We propose and analyse residual-based a posteriori error estimates for the virtual element discretisation applied to the thin plate vibration problem in both two and three dimensions. Our approach involves a conforming C1 discrete formulation suitable for meshes composed of polygons and polyhedra. The reliability and efficiency of the error estimator are established through a dimension-independent proof. Finally, several numerical experiments are reported to demonstrate the optimal performance of the method in 2D and 3D.
Dassi, F., Rubiano, A., Velásquez, I. (2026). A posteriori error estimates for a C1 virtual element method applied to the thin plate vibration problem. ADVANCES IN COMPUTATIONAL MATHEMATICS, 52(2) [10.1007/s10444-026-10288-6].
A posteriori error estimates for a C1 virtual element method applied to the thin plate vibration problem.
Dassi, Franco;
2026
Abstract
We propose and analyse residual-based a posteriori error estimates for the virtual element discretisation applied to the thin plate vibration problem in both two and three dimensions. Our approach involves a conforming C1 discrete formulation suitable for meshes composed of polygons and polyhedra. The reliability and efficiency of the error estimator are established through a dimension-independent proof. Finally, several numerical experiments are reported to demonstrate the optimal performance of the method in 2D and 3D.
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