Exchangeable random variables

An exchangeable sequencee of random variables is a sequence X₁, X₂, X₃, ... of random variables such that for any finite permutation σ of the indices 1, 2, 3, ..., i.e. any permutation σ that leaves all but finitely many indices fixed, the joint probability distribution of the permuted sequence

${\displaystyle X_{\sigma (1)},X_{\sigma (2)},X_{\sigma (3)},\dots }$

is the same as the joint probability distribution of the original sequence.

A seqence E₁, E₂, E₃, ... of events is said to be exchangeble precisely if the sequence of its indicator functions is exchangeable.

Independent and identically distributed random variables are exchangeable.

The distribution function F_X1,...,Xn(x₁, ... ,x_n) of a finite sequence of exchangeable random variables is symmetric in its arguments x₁, ... ,x_n).