Bazsites.com Wavelets

Directory Topics

Practical Guide to Wavelet Analysis - Introduction to wavelet analysis and Monte Carlo, interactive wavelet plotting, FAQ, and software.
The Wavelet Digest - Bringing together the Wavelet Community. This site hosts a free monthly newsletter on wavelets. Covers theory and applications. Contains all archives since it was founded in 1992 by Wim Sweldens.
A Really Friendly Guide to Wavelets - Wavelet tutorial for engineers in three parts: friendly introduction, lifting, and EZW.
Guide to Wavelet Sources - Links to tutorials, software and other wavelet sites. [Compressed using gzip and cannot be rendered by all browsers.]
Blitzwave Wavelet Library - A C++ wavelet library using blitz++ arrays. Supports wavelet decompositions of n-dimensional arrays of various numerical data types. Page includes documentation, installation details and references.
Bibliographies on Wavelets - Bibliographies on wavelets at the University of Karlsruhe.
Amara's Wavelet Resources - Introduction to wavelets with links to many other resources by Amara Graps.
Engineer's Guide to Wavelet Analysis - From the Fourier Transform to the wavelet transform.
WAILI - Wavelets with Integer Lifting - A free software library (C++) for image processing using integer (lifting) wavelet transforms
Mathematica Wavelet Explorer - Visualize and apply wavelets, data processing.

Hermitian wavelet - Hermitian wavelets are a family of continuous wavelets, used in the continuous wavelet transform. The n^\textrm{th} Hermitian wavelet is defined as the n^\textrm{th} derivative of a Gaussian:
Legendre wavelet - == Legendre wavelets: spherical harmonic wavelets ==
Cohen-Daubechies-Feauveau wavelet - Cohen-Daubechies-Feauveau wavelet are the historically first family of biorthogonal wavelets, which was made popular by Ingrid Daubechies. These are not the same as the orthogonal Daubechies wavelets, and also not very similar in shape and properties.
Daubechies wavelet - Named after Ingrid Daubechies, the Daubechies wavelets are a family of orthogonal wavelets defining a discrete wavelet transform and characterized by a maximal number of vanishing moments for some given support. With each wavelet type of this class, there is a scaling function (also called father wavelet) which generates an orthogonal multiresolution analysis.
Beta wavelet - Continuous wavelets of compact support can be built [1], which are related to the beta distribution. The process is derived from probability distributions using blur derivative.