Proof of optimal H1-norm error estimates for A-stable BDF1/BDF2 full discretizations of Willmore flow using surface finite elements of degree at least 2.
theory and possible experiments
2 Pith papers cite this work. Polarity classification is still indexing.
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Boundary element simulations demonstrate that droplet lens shape on elastic sheets depends on thickness and applied tension, with elongation and folds under uniaxial stretch.
citing papers explorer
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Error estimates for $A$-stable backward difference full discretizations of Willmore flow of closed surfaces
Proof of optimal H1-norm error estimates for A-stable BDF1/BDF2 full discretizations of Willmore flow using surface finite elements of degree at least 2.
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Droplets sitting on thin elastic sheets: A study with the boundary element method
Boundary element simulations demonstrate that droplet lens shape on elastic sheets depends on thickness and applied tension, with elongation and folds under uniaxial stretch.