Superconvergence of C0-Qk finite element method for elliptic equations with approximated coefficients
Abstract
We prove that the superconvergence of C0-Qk finite element method at the Gauss Lobatto quadrature points still holds if variable coefficients in an elliptic problem are replaced by their piecewise Qk Lagrange interpolant at the Gauss Lobatto points in each rectangular cell. In particular, a fourth order finite difference type scheme can be constructed using C0-Q2 finite element method with Q2 approximated coefficients.
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