A wavelet is a wavelike oscillation with an amplitude that begins at zero, increases, and then decreases back to zero. It can typically be visualized as a "brief oscillation" like one might see recorded by a seismograph or heart monitor. Generally, wavelets are purposefully crafted to have specific properties that make them useful for signal processing. Wavelets can be combined, using a "reverse, shift, multiply and integrate" technique called convolution, with portions of a known signal to extract information from the unknown signal.
Seismic wavelet
For example, a wavelet could be created to have a frequency of Middle C and a short duration of roughly a 32nd note. If this wavelet was to be convolved with a signal created from the recording of a song, then the resulting signal would be useful for determining when the Middle C note was being played in the song. Mathematically, the wavelet will correlate with the signal if the unknown signal contains information of similar frequency. This concept of correlation is at the core of many practical applications of wavelet theory.
As a mathematical tool, wavelets can be used to extract information from many different kinds of data, including – but certainly not limited to – audio signals and images. Sets of wavelets are generally needed to analyze data fully. A set of "complementary" wavelets will decompose data without gaps or overlap so that the decomposition process is mathematically reversible. Thus, sets of complementary wavelets are useful in wavelet based compression/decompression algorithms where it is desirable to recover the original information with minimal loss.
In formal terms, this representation is a wavelet series representation of a squareintegrable function with respect to either a complete, orthonormal set of basis functions, or an overcomplete set or frame of a vector space, for the Hilbert space of square integrable functions.
Contents

Name 1

Wavelet theory 2

Continuous wavelet transforms (continuous shift and scale parameters) 2.1

Discrete wavelet transforms (discrete shift and scale parameters) 2.2

Multiresolution based discrete wavelet transforms 2.3

Mother wavelet 3

Comparisons with Fourier transform (continuoustime) 4

Definition of a wavelet 5

Scaling filter 5.1

Scaling function 5.2

Wavelet function 5.3

History 6

Wavelet transforms 7

Generalized transforms 7.1

Applications of wavelet transform 8

As a representation of a signal 8.1

Wavelet denoising 8.2

List of wavelets 9

Discrete wavelets 9.1

Continuous wavelets 9.2

Realvalued 9.2.1

Complexvalued 9.2.2

See also 10

Notes 11

References 12

External links 13
Name
The word wavelet has been used for decades in digital signal processing and exploration geophysics.^{[1]} The equivalent French word ondelette meaning "small wave" was used by Morlet and Grossmann in the early 1980s.
Wavelet theory
Wavelet theory is applicable to several subjects. All wavelet transforms may be considered forms of timefrequency representation for continuoustime (analog) signals and so are related to harmonic analysis. Almost all practically useful discrete wavelet transforms use discretetime filterbanks. These filter banks are called the wavelet and scaling coefficients in wavelets nomenclature. These filterbanks may contain either finite impulse response (FIR) or infinite impulse response (IIR) filters. The wavelets forming a continuous wavelet transform (CWT) are subject to the uncertainty principle of Fourier analysis respective sampling theory: Given a signal with some event in it, one cannot assign simultaneously an exact time and frequency response scale to that event. The product of the uncertainties of time and frequency response scale has a lower bound. Thus, in the scaleogram of a continuous wavelet transform of this signal, such an event marks an entire region in the timescale plane, instead of just one point. Also, discrete wavelet bases may be considered in the context of other forms of the uncertainty principle.
Wavelet transforms are broadly divided into three classes: continuous, discrete and multiresolutionbased.
Continuous wavelet transforms (continuous shift and scale parameters)
In continuous wavelet transforms, a given signal of finite energy is projected on a continuous family of frequency bands (or similar subspaces of the L^{p} function space L^{2}(R) ). For instance the signal may be represented on every frequency band of the form [f, 2f] for all positive frequencies f > 0. Then, the original signal can be reconstructed by a suitable integration over all the resulting frequency components.
The frequency bands or subspaces (subbands) are scaled versions of a subspace at scale 1. This subspace in turn is in most situations generated by the shifts of one generating function ψ in L^{2}(R), the mother wavelet. For the example of the scale one frequency band [1, 2] this function is

