Doob–Meyer decomposition theorem

The Doob–Meyer decomposition theorem is a theorem in stochastic calculus stating the conditions under which a submartingale may be decomposed in a unique way as the sum of a martingale and an increasing predictable process. It is named for Joseph L. Doob and Paul-André Meyer.

History

In 1953, Doob published the Doob decomposition theorem which gives a unique decomposition for certain discrete time martingales.^[1] He conjectured a continuous time version of the theorem and in two publications in 1962 and 1963 Paul-André Meyer proved such a theorem, which became known as the Doob-Meyer decomposition.^[2]^[3] In honor of Doob, Meyer used the term "class D" to refer to the class of supermartingales for which his unique decomposition theorem applied.^[4]

Class D supermartingales

A càdlàg supermartingale $Z$ is of Class D if $Z_{0}=0$ and the collection

\{Z_{T}\mid T{\text{ a finite-valued stopping time}}\}

is uniformly integrable.^[5]

The theorem

Let $Z$ be a cadlag supermartingale of class D. Then there exists a unique, non-decreasing, predictable process $A$ with $A_{0}=0$ such that $M_{t}=Z_{t}+A_{t}$ is a uniformly integrable martingale.^[5]

Notes

^ Doob 1953
^ Meyer 1962
^ Meyer 1963
^ Protter 2005
^ ^a ^b Protter (2005)

References

Doob, J. L. (1953). Stochastic Processes. Wiley.
Meyer, Paul-André (1962). "A Decomposition theorem for supermartingales". Illinois Journal of Mathematics. 6 (2): 193–205. doi:10.1215/ijm/1255632318.
Meyer, Paul-André (1963). "Decomposition of Supermartingales: the Uniqueness Theorem". Illinois Journal of Mathematics. 7 (1): 1–17. doi:10.1215/ijm/1255637477.
Protter, Philip (2005). Stochastic Integration and Differential Equations. Springer-Verlag. pp. 107–113. ISBN 3-540-00313-4.

[1] Doob 1953

[2] Meyer 1962

[3] Meyer 1963

[4] Protter 2005

[Protter-5] Protter (2005)

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[2]

[3]

[4]

[5]

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