Poisson limit theorem
In probability theory, the law of rare events or Poisson limit theorem states that the Poisson distribution may be used as an approximation to the binomial distribution, under certain conditions. [1] The theorem was named after Siméon Denis Poisson (1781–1840).
Theorem
Let be a sequence of real numbers in such that the sequence converges to a finite limit . Then:
![{\displaystyle [0,1]}](../I/m/738f7d23bb2d9642bab520020873cccbef49768d.svg)
Proofs
- .
Since
and
This leaves
- .
Alternative Proof
Using Stirling's approximation, we can write:
Letting and :
As , so:
Ordinary Generating Functions
It is also possible to demonstrate the theorem through the use of Ordinary Generating Functions of the binomial distribution:
![G_{{\mathrm {bin}}}(x;p,N)\equiv \sum _{{k=0}}^{{N}}\left[{\binom {N}{k}}p^{k}(1-p)^{{N-k}}\right]x^{k}={\Big [}1+(x-1)p{\Big ]}^{{N}}](../I/m/5f3ce093093f971cffcd41e083e9bf050192af1c.svg)
by virtue of the Binomial Theorem. Taking the limit while keeping the product constant, we find
![\lim _{{N\rightarrow \infty }}G_{{\mathrm {bin}}}(x;p,N)=\lim _{{N\rightarrow \infty }}{\Big [}1+{\frac {\lambda (x-1)}{N}}{\Big ]}^{{N}}={\mathrm {e}}^{{\lambda (x-1)}}=\sum _{{k=0}}^{{\infty }}\left[{\frac {{\mathrm {e}}^{{-\lambda }}\lambda ^{k}}{k!}}\right]x^{k}](../I/m/2f0728e1ce9c1b18409921ed1e21c8690c17eac0.svg)
which is the OGF for the Poisson distribution. (The second equality holds due to the definition of the Exponential function.)
See also
References
- ↑ Papoulis, Pillai, Probability, Random Variables, and Stochastic Processes, 4th Edition