Uniform distribution (continuous)

Uniform
	Probability density function; ; Using maximum convention
	Cumulative distribution function; Image:Uniform distribution CDF.png
Parameters
Support
Probability density function (pdf)
Cumulative distribution function (cdf)
Mean
Median
Mode	any value in
Variance
Skewness
Excess kurtosis
Entropy
Moment-generating function (mgf)
Characteristic function

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In probability theory and statistics, the continuous uniform distribution is a family of probability distributions such that for each member of the family, all intervals of the same length on the distribution's support are equally probable. The support is defined by the two parameters, a and b, which are its minimum and maximum values. The distribution is often abbreviated U(a,b).

Characterization

Probability density function

The probability density function of the continuous uniform distribution is:

$f(x)=\left\{\begin{matrix} \frac{1}{b - a} & \ \ \ \mathrm{for}\ a \le x \le b, \\ \\ 0 & \mathrm{for}\ x<a\ \mathrm{or}\ x>b, \end{matrix}\right.$

The values at the two boundaries a and b are usually unimportant because they do not alter the values of the integrals of f(x) dx over any interval, nor of x f(x) dx or the like. Sometimes they are chosen to be zero, and sometimes chosen to be 1/(b − a). The latter is appropriate in the context of estimation by the method of maximum likelihood. In the context of Fourier analysis, one may take the value of f(a) or f(b) to be 1/(2(b − a)), since then the inverse transform of many integral transforms of this uniform function will yield back the function itself, rather than a function which is equal "almost everywhere", i.e. except on a set of points with zero measure. Also, it is consistent with the sign function which has no such ambiguity.

Cumulative distribution function

The cumulative distribution function is:

$F(x)=\left\{\begin{matrix} 0 & \mbox{for }x < a \\ \\ \frac{x-a}{b-a} & \ \ \ \mbox{for }a \le x < b \\ \\ 1 & \mbox{for }x \ge b \end{matrix}\right. \,\!$

Generating functions

Moment-generating function

The moment-generating function is

$M_x = E(e^{tx}) = \frac{e^{tb}-e^{ta}}{t(b-a)} \,\!$

from which we may calculate the raw moments m _k

$m_1=\frac{a+b}{2}, \,\!$

$m_2=\frac{a^2+ab+b^2}{3}, \,\!$

$m_k=\frac{1}{k+1}\sum_{i=0}^k a^ib^{k-i}. \,\!$

For a random variable following this distribution, the expected value is then m₁ = (a + b)/2 and the variance is m₂ − m₁² = (b − a)²/12.

Cumulant-generating function

For n ≥ 2, the nth cumulant of the uniform distribution on the interval [0, 1] is b_{n/n, where b_n is the nth Bernoulli number.}

Properties

Generalization to Borel sets

This distribution can be generalized to more complicated sets than intervals. If S is a Borel set of positive, finite measure, the uniform probability distribution on S can be specified by defining the pdf to be zero outside S and constantly equal to 1/K on S, where K is the Lebesgue measure of S.

Order statistics

Let X₁, ..., X_n be an i.i.d. sample from U(0,1). Let X_(k) be the kth order statistic from this sample. Then the probability distribution of X_(k) is a Beta distribution with parameters k and n − k + 1. The expected value is

$\operatorname{E}(X_{(k)}) = {k \over n+1}.$

This fact is useful when making Q-Q plots.

The variances are

$\operatorname{Var}(X_{(k)}) = {k (n-k+1) \over (n+1)^2 (n+2)} .$

'Uniformity'

The probability that a uniformly distributed random variable falls within any interval of fixed length is independent of the location of the interval itself (but it is dependent on the interval size), so long as the interval is contained in the distribution's support.

To see this, if X ≈ U(0,b) and [x, x+d] is a subinterval of [0,b] with fixed d > 0, then

$P\left(X\in\left [ x,x+d \right ]\right) = \int_{x}^{x+d} \frac{\mathrm{d}y}{b-a}\, = \frac{d}{b-a} \,\!$

which is independent of x. This fact motivates the distribution's name.

Standard uniform

Restricting $a = 0$ and $b = 1$ , the resulting distribution U(0,1) is called a standard uniform distribution.

One interesting property of the standard uniform distribution is that if u₁ has a standard uniform distribution, then so does 1-u₁.

Related distributions

If X has a standard uniform distribution,

Y = -ln(X)/λ has an exponential distribution with (rate) parameter λ.
Y = 1 - X^1/n has a beta distribution with parameters 1 and n. (Note this implies that the standard uniform distribution is a special case of the beta distribution, with parameters 1 and 1.)

