Convergence of a nonlinear wavelet algorithm for the solution of PDEs

PDEs. A recent attempt has been made by Jawerth and Sweldens [29] to which the reader is referred for more The paper first describes a fast algorithm for the discrete orthonormal wavelet transform and its inverse without using the scaling comparative information. The currently existing algofunction

In this paper, harmonic wavelets, which are analytically defined and band limited, are studied, together with their differentiable properties. Harmonic wavelets were recently applied to the solution of evolution problems and, more generally, to describe evolution operators. In order to consider the

We consider issues of stability of time-discretization schemes with exact treatment of the linear part (ELP schemes) for solving nonlinear PDEs. A distinctive feature of ELP schemes is the exact evaluation of the contribution of the linear term, that is if the nonlinear term of the equation is zero,

## For the solution of nonlinear equations, we present an adaptive wavelet scheme, which couples an inexs& Newton method and the idea of nonlinear wavelet approximation. In particular, we obtain a result of quadrAtic convergence.

A multigrid scheme naturally contained in wa¨elet expansion methods is presented. Careful examination of the wa¨elet matrix re¨eals matrix representations of an integral operator at ¨arious coarse le¨els that can be identified as nested submatrices of the original wa¨elet matrix at the finest le¨el.