We rewrite the standard nodal virtual element method in two dimensions as a generalised gradient method. This re-formulation allows for computing a reliable and efficient error estimator by locally reconstructing broken fluxes and potentials on elemental subtriangulations. We prove upper and lower bounds with constants independent of the stabilisation of the method and, under technical assumptions on the mesh, the degree of accuracy.
Chaumont-Frelet, T., Gedicke, J., Mascotto, L. (2026). Generalised gradients for virtual elements and applications to a posteriori error analysis. MATHEMATICS OF COMPUTATION, 95(360), 1603-1629 [10.1090/mcom/4092].
Generalised gradients for virtual elements and applications to a posteriori error analysis
Mascotto, Lorenzo
2026
Abstract
We rewrite the standard nodal virtual element method in two dimensions as a generalised gradient method. This re-formulation allows for computing a reliable and efficient error estimator by locally reconstructing broken fluxes and potentials on elemental subtriangulations. We prove upper and lower bounds with constants independent of the stabilisation of the method and, under technical assumptions on the mesh, the degree of accuracy.
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