmbeddingIntersection (aeronautics)Dimension (graph theory)Artificial neural networkHilbert spaceBinary numberArtificial intelligenceHilbert–Poincaré seriesParticle physicsPattern recognition (psychology)AlgorithmPure mathematicsMachine learningQuantum mechanicsComputer scienceMathematicsArithmeticBiologyPaleontologyEngineeringAerospace engineeringAlgebraic Geometry and Number TheoryCommutative Algebra and Its ApplicationsAlgebraic structures and combinatorial models