Erlang distribution
The probability distribution concentrated on $(0,\infty)$ with density
$$p(x)=\frac{(n\mu)^n}{\Gamma(n)}x^{n-1}e^{-n\mu x},\quad x>0,$$
where the integer $n\geq1$ and the real number $\mu>0$ are parameters. The characteristic function of the Erlang distribution has the form
$$\left(1-\frac{it}{n\mu}\right)^{-n},$$
and the mathematical expectation and variance are $1/\mu$ and $1/n\mu^2$, respectively.
The Erlang distribution is special case of the gamma-distribution: $p(x)=\alpha g_\lambda(\alpha x)$, where $g_\lambda(y)$ is the density of the gamma-distribution for $\lambda=n$, and where $\alpha=n\mu$. For $n=1$ the Erlang distribution is the same as the exponential distribution with parameter $\mu$. The Erlang distribution with parameters $n$ and $\mu$ can be found as the distribution of the sum of $n$ independent random variables having the same exponential distribution with parameter $n\mu$. As $n\to\infty$, the Erlang distribution tends to the degenerate distribution concentrated at the point $1/\mu$.
The selection of the Erlang distribution from the system of gamma-distributions is explained by its use in queueing theory. In many random queueing processes the Erlang distribution appears as the distribution of intervals among random events or as the distribution of the queueing time. Sometimes the Erlang distribution is defined as the gamma-distribution with the density
$$\frac{\alpha^n}{\Gamma(n)}x^{n-1}e^{-\alpha x},\quad x>0.$$
It is named for A. Erlang, who was the first to construct mathematical models in queueing problems.
References
[1] | T.L. Saaty, "On elements of queueing theory with applications" , McGraw-Hill (1961) |
Erlang distribution. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Erlang_distribution&oldid=33169