Normal distribution

Quantile function

Properties

Symmetries and derivatives

• It is symmetric around the point which is at the same time the mode, the median and the mean of the distribution.
• It is unimodal: its first derivative is positive for negative for and zero only at
• The area under the curve and over the -axis is unity.
• Its density has two inflection points, located one standard deviation away from the mean, namely at and
• Its density is log-concave.
• Its density is infinitely differentiable, indeed supersmooth of order 2.

• Its first derivative is
• Its second derivative is
• More generally, its th derivative is where is the th Hermite polynomial.
• The probability that a normally distributed variable with known and is in a particular set, can be calculated by using the fact that the fraction has a standard normal distribution.

  Moments

Fourier transform and characteristic function

Moment and cumulant generating functions

Stein operator and class

Zero-variance limit

Maximum entropy

Operations on normal deviates

Infinite divisibility and Cramér's theorem

Bernstein's theorem

Other properties

Related distributions

Central limit theorem

• The binomial distribution is approximately normal with mean and variance for large and for not too close to 0 or 1.
• The Poisson distribution with parameter is approximately normal with mean and variance, for large values of.
• The chi-squared distribution is approximately normal with mean and variance, for large.
• The Student's t-distribution is approximately normal with mean 0 and variance 1 when is large.

Operations on a single random variable

• The exponential of X is distributed log-normally:.
• The absolute value of X has folded normal distribution:. If this is known as the half-normal distribution.
• The absolute value of normalized residuals, |X − μ|/σ, has chi distribution with one degree of freedom: |X − μ|/σ ~.
• The square of X/σ has the noncentral chi-squared distribution with one degree of freedom:. If μ = 0, the distribution is called simply chi-squared.
• The distribution of the variable X restricted to an interval is called the truncated normal distribution.
• ⁻² has a Lévy distribution with location 0 and scale σ⁻².

  Combination of two independent random variables

• Their sum and difference is distributed normally with mean zero and variance two:.
• Their product follows the "product-normal" distribution with density function where is the modified Bessel function of the second kind. This distribution is symmetric around zero, unbounded at, and has the characteristic function.
• Their ratio follows the standard Cauchy distribution:.
• Their Euclidean norm has the Rayleigh distribution.

  Combination of two or more independent random variables

• If are independent standard normal random variables, then the sum of their squares has the chi-squared distribution with degrees of freedom
• If are independent normally distributed random variables with means and variances, then their sample mean is independent from the sample standard deviation, which can be demonstrated using Basu's theorem or Cochran's theorem. The ratio of these two quantities will have the Student's t-distribution with degrees of freedom:
• If, are independent standard normal random variables, then the ratio of their normalized sums of squares will have the with degrees of freedom:

  Operations on the density function

Extensions

• The multivariate normal distribution describes the Gaussian law in the k-dimensional Euclidean space. A vector is multivariate-normally distributed if any linear combination of its components has a normal distribution. The variance of X is a k×k symmetric positive-definite matrix V. The multivariate normal distribution is a special case of the elliptical distributions. As such, its iso-density loci in the k = 2 case are ellipses and in the case of arbitrary k are ellipsoids.
• Rectified Gaussian distribution a rectified version of normal distribution with all the negative elements reset to 0
• Complex normal distribution deals with the complex normal vectors. A complex vector is said to be normal if both its real and imaginary components jointly possess a 2k-dimensional multivariate normal distribution. The variance-covariance structure of X is described by two matrices: the variance matrix Γ, and the relation matrix C.
• Matrix normal distribution describes the case of normally distributed matrices.
• Gaussian processes are the normally distributed stochastic processes. These can be viewed as elements of some infinite-dimensional Hilbert space H, and thus are the analogues of multivariate normal vectors for the case. A random element is said to be normal if for any constant the scalar product has a normal distribution. The variance structure of such Gaussian random element can be described in terms of the linear covariance . Several Gaussian processes became popular enough to have their own names:
• * Brownian motion,
• * Brownian bridge,
• * Ornstein–Uhlenbeck process.
• Gaussian q-distribution is an abstract mathematical construction that represents a "q-analogue" of the normal distribution.
• the q-Gaussian is an analogue of the Gaussian distribution, in the sense that it maximises the Tsallis entropy, and is one type of Tsallis distribution. Note that this distribution is different from the Gaussian q-distribution above.

• Pearson distribution — a four-parameter family of probability distributions that extend the normal law to include different skewness and kurtosis values.
• The generalized normal distribution, also known as the exponential power distribution, allows for distribution tails with thicker or thinner asymptotic behaviors.

