Litcius/Paper detail

Finite Elements for div- and divdiv-Conforming Symmetric Tensors in Arbitrary Dimension

Long Chen, Xuehai Huang

2022SIAM Journal on Numerical Analysis22 citationsDOI

Abstract

Several div-conforming and divdiv-conforming finite elements for symmetric tensors on simplexes in arbitrary dimension are constructed in this work. The shape function space is first split as the trace space and the bubble space. The later is further decomposed into the null space of the differential operator and its orthogonal complement. Instead of characterizations of these subspaces of the shape function space, characterizations of corresponding degrees of freedom in the dual spaces are provided. Vector div-conforming finite elements are first constructed as an introductory example. Then new symmetric div-conforming finite elements are constructed. The dual subspaces are then used as build blocks to construct new divdiv-conforming finite elements.

Topics & Concepts

Linear subspaceMathematicsPure mathematicsOrthogonal complementFinite element methodTRACE (psycholinguistics)Space (punctuation)SimplexDimension (graph theory)Complement (music)Vector spaceFunction spaceMathematical analysisDifferential operatorSubspace topologyGeometryChemistryGenePhenotypeComplementationThermodynamicsLinguisticsPhysicsBiochemistryPhilosophyElasticity and Material ModelingAdvanced Numerical Methods in Computational MathematicsNumerical methods in engineering