1. Introduction
A random variable X is said to have a zero-inflated Poisson distribution if its probability mass function is given by
(1)
where and, ,.
Thus, the distribution of X is a mixture of a distribution degenerate at zero and a Poisson distribution with mean.
2. Probability Generating Function
The probability generating function (pgf) of X is given by
.
3. Characterization
Let X be a non-negative integer valued random variable with and the pgf. Then, the distribution of X is zero-inflated Poisson if and only if, where, b are constants and is the first derivative of.
Proof:
1) Suppose that X has a zero-inflated Poisson distribution specified in (1.1). Then the pgf of X is given by
On differentiation, we get
.
Hence satisfies the linear differential equation
(2)
2) Suppose that the pgf of X satisfies
If, then and in turn. By the property of the pgf,. But, which is not possible because.
Therefore.
3) The Linear Differential Equation
The linear differential equation is of the form
where and are functions of.
Then its solution is given by
,
where c is an arbitrary constant.
Here
.
Hence,.
Therefore the solution of the Equation (2) is given by
.
We now extract the probabilities, using the above solution.
Since is a pgf, , where is the k-th derivative of.
We get
, , , and so on.
Now,
Since, it is easy to see that,
We have
with and.
Therefore X has the pgf specified in Equation (1).