In probability theory, a continuous stochastic process is a type of stochastic process that may be said to be "continuous" as a function of its "time" or index parameter. Continuity is a nice property for (the sample paths of) a process to have, since it implies that they are well-behaved in some sense, and, therefore, much easier to analyze. It is implicit here that the index of the stochastic process is a continuous variable. Some authors define a "continuous (stochastic) process" as only requiring that the index variable be continuous, without continuity of sample paths: in another terminology, this would be a continuous-time stochastic process, in parallel to a "discrete-time process". Given the possible confusion, caution is needed.
Let (é, ã, P) be a probability space, let T be some interval of time, and let X : T × Ã© â S be a stochastic process. For simplicity, the rest of this article will take the state space S to be the real line R, but the definitions go through mutatis mutandis if S is R<sup>n</sup>, a normed vector space, or even a general metric space.
Given a time t â T, X is said to be continuous with probability one at t if
Given a time t â T, X is said to be continuous in mean-square at t if E[|X<sub>t</sub>|<sup>2</sup>] < +â and
Given a time t â T, X is said to be continuous in probability at t if, for all õ > 0,
or equivalently
Also equivalent, X is continuous in probability at time t if
Given a time t â T, X is said to be continuous in distribution at t if
for all points x at which F<sub>t</sub> is continuous, where F<sub>t</sub> denotes the cumulative distribution function of the random variable X<sub>t</sub>.
X is said to be sample continuous if X<sub>t</sub>(ÃÂ) is continuous in t for P-almost all àâ é. Sample continuity is the appropriate notion of continuity for processes such as Ità  diffusions.
X is said to be a Feller-continuous process if, for any fixed t â T and any bounded, continuous and ã-measurable function g : S â R, E<sup>x</sup>[g(X<sub>t</sub>)] depends continuously upon x. Here x denotes the initial state of the process X, and E<sup>x</sup> denotes expectation conditional upon the event that X starts at x.
The relationships between the various types of continuity of stochastic processes are akin to the relationships between the various types of convergence of random variables. In particular:
It is tempting to confuse continuity with probability one with sample continuity. Continuity with probability one at time t means that P(A<sub>t</sub>) = 0, where the event A<sub>t</sub> is given by
and it is perfectly feasible to check whether or not this holds for each t â T. Sample continuity, on the other hand, requires that P(A) = 0, where
A is an uncountable union of events, so it may not actually be an event itself, so P(A) may be undefined! Even worse, even if A is an event, P(A) can be strictly positive even if P(A<sub>t</sub>) = 0 for every t â T. This is the case, for example, with the telegraph process.