\psi(t)=2\,\operatorname{sinc}(2t)\,\operatorname{sinc}(t)=\frac{\sin(2\pi t)\sin(\pi t)}{\pi t}
with the (normalized) sinc function. That, Meyer's, and two other examples of mother wavelets are:
The subspace of scale a or frequency band [1/a, 2/a] is generated by the functions (sometimes called child wavelets)

\psi_{a,b} (t) = \frac1{\sqrt a }\psi \left( \frac{t  b}{a} \right),
where a is positive and defines the scale and b is any real number and defines the shift. The pair (a, b) defines a point in the right halfplane R_{+} × R.
The projection of a function x onto the subspace of scale a then has the form

x_a(t)=\int_\R WT_\psi\{x\}(a,b)\cdot\psi_{a,b}(t)\,db
with wavelet coefficients

WT_\psi\{x\}(a,b)=\langle x,\psi_{a,b}\rangle=\int_\R x(t){\psi_{a,b}(t)}\,dt.
See a list of some Continuous wavelets.
For the analysis of the signal x, one can assemble the wavelet coefficients into a scaleogram of the signal.
Discrete wavelet transforms (discrete shift and scale parameters)
It is computationally impossible to analyze a signal using all wavelet coefficients, so one may wonder if it is sufficient to pick a discrete subset of the upper halfplane to be able to reconstruct a signal from the corresponding wavelet coefficients. One such system is the affine system for some real parameters a > 1, b > 0. The corresponding discrete subset of the halfplane consists of all the points (a^{m}, na^{m}b) with m, n in Z. The corresponding baby wavelets are now given as

\psi_{m,n}(t)=a^{m/2}\psi(a^{m}tnb). \,
A sufficient condition for the reconstruction of any signal x of finite energy by the formula

x(t)=\sum_{m\in\Z}\sum_{n\in\Z}\langle x,\,\psi_{m,n}\rangle\cdot\psi_{m,n}(t)
is that the functions \{\psi_{m,n}:m,n\in\Z\} form a tight frame of L^{2}(R).
Multiresolution based discrete wavelet transforms
D4 wavelet
In any discretised wavelet transform, there are only a finite number of wavelet coefficients for each bounded rectangular region in the upper halfplane. Still, each coefficient requires the evaluation of an integral. In special situations this numerical complexity can be avoided if the scaled and shifted wavelets form a multiresolution analysis. This means that there has to exist an auxiliary function, the father wavelet φ in L^{2}(R), and that a is an integer. A typical choice is a = 2 and b = 1. The most famous pair of father and mother wavelets is the Daubechies 4tap wavelet. Note that not every orthonormal discrete wavelet basis can be associated to a multiresolution analysis; for example, the Journe wavelet admits no multiresolution analysis.^{[2]}
From the mother and father wavelets one constructs the subspaces

V_m=\operatorname{span}(\phi_{m,n}:n\in\Z),\text{ where }\phi_{m,n}(t)=2^{m/2}\phi(2^{m}tn)

W_m=\operatorname{span}(\psi_{m,n}:n\in\Z),\text{ where }\psi_{m,n}(t)=2^{m/2}\psi(2^{m}tn).
The mother wavelet V_{i} keeps the time domain properties, while the father wavelets W_{i} keeps the frequency domain properties.
From these it is required that the sequence

\{0\}\subset\dots\subset V_{1}\subset V_{0}\subset V_{1}\subset V_{2}\subset\dots\subset L^2(\R)
forms a multiresolution analysis of L^{2} and that the subspaces \dots,W_1,W_0,W_{1},\dots\dots are the orthogonal "differences" of the above sequence, that is, W_{m} is the orthogonal complement of V_{m} inside the subspace V_{m−1},

