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Reconstructing manifolds from truncations of spectral triples

Lisa Glaser, Abel B. Stern

2020Journal of Geometry and Physics16 citationsDOIOpen Access PDF

Abstract

We explore the geometric implications of introducing a spectral cut-off on compact Riemannian manifolds. This is naturally phrased in the framework of non-commutative geometry, where we work with spectral triples that are truncated by spectral projections of Dirac-type operators. We associate a metric space of ‘localized’ states to each truncation. The Gromov–Hausdorff limit of these spaces is then shown to equal the underlying manifold one started with. This leads us to propose a computational algorithm that allows us to approximate these metric spaces from the finite-dimensional truncated spectral data. We subsequently develop a technique for embedding the resulting metric graphs in Euclidean space to asymptotically recover an isometric embedding of the limit. We test these algorithms on the truncation of sphere and a recently investigated perturbation thereof.

Topics & Concepts

MathematicsEmbeddingDirac operatorManifold (fluid mechanics)Pure mathematicsCommutative propertyTruncation (statistics)Paracompact spaceAmbient spaceMetric spaceEuclidean spaceLimit (mathematics)Hausdorff spaceMetric (unit)Hausdorff distanceMathematical analysisEconomicsOperations managementStatisticsArtificial intelligenceComputer scienceMechanical engineeringEngineeringAdvanced Operator Algebra ResearchNoncommutative and Quantum Gravity TheoriesTopological and Geometric Data Analysis
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