Interpolatory Wavelet Packets

Wavelets are constructed comprising spline functions with multiple knots. These wavelets have certain derivatives vanishing at the integers, in an analogous manner to the \(B\)-splines of Schoenberg and Sharma related to cardinal Hermite interpolation. 1994 Academic Press, Inc.

We introduce a new class of basic wavelet packets, called highly nonstationary wavelet packets, that generalize the class of nonstationary wavelet packets. We define the periodic Shannon wavelet packets and show how to obtain perturbations of this system using periodic highly nonstationary wavelet p

The aim of this paper is to describe wavelet packet functions and spaces for a trigonometric multiresolution analysis based on fundamental Lagrange interpolants. The corresponding algorithms for wavelet packet decomposition and reconstruction are investigated in detail. As an example, an application

In this paper, we report on recent practical developments in wavelet packets and in particular, how they relate to some signal processing applications. We first define wavelet packets and then define several applications such as denoising, sources separation in tomography, and classification. 1998 A