Superconvergent quadriatic finite element on uniform tetrahedral meshes
Abstract
By a direct computation, we show that the P2 interpolation of a P3 function is also a local H1-projection on uniform tetrahedral meshes, i.e., the difference is H1-orthogonal to the P2 Lagrange basis function on the support patch of tetrahedra of the basis function. Consequently, we show the H1 and L2 rconvergence of the P2 Lagrange finite element on uniform tetrahedral meshes. Using the standard 20-points Lagrange P3 interpolation, where the 20 nodes are exactly some P2 global basis nodes, we lift the superconvergent P2 finite element solution to a quasi-optimal P3 solution on each cube. Numerical results confirm the theory.
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