V_m\oplus W_m=V_{m1}.
In analogy to the sampling theorem one may conclude that the space V_{m} with sampling distance 2^{m} more or less covers the frequency baseband from 0 to 2^{−m1}. As orthogonal complement, W_{m} roughly covers the band [2^{−m−1}, 2^{−m}].
From those inclusions and orthogonality relations, especially V_0\oplus W_0=V_{1}, follows the existence of sequences h=\{h_n\}_{n\in\Z} and g=\{g_n\}_{n\in\Z} that satisfy the identities

g_n=\langle\phi_{0,0},\,\phi_{1,n}\rangle so that \phi(t)=\sqrt2 \sum_{n\in\Z} g_n\phi(2tn), and

h_n=\langle\psi_{0,0},\,\phi_{1,n}\rangle so that \psi(t)=\sqrt2 \sum_{n\in\Z} h_n\phi(2tn).
The second identity of the first pair is a refinement equation for the father wavelet φ. Both pairs of identities form the basis for the algorithm of the fast wavelet transform.
From the multiresolution analysis derives the orthogonal decomposition of the space L^{2} as

L^2=V_{j_0}\oplus W_{j_0}\oplus W_{j_01}\oplus W_{j_02}\oplus W_{j_03}\oplus\dots
For any signal or function S\in L^2 this gives a representation in basis functions of the corresponding subspaces as

S = \sum_{k} c_{j_0,k}\phi_{j_0,k} + \sum_{j\le j_0}\sum_{k} d_{j,k}\psi_{j,k}
where the coefficients are

c_{j_0,k} = \langle S,\phi_{j_0,k}\rangle and

d_{j,k} = \langle S,\psi_{j,k}\rangle .
Mother wavelet
For practical applications, and for efficiency reasons, one prefers continuously differentiable functions with compact support as mother (prototype) wavelet (functions). However, to satisfy analytical requirements (in the continuous WT) and in general for theoretical reasons, one chooses the wavelet functions from a subspace of the space L^1(\R)\cap L^2(\R). This is the space of measurable functions that are absolutely and square integrable:

\int_{\infty}^{\infty} \psi (t)\, dt <\infty and \int_{\infty}^{\infty} \psi (t)^2 \, dt <\infty.
Being in this space ensures that one can formulate the conditions of zero mean and square norm one:

\int_{\infty}^{\infty} \psi (t)\, dt = 0 is the condition for zero mean, and

\int_{\infty}^{\infty} \psi (t)^2\, dt = 1 is the condition for square norm one.
For ψ to be a wavelet for the continuous wavelet transform (see there for exact statement), the mother wavelet must satisfy an admissibility criterion (loosely speaking, a kind of halfdifferentiability) in order to get a stably invertible transform.
For the discrete wavelet transform, one needs at least the condition that the wavelet series is a representation of the identity in the space L^{2}(R). Most constructions of discrete WT make use of the multiresolution analysis, which defines the wavelet by a scaling function. This scaling function itself is solution to a functional equation.
In most situations it is useful to restrict ψ to be a continuous function with a higher number M of vanishing moments, i.e. for all integer m < M

\int_{\infty}^{\infty} t^m\,\psi (t)\, dt = 0.
The mother wavelet is scaled (or dilated) by a factor of a and translated (or shifted) by a factor of b to give (under Morlet's original formulation):

\psi _{a,b} (t) = {1 \over \sqrt a}\psi \left( {t  b \over a} \right).
For the continuous WT, the pair (a,b) varies over the full halfplane R_{+} × R; for the discrete WT this pair varies over a discrete subset of it, which is also called affine group.
These functions are often incorrectly referred to as the basis functions of the (continuous) transform. In fact, as in the continuous Fourier transform, there is no basis in the continuous wavelet transform. Timefrequency interpretation uses a subtly different formulation (after Delprat).
Restriction：
(1) \frac{1}{\sqrt{a}} \int_{\infty}^\infty \varphi_{a1,b1}(t)\varphi\left(\frac{tb}{a}\right) \, dt when a1 = a and b1 = b,
(2) \Psi (t) has a finite time interval
Comparisons with Fourier transform (continuoustime)
The wavelet transform is often compared with the Fourier transform, in which signals are represented as a sum of sinusoids. In fact, the Fourier transform can be viewed as a special case of the continuous wavelet transform with the choice of the mother wavelet \psi (t) = e^{2 \pi i t}. The main difference in general is that wavelets are localized in both time and frequency whereas the standard Fourier transform is only localized in frequency. The Shorttime Fourier transform (STFT) is similar to the wavelet transform, in that it is also time and frequency localized, but there are issues with the frequency/time resolution tradeoff.
In particular, assuming a rectangular window region, one may think of the STFT as a transform with a slightly different kernel

