Litcius/Paper detail

Numerical metrics for complete intersection and Kreuzer–Skarke Calabi–Yau manifolds

Magdalena Larfors, André Lukas, Fabian Ruehle, Robin Schneider

2022Machine Learning Science and Technology37 citationsDOIOpen Access PDF

Abstract

Abstract We introduce neural networks (NNs) to compute numerical Ricci-flat Calabi–Yau (CY) metrics for complete intersection and Kreuzer–Skarke (KS) CY manifolds at any point in Kähler and complex structure moduli space, and introduce the package cymetric which provides computation realizations of these techniques. In particular, we develop and computationally realize methods for point-sampling on these manifolds. The training for the NNs is carried out subject to a custom loss function. The Kähler class is fixed by adding to the loss a component which enforces the slopes of certain line bundles to match with topological computations. Our methods are applied to various manifolds, including the quintic manifold, the bi-cubic manifold and a KS manifold with Picard number two. We show that volumes and line bundle slopes can be reliably computed from the resulting Ricci-flat metrics. We also apply our results to compute an approximate Hermitian–Yang–Mills connection on a specific line bundle on the bi-cubic.

Topics & Concepts

Manifold (fluid mechanics)MathematicsLine bundleModuli spaceCalabi–Yau manifoldPure mathematicsVector bundleComputationChern classQuintic functionConnection (principal bundle)Intersection (aeronautics)Hermitian manifoldTopology (electrical circuits)Mathematical analysisRicci curvatureAlgorithmGeometryCurvatureCombinatoricsPhysicsMechanical engineeringAerospace engineeringNonlinear systemQuantum mechanicsEngineeringGeometry and complex manifoldsGeometric Analysis and Curvature FlowsAlgebraic Geometry and Number Theory