Probability-generating function

In probability theory, the probability generating function of a discrete random variable is a power series representation (the generating function) of the probability mass function of the random variable. Probability generating functions are often employed for their succinct description of the sequence of probabilities Pr(X = i) in the probability mass function for a random variable X, and to make available the well-developed theory of power series with non-negative coefficients.

Definition

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Univariate case

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If X is a discrete random variable taking values x in the non-negative integers {0,1, ...}, then the probability generating function of X is defined as [1]

 

where   is the probability mass function of  . Note that the subscripted notations   and   are often used to emphasize that these pertain to a particular random variable  , and to its distribution. The power series converges absolutely at least for all complex numbers   with  ; the radius of convergence being often larger.

Multivariate case

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If X = (X1,...,Xd) is a discrete random variable taking values (x1,...,xd) in the d-dimensional non-negative integer lattice {0,1, ...}d, then the probability generating function of X is defined as

 

where p is the probability mass function of X. The power series converges absolutely at least for all complex vectors   with  

Properties

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Power series

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Probability generating functions obey all the rules of power series with non-negative coefficients. In particular,  , where  , x approaching 1 from below, since the probabilities must sum to one. So the radius of convergence of any probability generating function must be at least 1, by Abel's theorem for power series with non-negative coefficients.

Probabilities and expectations

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The following properties allow the derivation of various basic quantities related to  :

  1. The probability mass function of   is recovered by taking derivatives of  ,
     
  2. It follows from Property 1 that if random variables   and   have probability-generating functions that are equal,  , then  . That is, if   and   have identical probability-generating functions, then they have identical distributions.
  3. The normalization of the probability mass function can be expressed in terms of the generating function by
     
    The expectation of   is given by
     
    More generally, the  factorial moment,   of   is given by
     
    So the variance of   is given by
     
    Finally, the  raw moment of X is given by
     
  4.   where X is a random variable,   is the probability generating function (of  ) and   is the moment-generating function (of  ).

Functions of independent random variables

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Probability generating functions are particularly useful for dealing with functions of independent random variables. For example:

  • If   is a sequence of independent (and not necessarily identically distributed) random variables that take on natural-number values, and
 
where the   are constant natural numbers, then the probability generating function is given by
 .
  • In particular, if   and   are independent random variables:
  and
 .
  • In the above, the number   of independent random variables in the sequence is fixed. Assume   is discrete random variable taking values on the non-negative integers, which is independent of the  , and consider the probability generating function  . If the   are not only independent but also identically distributed with common probability generating function  , then
 
This can be seen, using the law of total expectation, as follows:
 
This last fact is useful in the study of Galton–Watson processes and compound Poisson processes.
  • When the   are not supposed identically distributed (but still independent and independent of  ), we have
 , where  .
For identically distributed  s, this simplifies to the identity stated before, but the general case is sometimes useful to obtain a decomposition of   by means of generating functions.

Examples

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  • The probability generating function of an almost surely constant random variable, i.e. one with   and   is
 
  • The probability generating function of a binomial random variable, the number of successes in   trials, with probability   of success in each trial, is
 
Note: it is the  -fold product of the probability generating function of a Bernoulli random variable with parameter  .
So the probability generating function of a fair coin, is
 
  • The probability generating function of a negative binomial random variable on  , the number of failures until the   success with probability of success in each trial  , is
 , which converges for  .
Note that this is the  -fold product of the probability generating function of a geometric random variable with parameter   on  .
  • The probability generating function of a Poisson random variable with rate parameter   is
 
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The probability generating function is an example of a generating function of a sequence: see also formal power series. It is equivalent to, and sometimes called, the z-transform of the probability mass function.

Other generating functions of random variables include the moment-generating function, the characteristic function and the cumulant generating function. The probability generating function is also equivalent to the factorial moment generating function, which as   can also be considered for continuous and other random variables.

Notes

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References

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  • Johnson, N.L.; Kotz, S.; Kemp, A.W. (1993) Univariate Discrete distributions (2nd edition). Wiley. ISBN 0-471-54897-9 (Section 1.B9)