\psi (t) = g(tu) e^{2 \pi i t}
where g(tu) can often be written as \rm{rect}\left(\frac{tu}{\Delta_t}\right), where \Delta_t and u respectively denote the length and temporal offset of the windowing function. Using Parseval’s theorem, one may define the wavelet’s energy as

E = \int_{\infty}^{\infty} \psi (t)^2\, dt = \frac{1}{2\pi}\int_{\infty}^{\infty} \hat{\psi (\omega)}^2 \, d\omega
From this, the square of the temporal support of the window offset by time u is given by

\sigma_t^2 = \frac{1}{E}\int tu^2\psi(t)^2 \, dt
and the square of the spectral support of the window acting on a frequency \xi

\sigma_\omega^2 =\frac{1}{2\pi E} \int \omega\xi^2\hat{\psi}(\omega)^2 \, d\omega
As stated by the Heisenberg uncertainty principle, the product of the temporal and spectral supports \sigma_t^2\sigma_\omega^2 \ge 1/4 for any given timefrequency atom, or resolution cell. The STFT windows restrict the resolution cells to spectral and temporal supports determined by \Delta_t.
Multiplication with a rectangular window in the time domain corresponds to convolution with a \rm{sinc(\Delta_t\omega)} function in the frequency domain, resulting in spurious ringing artifacts for short/localized temporal windows. With the continuoustime Fourier Transform, \Delta_t \rightarrow \infty and this convolution is with a delta function in Fourier space, resulting in the true Fourier transform of the signal x(t). The window function may be some other apodizing filter, such as a Gaussian. The choice of windowing function will affect the approximation error relative to the true Fourier transform.
A given resolution cell’s timebandwidth product may not be exceeded with the STFT. All STFT basis elements maintain a uniform spectral and temporal support for all temporal shifts or offsets, thereby attaining an equal resolution in time for lower and higher frequencies. The resolution is purely determined by the sampling width.
In contrast, the wavelet transform’s
multiresolutional properties enables large temporal supports for lower frequencies while maintaining short temporal widths for higher frequencies by the scaling properties of the wavelet transform. This property extends conventional timefrequency analysis into timescale analysis.
^{[3]}
STFT timefrequency atoms (left) and DWT timescale atoms (right). The timefrequency atoms are four different basis functions used for the STFT (i.e. four separate Fourier transforms required). The timescale atoms of the DWT achieve small temporal widths for high frequencies and good temporal widths for low frequencies with a single transform basis set.
The discrete wavelet transform is less computationally complex, taking O(N) time as compared to O(N log N) for the fast Fourier transform. This computational advantage is not inherent to the transform, but reflects the choice of a logarithmic division of frequency, in contrast to the equally spaced frequency divisions of the FFT (Fast Fourier Transform) which uses the same basis functions as DFT (Discrete Fourier Transform).^{[4]} It is also important to note that this complexity only applies when the filter size has no relation to the signal size. A wavelet without compact support such as the Shannon wavelet would require O(N^{2}). (For instance, a logarithmic Fourier Transform also exists with O(N) complexity, but the original signal must be sampled logarithmically in time, which is only useful for certain types of signals.^{[5]})
Definition of a wavelet
There are a number of ways of defining a wavelet (or a wavelet family).
Scaling filter
An orthogonal wavelet is entirely defined by the scaling filter – a lowpass finite impulse response (FIR) filter of length 2N and sum 1. In biorthogonal wavelets, separate decomposition and reconstruction filters are defined.
For analysis with orthogonal wavelets the high pass filter is calculated as the quadrature mirror filter of the low pass, and reconstruction filters are the time reverse of the decomposition filters.
Daubechies and Symlet wavelets can be defined by the scaling filter.
Scaling function
Wavelets are defined by the wavelet function ψ(t) (i.e. the mother wavelet) and scaling function φ(t) (also called father wavelet) in the time domain.
The wavelet function is in effect a bandpass filter and scaling it for each level halves its bandwidth. This creates the problem that in order to cover the entire spectrum, an infinite number of levels would be required. The scaling function filters the lowest level of the transform and ensures all the spectrum is covered. See [1] for a detailed explanation.
