Difference between revisions of "Negative binomial distribution"
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Revision as of 11:21, 4 May 2012
A probability distribution of a random variable 
which takes non-negative integer values 
in accordance with the formula
 | (*) |
for any real values of the parameters 
and 
. The generating function and the characteristic function of a negative binomial distribution are defined by the formulas
 |
and
 |
respectively, where 
. The mathematical expectation and variance are equal, respectively, to 
and 
. The distribution function of a negative binomial distribution for the values 
is defined in terms of the values of the beta-distribution function at a point 
by the following relation:
 |
where 
is the beta-function.
The origin of the term "negative binomial distribution" is explained by the fact that this distribution is generated by a binomial with a negative exponent, i.e. the probabilities (*) are the coefficients of the expansion of 
in powers of 
.
Negative binomial distributions are encountered in many applications of probability theory. For an integer 
, the negative binomial distribution is interpreted as the distribution of the number of failures before the 
-th "success" in a scheme of Bernoulli trials with probability of "success" 
; in this context it is usually called a Pascal distribution and is a discrete analogue of the gamma-distribution. When 
, the negative binomial distribution coincides with the geometric distribution. The negative binomial distribution often appears in problems related to the randomization of the parameters of a distribution; for example, if 
is a random variable having, conditionally on 
, a Poisson distribution with random parameter 
, which in turn has a gamma-distribution with density
 |
then the marginal distribution of 
will be a negative binomial distribution with parameters 
and 
. The negative binomial distribution serves as a limiting form of a Pólya distribution.
The sum of independent random variables 
which have negative binomial distributions with parameters 
and 
, respectively, has a negative binomial distribution with parameters 
and 
. For large 
and small 
, where 
, the negative binomial distribution is approximated by the Poisson distribution with parameter 
. Many properties of a negative binomial distribution are determined by the fact that it is a generalized Poisson distribution.
References
| [1] | W. Feller, "An introduction to probability theory and its applications", 1–2, Wiley (1950–1966) |
Comments
See also Binomial distribution.
References
| [a1] | N.L. Johnson, S. Kotz, "Distributions in statistics, discrete distributions" , Wiley (1969) |
Negative binomial distribution. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Negative_binomial_distribution&oldid=25961