  Statistical Inference

Estimation of parameters

Sample mean

Sample variance

Confidence intervals

Normality tests

• "Visual" tests are more intuitively appealing but subjective at the same time, as they rely on informal human judgement to accept or reject the null hypothesis.
• * Q-Q plot— is a plot of the sorted values from the data set against the expected values of the corresponding quantiles from the standard normal distribution. That is, it's a plot of point of the form, x_{, where plotting points pk are equal to pk = / and α is an adjustment constant, which can be anything between 0 and 1. If the null hypothesis is true, the plotted points should approximately lie on a straight line.}
• * P-P plot— similar to the Q-Q plot, but used much less frequently. This method consists of plotting the points, where. For normally distributed data this plot should lie on a 45° line between and .
• * Shapiro-Wilk test employs the fact that the line in the Q-Q plot has the slope of σ. The test compares the least squares estimate of that slope with the value of the sample variance, and rejects the null hypothesis if these two quantities differ significantly.
• * Normal probability plot
• Moment tests:
• * D'Agostino's K-squared test
• * Jarque–Bera test
• Empirical distribution function tests:
• * Lilliefors test
• * Anderson–Darling test

  Bayesian analysis of the normal distribution

• Either the mean, or the variance, or neither, may be considered a fixed quantity.
• When the variance is unknown, analysis may be done directly in terms of the variance, or in terms of the precision, the reciprocal of the variance. The reason for expressing the formulas in terms of precision is that the analysis of most cases is simplified.
• Both univariate and multivariate cases need to be considered.
• Either conjugate or improper prior distributions may be placed on the unknown variables.
• An additional set of cases occurs in Bayesian linear regression, where in the basic model the data is assumed to be normally distributed, and normal priors are placed on the regression coefficients. The resulting analysis is similar to the basic cases of independent identically distributed data, but more complex.

Sum of two quadratics

Scalar form

1. The factor has the form of a weighted average of y and z.
2. This shows that this factor can be thought of as resulting from a situation where the reciprocals of quantities a and b add directly, so to combine a and b themselves, it's necessary to reciprocate, add, and reciprocate the result again to get back into the original units. This is exactly the sort of operation performed by the harmonic mean, so it is not surprising that is one-half the harmonic mean of a and b.

   Vector form

Sum of differences from the mean

With known variance

With known mean

With unknown mean and unknown variance

1. From the analysis of the case with unknown mean but known variance, we see that the update equations involve sufficient statistics computed from the data consisting of the mean of the data points and the total variance of the data points, computed in turn from the known variance divided by the number of data points.
2. From the analysis of the case with unknown variance but known mean, we see that the update equations involve sufficient statistics over the data consisting of the number of data points and sum of squared deviations.
3. Keep in mind that the posterior update values serve as the prior distribution when further data is handled. Thus, we should logically think of our priors in terms of the sufficient statistics just described, with the same semantics kept in mind as much as possible.
4. To handle the case where both mean and variance are unknown, we could place independent priors over the mean and variance, with fixed estimates of the average mean, total variance, number of data points used to compute the variance prior, and sum of squared deviations. Note however that in reality, the total variance of the mean depends on the unknown variance, and the sum of squared deviations that goes into the variance prior depend on the unknown mean. In practice, the latter dependence is relatively unimportant: Shifting the actual mean shifts the generated points by an equal amount, and on average the squared deviations will remain the same. This is not the case, however, with the total variance of the mean: As the unknown variance increases, the total variance of the mean will increase proportionately, and we would like to capture this dependence.
5. This suggests that we create a conditional prior of the mean on the unknown variance, with a hyperparameter specifying the mean of the pseudo-observations associated with the prior, and another parameter specifying the number of pseudo-observations. This number serves as a scaling parameter on the variance, making it possible to control the overall variance of the mean relative to the actual variance parameter. The prior for the variance also has two hyperparameters, one specifying the sum of squared deviations of the pseudo-observations associated with the prior, and another specifying once again the number of pseudo-observations. Note that each of the priors has a hyperparameter specifying the number of pseudo-observations, and in each case this controls the relative variance of that prior. These are given as two separate hyperparameters so that the variance of the two priors can be controlled separately.
6. This leads immediately to the normal-inverse-gamma distribution, which is the product of the two distributions just defined, with conjugate priors used and with the same four parameters just defined.

Occurrence and applications

1. Exactly normal distributions;
2. Approximately normal laws, for example when such approximation is justified by the central limit theorem; and
3. Distributions modeled as normal – the normal distribution being the distribution with maximum entropy for a given mean and variance.
4. Regression problems – the normal distribution being found after systematic effects have been modeled sufficiently well.

   Exact normality

• Probability density function of a ground state in a quantum harmonic oscillator.
• The position of a particle that experiences diffusion. If initially the particle is located at a specific point, then after time t its location is described by a normal distribution with variance t, which satisfies the diffusion equation . If the initial location is given by a certain density function, then the density at time t is the convolution of g and the normal PDF.

