A finite wavelet decomposition method

## Abstract The wavelet‐based methods are powerful to analyse the field problems with changes in gradients and singularities due to the excellent multi‐resolution properties of wavelet functions. Wavelet‐based finite elements are often constructed in the wavelet space where field displacements are

In this work, we introduce a somewhat unconventional ®nite element-based nonoverlapping domain decomposition method (the convenient space decomposition method (CSD)) for parallel computers that can be applied to a wide class of boundary value problems and which can only be implemented eciently, excl

A novel wavelet-Galerkin method tailored to solve parabolic equations in "nite domains is presented. The emphasis of the paper is on the development of the discretization formulations that are speci"c to "nite domain parabolic equations with arbitrary boundary conditions based on weak form functiona