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<p><b>New page</b></p><div>In [[mathematics]], a '''sample-continuous process''' is a [[stochastic process]] whose [[sample path]]s are [[almost surely]] [[continuous function]]s.<br />
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==Definition==<br />
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Let (&Omega;,&nbsp;&Sigma;,&nbsp;'''P''') be a [[probability space]]. Let ''X''&nbsp;:&nbsp;''I''&nbsp;&times;&nbsp;&Omega;&nbsp;&rarr;&nbsp;''S'' be a stochastic process, where the [[index set]] ''I'' and state space ''S'' are both [[topological space]]s. Then the process ''X'' is called '''sample-continuous''' (or '''almost surely continuous''', or simply '''continuous''') if the map ''X''(''&omega;'')&nbsp;:&nbsp;''I''&nbsp;&rarr;&nbsp;''S'' is [[Continuous function (topology)|continuous as a function of topological spaces]] for '''P'''-[[almost all]] ''&omega;'' in ''&Omega;''.<br />
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In many examples, the index set ''I'' is an interval of time, [0,&nbsp;''T''] or [0,&nbsp;+&infin;), and the state space ''S'' is the [[real line]] or ''n''-[[dimension]]al [[Euclidean space]] '''R'''<sup>''n''</sup>.<br />
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==Examples==<br />
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* [[Brownian motion]] (the [[Wiener process]]) on Euclidean space is sample-continuous.<br />
* For "nice" parameters of the equations, solutions to [[stochastic differential equation]]s are sample-continuous. See the existence and uniqueness theorem in the stochastic differential equations article for some sufficient conditions to ensure sample continuity.<br />
* The process ''X''&nbsp;:&nbsp;[0,&nbsp;+&infin;)&nbsp;&times;&nbsp;&Omega;&nbsp;&rarr;&nbsp;'''R''' that makes equiprobable jumps up or down every unit time according to<br />
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::<math>\begin{cases} X_{t} \sim \mathrm{Unif} (\{X_{t-1} - 1, X_{t-1} + 1\}), & t \mbox{ an integer;} \\ X_{t} = X_{\lfloor t \rfloor}, & t \mbox{ not an integer;} \end{cases}</math><br />
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: is ''not'' sample-continuous. In fact, it is surely discontinuous.<br />
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==Properties==<br />
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* For sample-continuous processes, the [[finite-dimensional distribution]]s determine the [[Law (stochastic processes)|law]], and vice versa.<br />
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==See also==<br />
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* [[Continuous stochastic process]]<br />
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==References==<br />
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* {{cite book<br />
| author = Kloeden, Peter E.<br />
|author2=Platen, Eckhard<br />
| title = Numerical solution of stochastic differential equations<br />
| series = Applications of Mathematics (New York) 23<br />
|publisher = Springer-Verlag<br />
| location = Berlin<br />
| year = 1992<br />
| pages = 38–39<br />
| isbn = 3-540-54062-8<br />
}}<br />
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{{Stochastic processes}}<br />
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[[Category:Stochastic processes]]</div>imported>Olexa Riznyk