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3D mixed virtual element formulation for dynamic elasto-plastic analysis

Mertcan Cihan, Blaž Hudobivnik, Fadi Aldakheel, Peter Wriggers

2021Computational Mechanics37 citationsDOIOpen Access PDF

Abstract

Abstract The virtual element method (VEM) for dynamic analyses of nonlinear elasto-plastic problems undergoing large deformations is outlined within this work. VEM has been applied to various problems in engineering, considering elasto-plasticity, multiphysics, damage, elastodynamics, contact- and fracture mechanics. This work focuses on the extension of VEM formulations towards dynamic elasto-plastic applications. Hereby low-order ansatz functions are employed in three dimensions with elements having arbitrary convex or concave polygonal shapes. The formulations presented in this study are based on minimization of potential function for both the static as well as the dynamic behavior. Additionally, to overcome the volumetric locking phenomena due to elastic and plastic incompressibility conditions, a mixed formulation based on a Hu-Washizu functional is adopted. For the implicit time integration scheme, Newmark method is used. To show the model performance, various numerical examples in 3D are presented.

Topics & Concepts

AnsatzMultiphysicsVirtual workFinite element methodNewmark-beta methodComputational Science and EngineeringNonlinear systemWork (physics)PlasticityApplied mathematicsPenalty methodMathematicsComputer scienceStructural engineeringMathematical optimizationEngineeringMaterials scienceMechanical engineeringPhysicsQuantum mechanicsMathematical physicsComposite materialNumerical methods in engineeringAdvanced Numerical Methods in Computational MathematicsElasticity and Material Modeling