On the monotonicity of Q2 spectral element method for Laplacian on quasi-uniform rectangular meshes
Abstract
The monotonicity of discrete Laplacian implies discrete maximum principle, which in general does not hold for high order schemes. The Q2 spectral element method has been proven monotone on a uniform rectangular mesh. In this paper we prove the monotonicity of the Q2 spectral element method on quasi-uniform rectangular meshes under certain mesh constraints. In particular, we propose a relaxed Lorenz's condition for proving monotonicity.
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