Factorial moment generating function

In probability theory and statistics, the factorial moment generating function of the probability distribution of a random variable X is

${\displaystyle M_{X}(t)=E\left(t^{X}\right),\quad t\in \mathbb {R} ,}$

wherever this expectation exists. The factorial moment generating function generates the factorial moments of the probability distribution.

Provided the factorial moment generating function exists in an interval around t = 1, the nth factorial moment is given by

${\displaystyle E\left((X)_{n}\right)=M_{X}^{(n)}(1)=\left.{\frac {\mathrm {d} ^{n}}{\mathrm {d} t^{n}}}\right|_{t=1}M_{X}(t),}$

where the Pochhammer symbol (x)_n is the falling factorial

${\displaystyle (x)_{n}=x(x-1)(x-2)\cdots (x-n+1).\,}$ ,,!,,(-.-),,!,,

(Confusingly, some mathematicians, especially in the field of special functions, use the same notation to represent the rising factorial.)

Suppose X has a Poisson distribution with expected value λ, then the factorial moment generating function of X is

${\displaystyle M_{X}(t)=\sum _{x=0}^{\infty }{\frac {(t\lambda )^{x}e^{-\lambda }}{x!}}=e^{-\lambda (1-t)},}$

and thus we have

${\displaystyle E((X)_{n})=\lambda ^{n}.}$

• Factorial moment
• moment (mathematics)