White Noise

Information about White Noise

For other uses, see White noise (disambiguation).

Colors of noise
White noise
Pink noise
Brown/Red noise
Grey noise

Calculated spectrum of a generated approximation of white noise

White noise is a random signal (or process) with a flat power spectral density. In other words, the signal's power spectral density has equal power in any band, at any centre frequency, having a given bandwidth. White noise is considered analogous to white light which contains all frequencies.

An infinite-bandwidth, white noise signal is purely a theoretical construction. By having power at all frequencies, the total power of such a signal is infinite. In practice, a signal can be "white" with a flat spectrum over a defined frequency band.

Statistical properties

An example realization of a white noise process.

The term white noise is also commonly applied to a noise signal in the spatial domain which has an autocorrelation which can be represented by a delta function over the relevant space dimensions. The signal is then "white" in the spatial frequency domain (this is equally true for signals in the angular frequency domain, e.g. the distribution of a signal across all angles in the night sky). The image to the right displays a finite length, discrete time realization of a white noise process generated from a computer.

Being uncorrelated in time does not, however, restrict the values a signal can take. Any distribution of values is possible (although it must have zero DC component). For example, a binary signal which can only take on the values 1 or 0 will be white if the sequence of zeros and ones is statistically uncorrelated. Noise having a continuous distribution, such as a normal distribution, can of course be white.

It is often incorrectly assumed that Gaussian noise (i.e. noise with a Gaussian amplitude distribution — see normal distribution) is necessarily white noise. However, neither property implies the other. Gaussianity refers to the way signal values are distributed, while the term 'white' refers to the shape of the flat power spectral density.

Pink noise (left) and white noise (right) on a FFT spectrogram with linear frequency axis (vertical)

We can therefore find Gaussian white noise, but also Poisson, Cauchy, etc. white noises. Thus, the two words "Gaussian" and "white" are often both specified in mathematical models of systems. Gaussian white noise is a good approximation of many real-world situations and generates mathematically tractable models. These models are used so frequently that the term additive white Gaussian noise has a standard abbreviation: AWGN. Gaussian white noise has the useful statistical property that its values are independent (see Statistical independence).

White noise is the generalized mean-square derivative of the Wiener process or Brownian motion.

Colors of noise

Main article: Colors of noise

There are also other "colors" of noise, the most commonly used being pink, brown and blue.

Applications

One use for white noise is in the field of architectural acoustics. In order to dissemble distracting, undesirable noises in interior spaces, a low level of constant white noise is generated.

It is used by some emergency vehicle sirens due to its ability to cut through background noise and its lack of echo, which makes it easier to locate.

White noise has also been used in electronic music, where it is used either directly or as an input for a filter to create other types of noise signal. In this respect, it is the analog to the violin in classical music. It is used extensively in audio synthesis, typically to recreate percussive instruments such as cymbals which have high noise content in their frequency domain.

It is also used to generate impulse responses. To set up the EQ for a concert or other performance in a venue, a short burst of white or pink noise is sent through the PA system and monitored from various points in the venue so that the engineer can tell if the acoustics of the building naturally boost or cut any frequencies. He or she can then adjust the overall EQ to ensure a balanced mix.

Music sample:

White noise
10 second sample of white sound.
Problems listening to the file? See media help

White noise can be used for frequency response testing of amplifiers and electronic filters. It is sometimes used with a flat response microphone and an automatic equalizer. The idea is that the system will generate white noise and the microphone will pick up the white noise produced by the speakers. It will then automatically equalize each frequency band to get a flat response. That system is used in professional level equipment, some high-end home stereo and some high-end car radios.

White noise is used as the basis of some random number generators.

White noise can be used to disorient individuals prior to interrogation and may be used as part of sensory deprivation techniques. White noise machines are sold as privacy enhancers and sleep aids and to mask tinnitus. White noise CDs, when used with headphones, can aid concentration by blocking out irritating or distracting noises in a person's environment.

Mathematical definition

White random vector

A random vector $\text{[math]}$ is a white random vector if and only if its mean vector and autocorrelation matrix are the following:

$\text{[math]}$

I. e., it is a zero mean random vector, and its autocorrelation matrix is a multiple of the identity matrix. When the autocorrelation matrix is a multiple of the identity, we say that it has spherical correlation.

White random process (white noise)

A continuous time random process $\text{[math]}$ where $\text{[math]}$ is a white noise process if and only if its mean function and autocorrelation function satisfy the following:

$\text{[math]}$

$\text{[math]}$ .

I. e., it is a zero mean process for all time and has infinite power at zero time shift since its autocorrelation function is the Dirac delta function.

The above autocorrelation function implies the following power spectral density.

$\text{[math]}$

since the Fourier transform of the delta function and likewise the is equal to 1. Since this power spectral density is the same at all frequencies, we call it white as an analogy to the frequency spectrum of white light.

