A decoupled kernel-only stabilization for finite-strain VEM hyperelasticity is introduced that scales deviatoric terms by shear modulus with geometry weights and volumetric terms independently by bulk modulus, with uniform stability proven under polygon regularity.
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2 Pith papers cite this work. Polarity classification is still indexing.
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2026 2verdicts
UNVERDICTED 2representative citing papers
A reduced-integration stabilization for VEM at finite strains is introduced using scaled boundary parametrization and one-point analytical integration per section, validated on patch tests and nonlinear examples.
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An Investigation of Stabilization Scaling in Finite-Strain Virtual Element Methods for Hyperelasticity
A decoupled kernel-only stabilization for finite-strain VEM hyperelasticity is introduced that scales deviatoric terms by shear modulus with geometry weights and volumetric terms independently by bulk modulus, with uniform stability proven under polygon regularity.
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Reduced integration with scaled boundary parametrization for virtual elements at finite strains
A reduced-integration stabilization for VEM at finite strains is introduced using scaled boundary parametrization and one-point analytical integration per section, validated on patch tests and nonlinear examples.