Abstract
Recovery-based error estimation for thin plate problems
(the bi-harmonic equation) is revisited in the context of Isogeometric analysis. A posteriori energy-norm error estimates based on global L2-recovery of the bending moments is shown to enable optimal convergence rates for both smooth and non-smooth problems.
(the bi-harmonic equation) is revisited in the context of Isogeometric analysis. A posteriori energy-norm error estimates based on global L2-recovery of the bending moments is shown to enable optimal convergence rates for both smooth and non-smooth problems.
