| Continuous binomial (cobin) |
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| Parameters |
(natural parameter)
(inverse dispersion) |
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| Support |
if , if  |
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| PDF |

with
and
 |
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| Mean |
 |
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| Variance |
 |
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In probability theory and statistics, the continuous binomial distribution (also called the cobin distribution) is a family of continuous probability distributions on the unit interval that belongs to an exponential dispersion family. It was introduced as a response distribution for generalized linear models for continuous proportional data, proposed as an alternative to beta regression.[1] The special case
coincides with the continuous Bernoulli distribution[2].
Definition
A random variable
is said to follow a continuous binomial (cobin) distribution with natural parameter
and inverse dispersion
, written
, if it has density on
given by

where the log-partition function is

and the base measure
is

with
. The function
coincides with the probability density function of the Irwin–Hall distribution with parameter
, evaluated at
.
When
is fixed, the cobin distribution belongs to a one-parameter natural exponential family in
.
- Bates distribution: when
, the density reduces to
, corresponding to the distribution of the mean of
independent
random variables (equivalently, a scaled Irwin–Hall distribution or Bates distribution).
- Uniform distribution: when
and
, the distribution reduces to the continuous uniform distribution on
.
- If
are independent and identically distributed continuous Bernoulli random variables with common natural parameter
, then

Properties
Mean and variance
The mean and variance of
can be expressed in terms of derivatives of
:
, for
.
, for
.
If
, then
and
.
Sufficient statistic for the mean
If
are independent and identically distributed continuous binomial random variables with common natural parameter
and fixed inverse dispersion parameter
, then the sample mean

is a sufficient statistic for
.
This is in contrast with the beta distribution: under a mean–precision parameterisation
with fixed
, a sufficient statistic for the mean
is

not the sample mean
.
Applications
The cobin distribution has been proposed as a response distribution for generalized linear models of continuous proportional data, as an alternative to beta regression, including extensions with random effects.
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Discrete univariate | with finite support | |
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with infinite support | |
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Continuous univariate | supported on a bounded interval | |
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supported on a semi-infinite interval | |
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supported on the whole real line | |
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with support whose type varies | |
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Mixed univariate | |
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Multivariate (joint) | |
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| Directional | |
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Degenerate and singular | |
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| Families | |
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