Wavelet-Galerkin Method and the Solution of Partial Differential Equations
Mohamed Fathy Emam Ali;
Abstract
Daubechies wavelet basis functions have many properties that make them desirable as a basis for a Galerkin approach to solving partial differential equations (PDEs). They are orthogonal, with compact support, and their connection coefficients can be compu
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| Title | Wavelet-Galerkin Method and the Solution of Partial Differential Equations | Authors | Mohamed Fathy Emam Ali | Keywords | Wavelet-Galerkin Method and the Solution of Partial Differential Equations | Issue Date | 2008 | Description | Daubechies wavelet basis functions have many properties that make them desirable as a basis for a Galerkin approach to solving partial differential equations (PDEs). They are orthogonal, with compact support, and their connection coefficients can be compu |
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