For a wavelet with compact support, φ(t) can be considered finite in length and is equivalent to the scaling filter g.
Meyer wavelets can be defined by scaling functions
Wavelet function
The wavelet only has a time domain representation as the wavelet function ψ(t).
For instance, Mexican hat wavelets can be defined by a wavelet function. See a list of a few Continuous wavelets.
History
The development of wavelets can be linked to several separate trains of thought, starting with Zweig’s discovery of the continuous wavelet transform in 1975 (originally called the cochlear transform and discovered while studying the reaction of the ear to sound),^{[6]} Pierre Goupillaud, Grossmann and Morlet's formulation of what is now known as the CWT (1982), JanOlov Strömberg's early work on discrete wavelets (1983), Daubechies' orthogonal wavelets with compact support (1988), Mallat's multiresolution framework (1989), Akansu's Binomial QMF (1990), Nathalie Delprat's timefrequency interpretation of the CWT (1991), Newland's harmonic wavelet transform (1993) and many others since.
Timeline
Wavelet transforms
A wavelet is a mathematical function used to divide a given function or continuoustime signal into different scale components. Usually one can assign a frequency range to each scale component. Each scale component can then be studied with a resolution that matches its scale. A wavelet transform is the representation of a function by wavelets. The wavelets are scaled and translated copies (known as "daughter wavelets") of a finitelength or fastdecaying oscillating waveform (known as the "mother wavelet"). Wavelet transforms have advantages over traditional Fourier transforms for representing functions that have discontinuities and sharp peaks, and for accurately deconstructing and reconstructing finite, nonperiodic and/or nonstationary signals.
Wavelet transforms are classified into discrete wavelet transforms (DWTs) and continuous wavelet transforms (CWTs). Note that both DWT and CWT are continuoustime (analog) transforms. They can be used to represent continuoustime (analog) signals. CWTs operate over every possible scale and translation whereas DWTs use a specific subset of scale and translation values or representation grid.
There are a large number of wavelet transforms each suitable for different applications. For a full list see list of waveletrelated transforms but the common ones are listed below:
Generalized transforms
There are a number of generalized transforms of which the wavelet transform is a special case. For example, Joseph Segman introduced scale into the Heisenberg group, giving rise to a continuous transform space that is a function of time, scale, and frequency. The CWT is a twodimensional slice through the resulting 3d timescalefrequency volume.
Another example of a generalized transform is the chirplet transform in which the CWT is also a two dimensional slice through the chirplet transform.
An important application area for generalized transforms involves systems in which high frequency resolution is crucial. For example, darkfield electron optical transforms intermediate between direct and reciprocal space have been widely used in the harmonic analysis of atom clustering, i.e. in the study of crystals and crystal defects.^{[7]} Now that transmission electron microscopes are capable of providing digital images with picometerscale information on atomic periodicity in nanostructure of all sorts, the range of pattern recognition^{[8]} and strain^{[9]}/metrology^{[10]} applications for intermediate transforms with high frequency resolution (like brushlets^{[11]} and ridgelets^{[12]}) is growing rapidly.
Fractional wavelet transform (FRWT) is a generalization of the classical wavelet transform in the fractional Fourier transform domains. This transform is capable of providing the time and fractionaldomain information simultaneously and representing signals in the timefractionalfrequency plane.^{[13]}
Applications of wavelet transform
Generally, an approximation to DWT is used for data compression if a signal is already sampled, and the CWT for signal analysis.^{[14]} Thus, DWT approximation is commonly used in engineering and computer science, and the CWT in scientific research.
