Edge Multiscale Methods for elliptic problems with heterogeneous coefficients
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In this paper, we proposed two new types of edge multiscale methods motivated by \cite{GL18} to solve Partial Differential Equations (PDEs) with high-contrast heterogeneous coefficients: Edge spectral multiscale Finte Element method (ESMsFEM) and Wavelet-based edge multiscale Finite Element method (WEMsFEM). Their convergence rates for elliptic problems with high-contrast heterogeneous coefficients are demonstrated in terms of the coarse mesh size $H$, the number of spectral basis functions and the level of the wavelet space $\ell$, which are verified by extensive numerical tests.
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Wavelet-based Edge Multiscale Finite Element Method for Helmholtz problems in perforated domains
Introduces WEMsFEM algorithm for Helmholtz equations in perforated domains with O(H) convergence proof under resolution assumption and numerical tests.
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