Expected Value

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Index: Spectral Audio Signal Processing

Spectral Audio Signal Processing

Stochastic Processes

Stationary Stochastic Process

Mean

The midpoint of the passband. — Click for http://en.wikipedia.org/wiki/Bandpass

A periodic signal is a signal that forever repeats itself. — Click for http://en.wikibooks.org/wiki/Signals_and_Systems/Periodic_Signals

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Spectrum analysis of sound is analogous to decomposing white light into its component colors by means of a prism — Click for https://ccrma.stanford.edu/~jos/mdft/Example_Applications_DFT.html

Noise (in signal processing) is a random signal. In the language of statistical signal processing, a noise signal is typically modeled as 'stochastic process', which is in turn defined as a sequence of random variables. — Click for https://ccrma.stanford.edu/~jos/sasp/What_Noise.html

A signal is typically a real-valued function of time. A discrete-time signal is typically a real-valued function of discrete time, and is therefore a time-ordered sequence of real numbers. — Click for http://ccrma.stanford.edu/~jos/filters/Definition_Signal.html

A probability density function p(x) is a non-negative function of x giving the relative probability of various values of x. The probability of x occurring in the interval [x1,x2] is equal to the integral of p(x) from x1 to x2. Therefore, the integral of p(x) over all x (the area under p(x) when graphed) is always one for any valid probability density function. — Click for http://en.wikipedia.org/wiki/Probability_density_function

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Index: Spectral Audio Signal Processing

Spectral Audio Signal Processing

Stochastic Processes

Stationary Stochastic Process

Mean

Expected Value

Definition: The expected value of a continuous random variable $v\in(-\infty,\infty)$ is denoted $E\{v\}$ and is defined by

$\displaystyle E\{v\} \isdef \int_{-\infty}^\infty x \, p_v(x) dx$

(C.12)

where denotes the probability density function (PDF) for the random variable v.

Example: Let the random variable be uniformly distributed between and , i.e.,

$\displaystyle p_v(x) = \left\{\begin{array}{ll} \frac{1}{b-a}, & a\leq x \leq b \\ [5pt] 0, & \hbox{otherwise}. \\ \end{array} \right.$

(C.13)

Then the expected value of is computed as

$\displaystyle E\{v\} = \int_a^b x \frac{1}{b-a} dx = \frac{1}{2}\frac{b^2-a^2}{b-a} = \frac{b+a}{2}.$

(C.14)

Thus, the expected value of a random variable uniformly distributed between and is simply the average of and .

For a stochastic process, which is simply a sequence of random variables, $E\{x(n)\}$ means the expected value of over ``all realizations'' of the random process $x(\cdot)$ . This is also called an ensemble average. In other words, for each ``roll of the dice,'' we obtain an entire signal $x(n),\, n=0,\pm1,\pm2,\cdots$ , and to compute $E\{x(0)\}$ , say, we average together all of the values of obtained for all ``dice rolls.''

For a stationary random process $x = \{x(n),\, n=0,\pm1,\pm2,\cdots\}$ , the random variables which make it up are identically distributed. As a result, we may normally compute expected values by averaging over time within a single realization of the random process, instead of having to average ``vertically'' at a single time instant over many realizations of the random process.^C.2 Denote time averaging by

$\displaystyle {\cal E}_n\{x(n)\} \isdef \lim_{N\to\infty}\frac{1}{2N+1}\sum_{n=-N}^N x(n).$

(C.15)

Then, for a stationary random processes, we have $E\{x(n)\} = {\cal E}_n\{x(n)\}$ . That is, for stationary random signals, ensemble averages equal time averages.

We are concerned only with stationary stochastic processes in this book. While the statistics of noise-like signals must be allowed to evolve over time in high quality spectral models, we may require essentially time-invariant statistics within a single frame of data in the time domain. In practice, we choose our spectrum analysis window short enough to impose this. For audio work, 20 ms is a typical choice for a frequency-independent frame length.^C.3 In a multiresolution system, in which the frame length can vary across frequency bands, several periods of the band center-frequency is a reasonable choice. As discussed in §5.5.2, the minimum number of periods required under the window for resolution of spectral peaks depends on the window type used.

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``Spectral Audio Signal Processing'', by Julius O. Smith III, W3K Publishing, 2011, ISBN 978-0-9745607-3-1.
Copyright © 2022-02-28 by Julius O. Smith III
Center for Computer Research in Music and Acoustics (CCRMA), Stanford University

Expected Value

``Spectral Audio Signal Processing'', by Julius O. Smith III, W3K Publishing, 2011, ISBN 978-0-9745607-3-1. Copyright © 2022-02-28 by Julius O. Smith III Center for Computer Research in Music and Acoustics (CCRMA), Stanford University

``Spectral Audio Signal Processing'', by Julius O. Smith III, W3K Publishing, 2011, ISBN 978-0-9745607-3-1.
Copyright © 2022-02-28 by Julius O. Smith III
Center for Computer Research in Music and Acoustics (CCRMA), Stanford University