Like some other transforms, wavelet transforms can be used to transform data, then encode the transformed data, resulting in effective compression. For example, JPEG 2000 is an image compression standard that uses biorthogonal wavelets. This means that although the frame is overcomplete, it is a tight frame (see types of frames of a vector space), and the same frame functions (except for conjugation in the case of complex wavelets) are used for both analysis and synthesis, i.e., in both the forward and inverse transform. For details see wavelet compression.
A related use is for smoothing/denoising data based on wavelet coefficient thresholding, also called wavelet shrinkage. By adaptively thresholding the wavelet coefficients that correspond to undesired frequency components smoothing and/or denoising operations can be performed.
Wavelet transforms are also starting to be used for communication applications. Wavelet OFDM is the basic modulation scheme used in HDPLC (a power line communications technology developed by Panasonic), and in one of the optional modes included in the IEEE 1901 standard. Wavelet OFDM can achieve deeper notches than traditional FFT OFDM, and wavelet OFDM does not require a guard interval (which usually represents significant overhead in FFT OFDM systems).^{[15]}
As a representation of a signal
Often, signals can be represented well as a sum of sinusoids. However, consider a noncontinuous signal with an abrupt discontinuity; this signal can still be represented as a sum of sinusoids, but requires an infinite number, which is an observation known as Gibbs phenomenon. This, then, requires an infinite number of Fourier coefficients, which is not practical for many applications, such as compression. Wavelets are more useful for describing these signals with discontinuities because of their timelocalized behavior (both Fourier and wavelet transforms are frequencylocalized, but wavelets have an additional timelocalization property). Because of this, many types of signals in practice may be nonsparse in the Fourier domain, but very sparse in the wavelet domain. This is particularly useful in signal reconstruction, especially in the recently popular field of compressed sensing. (Note that the shorttime Fourier transform (STFT) is also localized in time and frequency, but there are often problems with the frequencytime resolution tradeoff. Wavelets are better signal representations because of multiresolution analysis.)
This motivates why wavelet transforms are now being adopted for a vast number of applications, often replacing the conventional Fourier transform. Many areas of physics have seen this paradigm shift, including molecular dynamics, ab initio calculations, astrophysics, densitymatrix localisation, seismology, optics, turbulence and quantum mechanics. This change has also occurred in image processing, EEG, EMG,^{[16]} ECG analyses, brain rhythms, DNA analysis, protein analysis, climatology, human sexual response analysis,^{[17]} general signal processing, speech recognition, acoustics, vibration signals,^{[18]} computer graphics, multifractal analysis, and sparse coding. In computer vision and image processing, the notion of scale space representation and Gaussian derivative operators is regarded as a canonical multiscale representation.
Wavelet denoising
Suppose we measure a noisy signal x = s + v . Assume s has a sparse representation in a certain wavelet bases, and v \ \sim\ \mathcal{N}(0,\,\sigma^2I)
So y = W^Tx = W^Ts + W^Tv = p + z.
Most elements in p are 0 or close to 0, and z \ \sim\ \ \mathcal{N}(0,\,\sigma^2I)
Since W is orthogonal, the estimation problem amounts to recovery of a signal in iid Gaussian noise. As p is sparse, one method is to apply a Gaussian mixture model for p.
Assume a prior p \ \sim\ a\mathcal{N}(0,\,\sigma_1^2) +(1 a)\mathcal{N}(0,\,\sigma_2^2), \sigma_1^2 is the variance of "significant" coefficients, and \sigma_2^2 is the variance of "insignificant" coefficients.
Then \tilde p = E(p/y) = \tau(y) y, \tau(y) is called the shrinkage factor, which depends on the prior variances \sigma_1^2 and \sigma_2^2. The effect of the shrinkage factor is that small coefficients are set early to 0, and large coefficients are unaltered.
Small coefficients are mostly noises, and large coefficients contain actual signal.
At last, apply the inverse wavelet transform to obtain \tilde s = W \tilde p
List of wavelets
Discrete wavelets

