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Finite Element Systems for Vector Bundles: Elasticity and Curvature

Snorre H. Christiansen, Kaibo Hu

2022Foundations of Computational Mathematics24 citationsDOIOpen Access PDF

Abstract

Abstract We develop a theory of finite element systems, for the purpose of discretizing sections of vector bundles, in particular those arising in the theory of elasticity. In the presence of curvature, we prove a discrete Bianchi identity. In the flat case, we prove a de Rham theorem on cohomology groups. We check that some known mixed finite elements for the stress–displacement formulation of elasticity fit our framework. We also define, in dimension two, the first conforming finite element spaces of metrics with good linearized curvature, corresponding to strain tensors with Saint-Venant compatibility conditions. Cochains with coefficients in rigid motions are given a key role in relating continuous and discrete elasticity complexes.

Topics & Concepts

MathematicsElasticity (physics)CurvatureFinite element methodCohomologyCompatibility (geochemistry)Mathematical analysisDiscretizationRiemann curvature tensorPure mathematicsGeometryStructural engineeringPhysicsGeochemistryThermodynamicsEngineeringGeologyElasticity and Material ModelingAdvanced Numerical Methods in Computational MathematicsComposite Material Mechanics