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Line 1: In [[probability theory]] and [[statistics]], a '''continuous-time stochastic process''', or a '''continuous-space-time stochastic process''' is a [[stochastic process]] for which the index variable takes a continuous set of values, as contrasted with a [[discrete-time signal\|discrete-time process]] for which the index variable takes only distinct values. An alternative terminology uses '''continuous parameter''' as being more inclusive.<ref>Parzen, E. (1962) ''Stochastic Processes'', Holden-Day. {{ISBN\|0-8162-6664-6}} (Chapter 6)</ref> A more restricted class of processes are the [[continuous stochastic process]]es:; here the term often (but not always<ref name=D>Dodge, Y. (2006) ''The Oxford Dictionary of Statistical Terms'', OUP. {{ISBN\|0-19-920613-9}} (Entry for "continuous process")</ref>) implies both that the index variable is continuous and that sample paths of the process are continuous. Given the possible confusion, caution is needed.<ref name=D/> Continuous-time stochastic processes that are constructed from discrete-time processes via a waiting time distribution are called [[continuous-time random walk]]s.

Continuous-time stochastic process: Difference between revisions