Beylkin (18)

BNC wavelets

Coiflet (6, 12, 18, 24, 30)

CohenDaubechiesFeauveau wavelet (Sometimes referred to as CDF N/P or Daubechies biorthogonal wavelets)

Daubechies wavelet (2, 4, 6, 8, 10, 12, 14, 16, 18, 20, etc.)

BinomialQMF (Also referred to as Daubechies wavelet)

Haar wavelet

Mathieu wavelet

Legendre wavelet

Villasenor wavelet

Symlet^{[19]}
Continuous wavelets
Realvalued
Complexvalued
See also
Notes

^ Ricker, Norman (1953). "WAVELET CONTRACTION, WAVELET EXPANSION, AND THE CONTROL OF SEISMIC RESOLUTION". Geophysics 18 (4).

^ Larson, David R. (2007). "Wavelet Analysis and Applications". Appl. Numer. Harmon. Anal. Birkhäuser. pp. 143–171.

^ Mallat, Stephane. "A wavelet tour of signal processing. 1998." 250252.

^ The Scientist and Engineer's Guide to Digital Signal Processing By Steven W. Smith, Ph.D. chapter 8 equation 81: http://www.dspguide.com/ch8/4.htm

^ http://homepages.dias.ie/~ajones/publications/28.pdf

^ http://scienceworld.wolfram.com/biography/Zweig.html Zweig, George Biography on Scienceworld.wolfram.com

^ P. Hirsch, A. Howie, R. Nicholson, D. W. Pashley and M. J. Whelan (1965/1977) Electron microscopy of thin crystals (Butterworths, London/Krieger, Malabar FLA) ISBN 0882753762

^ P. Fraundorf, J. Wang, E. Mandell and M. Rose (2006) Digital darkfield tableaus, Microscopy and Microanalysis 12:S2, 1010–1011 (cf. arXiv:condmat/0403017)

^ M. J. Hÿtch, E. Snoeck and R. Kilaas (1998) Quantitative measurement of displacement and strain fields from HRTEM micrographs, Ultramicroscopy 74:131146.

^ Martin Rose (2006) Spacing measurements of lattice fringes in HRTEM image using digital darkfield decomposition (M.S. Thesis in Physics, U. Missouri – St. Louis)

^ F. G. Meyer and R. R. Coifman (1997) Applied and Computational Harmonic Analysis 4:147.

^ A. G. Flesia, H. HelOr, A. Averbuch, E. J. Candes, R. R. Coifman and D. L. Donoho (2001) Digital implementation of ridgelet packets (Academic Press, New York).

^ J. Shi, N.T. Zhang, and X.P. Liu, "A novel fractional wavelet transform and its applications," Sci. China Inf. Sci., vol. 55, no. 6, pp. 1270–1279, June 2012. URL: http://www.springerlink.com/content/q01np2848m388647/

^ A.N. Akansu, W.A. Serdijn and I.W. Selesnick, Emerging applications of wavelets: A review, Physical Communication, Elsevier, vol. 3, issue 1, pp. 118, March 2010.

^ Stefano Galli, O. Logvinov (July 2008). "Recent Developments in the Standardization of Power Line Communications within the IEEE". IEEE Communications Magazine 46 (7): 64–71. An overview of P1901 PHY/MAC proposal.

^ J. Rafiee et al. Feature extraction of forearm EMG signals for prosthetics, Expert Systems with Applications 38 (2011) 4058–67.

^ J. Rafiee et al. Female sexual responses using signal processing techniques, The Journal of Sexual Medicine 6 (2009) 3086–96. (pdf)

^ J. Rafiee and Peter W. Tse, Use of autocorrelation in wavelet coefficients for fault diagnosis, Mechanical Systems and Signal Processing 23 (2009) 1554–72.

^ Matlab Toolbox – URL: http://matlab.izmiran.ru/help/toolbox/wavelet/ch06_a32.html

^ Erik Hjelmås (19990121) Gabor Wavelets URL: http://www.ansatt.hig.no/erikh/papers/scia99/node6.html
References

Paul S. Addison, The Illustrated Wavelet Transform Handbook, Institute of Physics, 2002, ISBN 0750306920

Ali Akansu and Richard Haddad, Multiresolution Signal Decomposition: Transforms, Subbands, Wavelets, Academic Press, 1992, ISBN 012047140X

B. Boashash, editor, "TimeFrequency Signal Analysis and Processing – A Comprehensive Reference", Elsevier Science, Oxford, 2003, ISBN 0080443354.

