Poisson sampling

Template:Short description Script error: No such module "Distinguish". In survey methodology, Poisson sampling (sometimes denoted as PO sampling^[1]Template:Rp) is a sampling process where each element of the population is subjected to an independent Bernoulli trial which determines whether the element becomes part of the sample.^[1]Template:Rp^[2]

Each element of the population may have a different probability of being included in the sample (${\displaystyle {\pi }_i}$). The probability of being included in a sample during the drawing of a single sample is denoted as the first-order inclusion probability of that element (${\displaystyle p_i}$). If all first-order inclusion probabilities are equal, Poisson sampling becomes equivalent to Bernoulli sampling, which can therefore be considered to be a special case of Poisson sampling.

A mathematical consequence of Poisson sampling

Mathematically, the first-order inclusion probability of the ith element of the population is denoted by the symbol ${\displaystyle {\pi }_i}$ and the second-order inclusion probability that a pair consisting of the ith and jth element of the population that is sampled is included in a sample during the drawing of a single sample is denoted by ${\displaystyle {\pi }_{ij}}$.

The following relation is valid during Poisson sampling when ${\displaystyle i\ne j}$:

${\displaystyle {\pi }_{ij}={\pi }_i\times {\pi }_j.}$

${\displaystyle {\pi }_{ii}}$ is defined to be ${\displaystyle {\pi }_i}$.

See also

• Bernoulli sampling
• Poisson distribution
• Poisson process
• Sampling design

References

<templatestyles src="Reflist/styles.css" />

Script error: No such module "Check for unknown parameters".

Template:Asbox