Random vector transformations

Two theoretical applications using a white random vector are the simulation and whitening of another arbitrary random vector. To simulate an arbitrary random vector, we transform a white random vector with a carefully chosen matrix. We choose the transformation matrix so that the mean and covariance matrix of the transformed white random vector matches the mean and covariance matrix of the arbitrary random vector that we are simulating. To whiten an arbitrary random vector, we transform it by a different carefully chosen matrix so that the output random vector is a white random vector.

These two ideas are crucial in applications such as channel estimation and channel equalization in communications and audio. These concepts are also used in data compression.

Simulating a random vector

Suppose that a random vector $\text{[math]}$ has covariance matrix $\text{[math]}$ . Since this matrix is Hermitian symmetric and positive semidefinite, by the spectral theorem from linear algebra, we can diagonalize or factor the matrix in the following way.

$\text{[math]}$

where $\text{[math]}$ is the orthogonal matrix of eigenvectors and $\text{[math]}$ is the diagonal matrix of eigenvalues.

We can simulate the 1st and 2nd moment properties of this random vector $\text{[math]}$ with mean $\text{[math]}$ and covariance matrix $\text{[math]}$ via the following transformation of a white vector $\text{[math]}$ :

$\text{[math]}$

where

$\text{[math]}$

Thus, the output of this transformation has expectation

$\text{[math]}$

and covariance matrix

$\text{[math]}$

Whitening a random vector

The method for whitening a vector $\text{[math]}$ with mean $\text{[math]}$ and covariance matrix $\text{[math]}$ is to perform the following calculation:

$\text{[math]}$

Thus, the output of this transformation has expectation

$\text{[math]}$

and covariance matrix

$\text{[math]}$

By diagonalizing $\text{[math]}$ , we get the following:

$\text{[math]}$

Thus, with the above transformation, we can whiten the random vector to have zero mean and the identity covariance matrix.

Random signal transformations

We cannot extend the same two concepts of simulating and whitening to the case of continuous time random signals or processes. For simulating, we create a filter into which we feed a white noise signal. We choose the filter so that the output signal simulates the 1st and 2nd moments of any arbitrary random process. For whitening, we feed any arbitrary random signal into a specially chosen filter so that the output of the filter is a white noise signal.

Simulating a continuous-time random signal

White noise fed into a linear, time-invariant filter to simulate the 1st and 2nd moments of an arbitrary random process.

We can simulate any wide-sense stationary, continuous-time random process $\text{[math]}$ with constant mean $\text{[math]}$ and covariance function

$\text{[math]}$

and power spectral density

$\text{[math]}$

We can simulate this signal using frequency domain techniques.

Because $\text{[math]}$ is Hermitian symmetric and positive semi-definite, it follows that $\text{[math]}$ is real and can be factored as

$\text{[math]}$

if and only if $\text{[math]}$ satisfies the Paley-Wiener criterion.

$\text{[math]}$

If $\text{[math]}$ is a rational function, we can then factor it into pole-zero form as

$\text{[math]}$

Choosing a minimum phase $\text{[math]}$ so that its poles and zeros lie inside the left half s-plane, we can then simulate $\text{[math]}$ with $\text{[math]}$ as the transfer function of the filter.

We can simulate $\text{[math]}$ by constructing the following linear, time-invariant filter

$\text{[math]}$

where $\text{[math]}$ is a continuous-time, white-noise signal with the following 1st and 2nd moment properties:

$\text{[math]}$

Thus, the resultant signal $\text{[math]}$ has the same 2nd moment properties as the desired signal $\text{[math]}$ .

Whitening a continuous-time random signal

An arbitrary random process x(t) fed into a linear, time-invariant filter that whitens x(t) to create white noise at the output.

Suppose we have a wide-sense stationary, continuous-time random process $\text{[math]}$ defined with the same mean $\text{[math]}$ , covariance function $\text{[math]}$ , and power spectral density $\text{[math]}$ as above.

We can whiten this signal using frequency domain techniques. We factor the power spectral density $\text{[math]}$ as described above.

Choosing the minimum phase $\text{[math]}$ so that its poles and zeros lie inside the left half s-plane, we can then whiten $\text{[math]}$ with the following inverse filter

$\text{[math]}$

We choose the minimum phase filter so that the resulting inverse filter is stable. Additionally, we must be sure that $\text{[math]}$ is strictly positive for all $\text{[math]}$ so that $\text{[math]}$ does not have any singularities.

The final form of the whitening procedure is as follows:

$\text{[math]}$

so that $\text{[math]}$ is a white noise random process with zero mean and constant, unit power spectral density

$\text{[math]}$

Note that this power spectral density corresponds to a delta function for the covariance function of $\text{[math]}$ .

$\text{[math]}$

External links

White noise may mean:

White noise, a signal with a flat frequency spectrum
White Noise, the Penn State basketball student section
White noise (slang) a meaningless or distracting commotion or chatter.

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noisy white has the following meanings:

In facsimile or display systems, such as television, a nonuniformity in the white area of the image, i.e., document or picture, caused by the presence of noise in the received signal.