Tony F. Chan and Jackie (Jianhong) Shen, Image Processing and Analysis – Variational, PDE, Wavelet, and Stochastic Methods, Society of Applied Mathematics, ISBN 089871589X (2005)

Ingrid Daubechies, Ten Lectures on Wavelets, Society for Industrial and Applied Mathematics, 1992, ISBN 0898712742

Ramazan Gençay, Faruk Selçuk and Brandon Whitcher, An Introduction to Wavelets and Other Filtering Methods in Finance and Economics, Academic Press, 2001, ISBN 0122796705

Haar A., Zur Theorie der orthogonalen Funktionensysteme, Mathematische Annalen, 69, pp 331–371, 1910.

Barbara Burke Hubbard, "The World According to Wavelets: The Story of a Mathematical Technique in the Making", AK Peters Ltd, 1998, ISBN 1568810725, ISBN 9781568810720

Gerald Kaiser, A Friendly Guide to Wavelets, Birkhauser, 1994, ISBN 0817637117

Stéphane Mallat, "A wavelet tour of signal processing" 2nd Edition, Academic Press, 1999, ISBN 012466606X

Donald B. Percival and Andrew T. Walden, Wavelet Methods for Time Series Analysis, Cambridge University Press, 2000, ISBN 0521685087

Press, WH; Teukolsky, SA; Vetterling, WT; Flannery, BP (2007), "Section 13.10. Wavelet Transforms", Numerical Recipes: The Art of Scientific Computing (3rd ed.), New York: Cambridge University Press,

P. P. Vaidyanathan, Multirate Systems and Filter Banks, Prentice Hall, 1993, ISBN 0136057187

Mladen Victor Wickerhauser, Adapted Wavelet Analysis From Theory to Software, A K Peters Ltd, 1994, ISBN 1568810415

Martin Vetterli and Jelena Kovačević, "Wavelets and Subband Coding", Prentice Hall, 1995, ISBN 0130970808
External links

Hazewinkel, Michiel, ed. (2001), "Wavelet analysis",

OpenSource Wavelet C# Code

JWave – Open source Java implementation of several orthogonal and nonorthogonal wavelets

Wavelet Analysis in Mathematica (A very comprehensive set of wavelet analysis tools)

1st NJIT Symposium on Wavelets (April 30, 1990) (First Wavelets Conference in USA)

BinomialQMF Daubechies Wavelets

Wavelets by Gilbert Strang, American Scientist 82 (1994) 250–255. (A very short and excellent introduction)

Wavelet Digest

NASA Signal Processor featuring Wavelet methods Description of NASA Signal & Image Processing Software and Link to Download

Course on Wavelets given at UC Santa Barbara, 2004

The Wavelet Tutorial by Polikar (Easy to understand when you have some background with fourier transforms!)

OpenSource Wavelet C++ Code

Wavelets for Kids (PDF file) (Introductory (for very smart kids!))

Link collection about wavelets

Gerald Kaiser's acoustic and electromagnetic wavelets

A really friendly guide to wavelets

Waveletbased image annotation and retrieval

Very basic explanation of Wavelets and how FFT relates to it

A Practical Guide to Wavelet Analysis is very helpful, and the wavelet software in FORTRAN, IDL and MATLAB are freely available online. Note that the biased wavelet power spectrum needs to be rectified. The bias rectification is realized in several software, such as Matlab, NCL, R, and Python.

WITS: Where Is The Starlet? A dictionary of tens of wavelets and waveletrelated terms ending in let, from activelets to xlets through bandlets, contourlets, curvelets, noiselets, wedgelets.

Python Wavelet Transforms Package OpenSource code for computing 1D and 2D Discrete wavelet transform, Stationary wavelet transform and Wavelet packet transform.

Wavelet Library GNU/GPL library for ndimensional discrete wavelet/framelet transforms.

The Fractional Spline Wavelet Transform describes a fractional wavelet transform based on fractional bSplines.

A Panorama on Multiscale Geometric Representations, Intertwining Spatial, Directional and Frequency Selectivity provides a tutorial on twodimensional oriented wavelets and related geometric multiscale transforms.

HDPLC Alliance

Signal Denoising using Wavelets
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