Khinchin's theorem on the factorization of distributions: Any probability distribution ${\displaystyle P}$ admits (in the convolution semi-group of probability distributions) a factorization

${\displaystyle P=P_{1}\otimes P_{2}}$

where ${\displaystyle P_{1}}$ is a distribution of class ${\displaystyle I_{0}}$ (see Infinitely-divisible distributions, factorization of) and ${\displaystyle P_{2}}$ is a distribution that is either degenerate or is representable as the convolution of a finite or countable set of indecomposable distributions (cf. Indecomposable distribution). The factorization (1) is not unique, in general.

The theorem was proved by A.Ya. Khinchin [1] for distributions on the line, and later it became clear [2] that it is valid for distributions on considerably more general groups. A broad class (see [3]–[5]) of topological semi-groups is known, including the convolution semi-group of distributions on the line, in which factorization theorems analogous to Khinchin's theorem are valid.

A distribution of class ${\displaystyle I_{0}}$ is a distribution without indecomposable factor.

Diophantine_approximation#Khinchin.27s_theorem_and_extensions