Difference density map

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In mathematics, the Kolmogorov continuity theorem is a theorem that guarantees that a stochastic process that satisfies certain constraints on the moments of its increments will be continuous (or, more precisely, have a "continuous version"). It is credited to the Soviet mathematician Andrey Nikolaevich Kolmogorov.

Statement of the theorem

Let X:[0,+)×Ωn be a stochastic process, and suppose that for all times T>0, there exist positive constants α,β,K such that

𝔼[|XtXs|α]K|ts|1+β

for all 0s,tT. Then there exists a continuous version of X, i.e. a process X~:[0,+)×Ωn such that

Example

In the case of Brownian motion on n, the choice of constants α=4, β=1, K=n(n+2) will work in the Kolmogorov continuity theorem.

References

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