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A guide to the finite and virtual element methods for elasticity

Kiprian Berbatov, Boyan S. Lazarov, Andrey P. Jivkov

2021Applied Numerical Mathematics15 citationsDOIOpen Access PDF

Abstract

We present a systematic description and comparison of the Finite Element Method (FEM) with the relatively new Virtual Element Method (VEM) for solving boundary value problems in linear elasticity, including primal and mixed formulations. The description highlights the common base and the essential difference between FEM and VEM: discretisation of the same primal (Galerkin) and mixed weak formulations and assembly of element-wise quantities, but different approaches to element shape functions. The mathematical formulations are complemented with detailed description of the computer implementation of all methods, including all versions of VEM, which will benefit readers willing to develop their own computational framework. Numerical solutions of several boundary value problems are also presented in order to discuss the weaker and stronger sides of the methods.

Topics & Concepts

Finite element methodMathematicsDiscretizationElasticity (physics)Linear elasticityBoundary value problemApplied mathematicsMixed finite element methodGalerkin methodElement (criminal law)Discontinuous Galerkin methodMathematical optimizationCalculus (dental)Mathematical analysisStructural engineeringDentistryEngineeringMedicinePolitical scienceComposite materialLawMaterials scienceAdvanced Numerical Methods in Computational MathematicsNumerical methods in engineeringElectromagnetic Simulation and Numerical Methods
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