An arbitrary order Reconstructed Discontinuous Approximation to Fourth-order Curl Problem
Abstract
We present an arbitrary order discontinuous Galerkin finite element method for solving the fourth-order curl problem using a reconstructed discontinuous approximation method. It is based on an arbitrarily high-order approximation space with one unknown per element in each dimension. The discrete problem is based on the symmetric IPDG method. We prove a priori error estimates under the energy norm and the L2 norm and show numerical results to verify the theoretical analysis.
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