Local dG methods for convex minimization achieve optimal energy convergence rates via duality, closing the gap with conforming schemes and enabling better a posteriori control.
Title resolution pending
2 Pith papers cite this work. Polarity classification is still indexing.
2
Pith papers citing it
fields
math.NA 2years
2026 2verdicts
UNVERDICTED 2representative citing papers
Quasi-optimal and lower-order error estimates are established for WG, DG, and HHO methods for the biharmonic equation on polytopal meshes with minimal regularity, plus efficient stabilization in a posteriori estimators.
citing papers explorer
-
Local discontinuous Galerkin FEM for convex minimization
Local dG methods for convex minimization achieve optimal energy convergence rates via duality, closing the gap with conforming schemes and enabling better a posteriori control.
-
Quasi-optimal polytopal finite element methods for biharmonic equation
Quasi-optimal and lower-order error estimates are established for WG, DG, and HHO methods for the biharmonic equation on polytopal meshes with minimal regularity, plus efficient stabilization in a posteriori estimators.