Computing H2-conforming finite element approximations without having to implement C1-elements

Abstract

We develop a method to compute the H2-conforming finite element approximation to planar fourth order elliptic problems without having to implement C1 elements. The algorithm consists of replacing the original H2-conforming scheme with pre-processing and post-processing steps that require only an H1-conforming Poisson type solve and an inner Stokes-like problem that again only requires at most H1-conformity. We then demonstrate the method applied to the Morgan-Scott elements with three numerical examples.

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