Wavelet-based adaptive grid method for the resolution of nonlinear 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

Numerical experiments are described that illustrate some important features of the performance of moving mesh methods for solving one-dimensional partial differential equations (PDEs). The particular method considered here is an adaptive finite difference method based on the equidistribution of a mo

Moving surfaces that self-intersect arise naturally in the geometric optics model of wavefront motion. Standard ray tracing techniques can be used to compute these motions, but they lose resolution as rays diverge. In this paper we develop numerical methods that maintain uniform spatial resolution o