Characterization of probability distributions

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In mathematics in general, a characterization theorem says that a particular object – a function, a space, etc. – is the only one that possesses properties specified in the theorem. A characterization of a probability distribution accordingly states that it is the only probability distribution that satisfies specified conditions.

For example, according to George Polya's ^[1] characterization theorem, if ${\displaystyle X_{1}}$ and ${\displaystyle X_{2}}$ are independent identically distributed random variables with finite variance, then the statistics

${\displaystyle {\begin{aligned}S_{1}&=X_{1}\\[6pt]S_{2}&={\frac {X_{1}+X_{2}}{\sqrt {2}}}\end{aligned}}}$

are identically distributed if and only if ${\displaystyle X_{1}}$ and ${\displaystyle X_{2}}$ have a normal distribution with zero mean.

The assumption that two linear (or non-linear) statistics are identically distributed (or independent, or have a constancy regression and so on) can be used to characterize various populations (see, for example, ^[2]).

• Characterization (mathematics)