Skorokhod's embedding theorem

Let X be a real-valued random variable with expected value 0 and finite variance; let W denote a canonical real-valued Wiener process. Then there is a stopping time (with respect to the natural filtration of W), τ, such that W_τ has the same distribution as X,

${\displaystyle \operatorname {E} [\tau ]=\operatorname {E} [X^{2}]}$ 

and

${\displaystyle \operatorname {E} [\tau ^{2}]\leq 4\operatorname {E} [X^{4}].}$ 

Let X₁, X₂, ... be a sequence of independent and identically distributed random variables, each with expected value 0 and finite variance, and let

${\displaystyle S_{n}=X_{1}+\cdots +X_{n}.}$ 

Then there is a sequence of stopping times τ₁ ≤ τ₂ ≤ ... such that the ${\displaystyle W_{\tau _{n}}}$  have the same joint distributions as the partial sums S_n and τ₁, τ₂ − τ₁, τ₃ − τ₂, ... are independent and identically distributed random variables satisfying

${\displaystyle \operatorname {E} [\tau _{n}-\tau _{n-1}]=\operatorname {E} [X_{1}^{2}]}$ 

and

${\displaystyle \operatorname {E} [(\tau _{n}-\tau _{n-1})^{2}]\leq 4\operatorname {E} [X_{1}^{4}].}$ 

• Billingsley, Patrick (1995). Probability and Measure. New York: John Wiley & Sons, Inc. ISBN 0-471-00710-2. (Theorems 37.6, 37.7)