Relationship to other functions

As long as the same conventions are followed at the transition points, the probability density function may also be expressed in terms of the Heaviside step function:

$f(x)=\frac{\operatorname{H}(x-a)-\operatorname{H}(x-b)}{b-a}, \,\!$

or in terms of the rectangle function

$f(x)=\frac{1}{b-a}\,\operatorname{rect}\left(\frac{x-\left(\frac{a+b}{2}\right)}{b-a}\right) .$

There is no ambiguity at the transition point of the sign function. Using the half-maximum convention at the transition points, the uniform distribution may be expressed in terms of the sign function as:

$f(x)=\frac{ \sgn{(x-a)}-\sgn{(x-b)}} {2(b-a)}.$

Applications

In statistics, when a p-value is used as a test statistic for a simple null hypothesis, and the distribution of the test statistic is continuous, then the test statistic (p-value) is uniformly distributed between 0 and 1 if the null hypothesis is true.

Sampling from a uniform distribution

There are many applications in which it is useful to run simulation experiments. Many programming languages have the ability to generate pseudo-random numbers which are effectively distributed according to the standard uniform distribution.

If u is a value sampled from the standard uniform distribution, then the value a + (b − a)u follows the uniform distribution parametrised by a and b, as described above.

Sampling from an arbitrary distribution

The uniform distribution is useful for sampling from arbitrary distributions. A general method is the inverse transform sampling method, which uses the cumulative distribution function (CDF) of the target random variable. This method is very useful in theoretical work. Since simulations using this method require inverting the CDF of the target variable, alternative methods have been devised for the cases where the cdf is not known in closed form. One such method is rejection sampling.

The normal distribution is an important example where the inverse transform method is not efficient. However, there is an exact method, the Box-Muller transformation, which uses the inverse transform to convert two independent uniform random variables into two independent normally distributed random variables.

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Acknowledgement and Attribution Regarding Sources of Content

Some of the initial content on this page may be incorporated in part from copyleft sources in the public domain including wikis such as Wikipedia and AskDrWiki. Drug information for patients came from the The National Library of Medicine. Infectious disease information may have come from the Centers for Disease Control (CDC). Differential Diagnoses are drawn from clinicians as well as an amalgamation of 3 sources: 1.The Disease Database; 2. Kahan, Scott, Smith, Ellen G. In A Page: Signs and Symptoms. Malden, Massachusetts: Blackwell Publishing, 2004:3; 3. Sailer, Christian, Wasner, Susanne. Differential Diagnosis Pocket. Hermosa Beach, CA: Borm Bruckmeir Publishing LLC, 2002:7 .

Probability density function Using maximum convention
Cumulative distribution function Image:Uniform distribution CDF.png
Parameters	$a,b \in (-\infty,\infty) \,\!$
Support	$a \le x \le b \,\!$
Probability density function (pdf)	$\begin{matrix} \frac{1}{b - a} & \mbox{for }a \le x \le b \\ \\ 0 & \mathrm{for}\ x<a\ \mathrm{or}\ x>b \end{matrix} \,\!$
Cumulative distribution function (cdf)	$\begin{matrix} 0 & \mbox{for }x < a \\ \frac{x-a}{b-a} & ~~~~~ \mbox{for }a \le x < b \\ 1 & \mbox{for }x \ge b \end{matrix} \,\!$
Mean	$\frac{a+b}{2} \,\!$
Median	$\frac{a+b}{2} \,\!$
Mode	any value in $[a,b] \,\!$
Variance	$\frac{(b-a)^2}{12} \,\!$
Skewness	$0 \,\!$
Excess kurtosis	$-\frac{6}{5} \,\!$
Entropy	$\ln(b-a) \,\!$
Moment-generating function (mgf)	$\frac{e^{tb}-e^{ta}}{t(b-a)} \,\!$
Characteristic function	$\frac{e^{itb}-e^{ita}}{it(b-a)} \,\!$

Uniform distribution (continuous)

Characterization

Probability density function

Cumulative distribution function

Generating functions

Moment-generating function

Cumulant-generating function

Properties

Generalization to Borel sets

Order statistics

'Uniformity'

Standard uniform

Related distributions

Relationship to other functions

Applications

Sampling from a uniform distribution

Sampling from an arbitrary distribution

Acknowledgement and Attribution Regarding Sources of Content

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