Generate a normally distributed random variate with given mean and standard deviation.

Generate a normally distributed random variate with zero mean and unit variance.

The implementation uses Doornik's modified ziggurat algorithm. Compared to the ziggurat algorithm usually used, this is slower, but generates more independent variates that pass stringent tests of randomness.

Generate an exponentially distributed random variate.

Generate truncated exponentially distributed random variate.

Random variate generator for gamma distribution.

Random variate generator for the chi square distribution.

Random variate generator for Beta distribution

Random variate generator for categorical distribution.

Note that if you need to generate a lot of variates functions System.Random.MWC.CondensedTable will offer better performance. If only few is needed this function will faster since it avoids costs of setting up table.

Random variate generator for the geometric distribution, computing the number of failures before success. Distribution's support is [0..].

Random variate generator for geometric distribution for number of trials. Distribution's support is [1..] (i.e. just geometric0 shifted by 1).

Random variate generator for Bernoulli distribution

Random variate generator for Dirichlet distribution

Random variate generator for uniformly distributed permutations. It returns random permutation of vector [0 .. n-1].

This is the Fisher-Yates shuffle

Random variate generator for a uniformly distributed shuffle (all shuffles are equiprobable) of a vector. It uses Fisher-Yates shuffle algorithm.

In-place uniformly distributed shuffle (all shuffles are equiprobable)of a vector.