 A path decomposition for Lévy processesR. A. Doney Stochastic Processes and their Applications, 1993, vol. 47, issue 2, 167-181 Abstract: Extending a path decomposition which is known to hold both for Brownian motion and random walk, it is shown that an arbitrary oscillatory Lévy process X gives rise to two new independent Lévy processes X(1) and X(2) which have the same law as X and encapsulate the positive (non-positive) excursions of X away from zero, respectively. If X drifts to ±[infinity], the result also holds with an obvious modification. We discuss various relations between X, X(1) and X(2), but our main focus is on applications. Exploiting the independence of X(1) and X(2) we derive several new distributional results for functionals of X. These include an anlogue for Lévy processes of the well-known fact that the proportion of the time spent in the positive half-line by a Brownian motion with drift before its last visit to zero is uniformly distributed. Keywords: Brownian; motion; first; passage; times; excursions; spectrally; one-sided; maxima; of; Lévy; processes (search for similar items in EconPapers) Downloads: (external link) Related works: Export reference: BibTeX RIS (EndNote, ProCite, RefMan) HTML/Text Persistent link: https://EconPapers.repec.org/RePEc:eee:spapps:v:47:y:1993:i:2:p:167-181 Ordering information: This journal article can be ordered from Access Statistics for this article Stochastic Processes and their Applications is currently edited by T. Mikosch More articles in Stochastic Processes and their Applications from Elsevier |
Is your work missing from RePEc? Here is how to contribute.
Questions or problems? Check the EconPapers FAQ or send mail to .
EconPapers is hosted by the
School of Business at Örebro University.