New interpolation results and applications to finite element methods for elliptic boundary value problems

We consider the interpolation problem between H2 (Ω) ∩ HD1 and HD1 (Ω), where Ω is a polygonal domain in R2 and HD1 (Ω) is the subspace of functions in H1 (Ω) which vanish on the Dirichlet part (&partΩ)D of the boundary of Ω. The main result is that the interpolation spaces [H2 (Ω) ∩ HD1 (Ω), HD1 (Ω)]s and H1+s (Ω) ∩ HD1 (Ω) coincide. An application of this result to a nonconforming finite element problem is presented.