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Pink noise or 1/f noise is a signal or process with a frequency spectrum such that the power spectral density is proportional to the reciprocal of the frequency.
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Brownian noise ( Sample (help info ) ), also known as Brown noise or red noise, is the kind of signal noise produced by Brownian motion.
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Grey noise is random noise subjected to a psychoacoustic equal loudness curve (such as an inverted A-weighting curve) over a given range of frequencies, giving the listener the perception that it is equally loud at all frequencies.
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signal is any time-varying quantity. Signals are often scalar-valued functions of time (waveforms), but may be vector valued and may be functions of any other relevant independent variable.

The concept is broad, and hard to define precisely.
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In statistical signal processing and physics, the spectral density, power spectral density, or energy spectral density is a positive real function of a frequency variable associated with a stationary stochastic process, or a deterministic function of time, which has
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In mathematics, physics, and engineering, spatial frequency is a characteristic of any structure that is periodic across position in space. The spatial frequency is a measure of how often the structure repeats per unit of distance.
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When describing a periodic function in the frequency domain, the term DC coefficient or DC component refers to the mean value of the waveform (possibly scaled according to the norm of the corresponding basis function of the frequency analysis filter bank).
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normal distribution, also called the Gaussian distribution, is an important family of continuous probability distributions, applicable in many fields. Each member of the family may be defined by two parameters, location and scale: the mean ("average",
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Gaussian noise is noise that has a probability density function (abbreviated pdf) of the normal distribution (also known as Gaussian distribution). In other words, the values that the noise can take on are Gaussian distributed.
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In communications, the additive white Gaussian noise (AWGN) channel model is one in which the only impairment is the linear addition of wideband or white noise with a constant spectral density (expressed as watts per hertz of bandwidth) and a Gaussian distribution of
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In probability theory, to say that two events are independent, intuitively means that the occurrence of one event makes it neither more nor less probable that the other occurs.
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Wiener process is a continuous-time stochastic process named in honor of Norbert Wiener. It is often called Brownian motion, after Robert Brown. It is one of the best known Lévy processes (càdlàg stochastic processes with stationary independent increments) and occurs
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Brownian motion (named in honor of the botanist Robert Brown) is either the random movement of particles suspended in a fluid or the mathematical model used to describe such random movements, often called a Wiener process.
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noisy white has the following meanings:

In facsimile or display systems, such as television, a nonuniformity in the white area of the image, i.e., document or picture, caused by the presence of noise in the received signal.

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Brownian noise ( Sample (help info ) ), also known as Brown noise or red noise, is the kind of signal noise produced by Brownian motion.
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Architectural acoustics is the science of controlling sound within buildings. The first application of architectural acoustics was in the design of opera houses and then concert halls.
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siren is a loud noise maker. The original version would yield sounds under water, suggesting a link with the sirens of Greek mythology. Most modern ones are civil defense or "air raid" sirens, tornado sirens, or the sirens on emergency service vehicles such as ambulances, police
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Electronic music refers to music that emphasizes the use of electronic musical instruments or electronic music technology as a central aspect of the sound of the music. ^[1]
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''For the Anne Rice novel, see Violin (novel)

The violin is a bowed string instrument with four strings tuned in perfect fifths. It is the smallest and highest-pitched member of the violin family of string instruments, which also includes the viola and
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Classical music is a broad term that usually refers to music produced in, or rooted in the traditions of, Western art, ecclesiastical and concert music, encompassing a broad period from roughly the 9th century to the 21st century.
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Synthesizer is generally any kind of electronic musical instrument, or electronic device capable of producing or manipulating audio tones, such as musical notes, through audio signal processing.
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Cymbals (Fr. cymbales; Ger. Becken; Ital. piatti or cinelli; Por. pratos), are a modern percussion instrument. Cymbals consist of thin, normally round plates of various cymbal alloys; see cymbal making for a discussion of their
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impulse response of a system is its output when presented with a very brief signal, an impulse. While an impulse is a difficult concept to imagine, and an impossible thing in reality, it represents the limit case of a pulse made infinitely short in time while
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equalization (or equalisation, EQ) is the process of changing the frequency envelope of a sound. In passing through any channel, temporal/frequency spreading of a signal occurs. Etymologically, it means to correct, or make equal, the frequency response of a signal.
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In computing, a hardware random number generator is an apparatus that generates random numbers from a physical process. Such devices are often based on microscopic phenomena such as thermal noise or the photoelectric effect or other quantum phenomena.
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Interrogation is a methodology employed during the interview of a person, referred to as a "source", to obtain information that the source would not otherwise willingly disclose.
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This article is copied from an article on Wikipedia.org - the free encyclopedia created and edited by online user community. The text was not checked or edited by anyone on our staff. Although the vast majority of the wikipedia encyclopedia articles provide accurate and timely information please do not assume the accuracy of any particular article. This article is distributed under the terms of GNU Free Documentation License.

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White Noise

Information about White Noise

Statistical properties

Colors of noise

Applications

Mathematical definition

White random vector

White random process (white noise)

Random vector transformations

Simulating a random vector

Whitening a random vector

Random signal transformations

Simulating a continuous-time random signal

Whitening a continuous-time random signal

See also

External links