A Hybrid High-Order method for finite elastoplastic deformations within a logarithmic strain framework

Abstract : We devise and evaluate numerically a Hybrid High-Order (HHO) method for finite plasticity within a logarithmic strain framework. The HHO method uses as discrete unknowns piecewise polynomials of order k 1 on the mesh skeleton, together with cell-based polynomi-als that can be eliminated locally by static condensation. The HHO method leads to a primal formulation, supports polyhedral meshes with non-matching interfaces, is free of volumetric locking, the integration of the behavior law is performed only at cell-based quadrature nodes, and the tangent matrix in Newton's method is symmetric. Moreover, the principle of virtual work is satisfied locally with equilibrated tractions. Various two-and three-dimensional benchmarks are presented, as well as comparison against known solutions with an industrial software using conforming and mixed finite elements.
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  • HAL Id : hal-01978385, version 1

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Mickaël Abbas, Alexandre Ern, Nicolas Pignet. A Hybrid High-Order method for finite elastoplastic deformations within a logarithmic strain framework. 2019. ⟨hal-01978385⟩

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