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Machine learning invariants of arithmetic curves

Yang‐Hui He, Kyu‐Hwan Lee, Thomas Oliver

2022Journal of Symbolic Computation16 citationsDOIOpen Access PDF

Abstract

We show that standard machine learning algorithms may be trained to predict certain invariants of low genus arithmetic curves. Using datasets of size around 105, we demonstrate the utility of machine learning in classification problems pertaining to the BSD invariants of an elliptic curve (including its rank and torsion subgroup), and the analogous invariants of a genus 2 curve. Our results show that a trained machine can efficiently classify curves according to these invariants with high accuracies (>0.97). For problems such as distinguishing between torsion orders, and the recognition of integral points, the accuracies can reach 0.998.

Topics & Concepts

MathematicsElliptic curveArithmeticTorsion (gastropod)GenusArtificial intelligenceAlgebra over a fieldAlgorithmPure mathematicsComputer scienceMedicineSurgeryBiologyBotanyAlgebraic Geometry and Number TheoryCryptography and Residue ArithmeticPolynomial and algebraic computation
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