  Approximate normality

• In counting problems, where the central limit theorem includes a discrete-to-continuum approximation and where infinitely divisible and decomposable distributions are involved, such as
• * Binomial random variables, associated with binary response variables;
• * Poisson random variables, associated with rare events;
• Thermal radiation has a Bose–Einstein distribution on very short time scales, and a normal distribution on longer timescales due to the central limit theorem.

  Assumed normality

• In biology, the logarithm of various variables tend to have a normal distribution, that is, they tend to have a log-normal distribution, with examples including:
• * Measures of size of living tissue ;
• * The length of inert appendages of biological specimens, in the direction of growth; presumably the thickness of tree bark also falls under this category;
• * Certain physiological measurements, such as blood pressure of adult humans.
• In finance, in particular the Black–Scholes model, changes in the logarithm of exchange rates, price indices, and stock market indices are assumed normal. Some mathematicians such as Benoit Mandelbrot have argued that log-Levy distributions, which possesses heavy tails would be a more appropriate model, in particular for the analysis for stock market crashes. The use of the assumption of normal distribution occurring in financial models has also been criticized by Nassim Nicholas Taleb in his works.
• Measurement errors in physical experiments are often modeled by a normal distribution. This use of a normal distribution does not imply that one is assuming the measurement errors are normally distributed, rather using the normal distribution produces the most conservative predictions possible given only knowledge about the mean and variance of the errors.
• In standardized testing, results can be made to have a normal distribution by either selecting the number and difficulty of questions or transforming the raw test scores into "output" scores by fitting them to the normal distribution. For example, the SAT's traditional range of 200–800 is based on a normal distribution with a mean of 500 and a standard deviation of 100.

• Many scores are derived from the normal distribution, including percentile ranks, normal curve equivalents, stanines, z-scores, and T-scores. Additionally, some behavioral statistical procedures assume that scores are normally distributed; for example, t-tests and ANOVAs. Bell curve grading assigns relative grades based on a normal distribution of scores.
• In hydrology the distribution of long duration river discharge or rainfall, e.g. monthly and yearly totals, is often thought to be practically normal according to the central limit theorem. The blue picture, made with CumFreq, illustrates an example of fitting the normal distribution to ranked October rainfalls showing the 90% confidence belt based on the binomial distribution. The rainfall data are represented by plotting positions as part of the cumulative frequency analysis.

  Produced normality

Computational methods

Generating values from normal distribution

• The most straightforward method is based on the probability integral transform property: if U is distributed uniformly on, then Φ⁻¹ will have the standard normal distribution. The drawback of this method is that it relies on calculation of the probit function Φ⁻¹, which cannot be done analytically. Some approximate methods are described in and in the erf article. Wichura gives a fast algorithm for computing this function to 16 decimal places, which is used by R to compute random variates of the normal distribution.
• An easy to program approximate approach, that relies on the central limit theorem, is as follows: generate 12 uniform U deviates, add them all up, and subtract 6 – the resulting random variable will have approximately standard normal distribution. In truth, the distribution will be Irwin–Hall, which is a 12-section eleventh-order polynomial approximation to the normal distribution. This random deviate will have a limited range of.
• The Box–Muller method uses two independent random numbers U and V distributed uniformly on. Then the two random variables X and Y
• The Marsaglia polar method is a modification of the Box–Muller method which does not require computation of the sine and cosine functions. In this method, U and V are drawn from the uniform distribution, and then is computed. If S is greater or equal to 1, then the method starts over, otherwise the two quantities
• The Ratio method is a rejection method. The algorithm proceeds as follows:
• * Generate two independent uniform deviates U and V;
• * Compute X = /U;
• * Optional: if X² ≤ 5 − 4e^1/4U then accept X and terminate algorithm;
• * Optional: if X² ≥ 4e^−1.35/U + 1.4 then reject X and start over from step 1;
• * If X² ≤ −4 lnU then accept X, otherwise start over the algorithm.
• The ziggurat algorithm is faster than the Box–Muller transform and still exact. In about 97% of all cases it uses only two random numbers, one random integer and one random uniform, one multiplication and an if-test. Only in 3% of the cases, where the combination of those two falls outside the "core of the ziggurat", do exponentials and more uniform random numbers have to be employed.
• Integer arithmetic can be used to sample from the standard normal distribution. This method is exact in the sense that it satisfies the conditions of ideal approximation; i.e., it is equivalent to sampling a real number from the standard normal distribution and rounding this to the nearest representable floating point number.
• There is also some investigation into the connection between the fast Hadamard transform and the normal distribution, since the transform employs just addition and subtraction and by the central limit theorem random numbers from almost any distribution will be transformed into the normal distribution. In this regard a series of Hadamard transforms can be combined with random permutations to turn arbitrary data sets into a normally distributed data.

  Numerical approximations for the normal CDF

History

Development

Naming

Citations